tag:blogger.com,1999:blog-3364920815213347992024-03-13T13:44:26.131-07:00DIKDIK KLAN UCHIHAAnonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.comBlogger7125tag:blogger.com,1999:blog-336492081521334799.post-33544194018973112082012-12-14T00:46:00.000-08:002012-12-14T00:46:04.282-08:00Soal dan jawaban tentang Permutasi dan Kombinasi<div dir="ltr" style="text-align: left;" trbidi="on">
<div class="MsoListParagraphCxSpFirst" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">PERMUTASI</span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">11)<span style="font-size: 7pt;"> </span></span>Ada berapa cara bila 4 orang remaja (w,x,
y, z) menempati tempat duduk yang akan disusun dalam suatu susunan yang
teratur?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">4P4
= 4!<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
4 x 3 × 2 × 1<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
24 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">22)<span style="font-size: 7pt;"> </span></span>Menjelang Pergantian kepengurusan BEM
STMIK Tasikmalaya akan dibentuk panitia inti sebanyak 2 orang (terdiri dari
ketua dan wakil ketua), calon panitia tersebut ada 6 orang yaitu: a, b, c, d,
e, dan f. Ada berapa pasang calon yang dapat duduk sebagai panitia inti
tersebut?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">6P2
= 6!/(6-2)!<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
(6.5.4.3.2.1)/(4.3.2.1)<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
720/24<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
30 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">33)<span style="font-size: 7pt;"> </span></span>Sekelompok mahasiswa yang terdiri dari
10 orang akan mengadakan rapat dan duduk mengelilingi sebuah meja, ada berapa
carakah kelima mahasiswa tersebut dapat diatur pada sekeliling meja tersebut?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">P5
= (10-1)!<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
9.8.7.6.5.4.3.2.1<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
362880 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">4)<span style="font-size: 7pt;"> </span></span>Berapa banyak “kata” yang terbentuk
dari kata “STMIK”?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawab
:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">5!
= 5 x 4 x 3 x 2 x 1 = 120 buah kata<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">55)<span style="font-size: 7pt;"> </span></span>Peluang lulusan PNJ dapat bekerja pada
suatu perusahaan adalah 0,75. Jika seorang lulusan PNJ mendaftarkan pada 24
perusahaan, maka berapakah dia dapat diterima oleh perusahaan?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Frekuensi
harapan kejadian A adalah Fh(A) = n × P(A)<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Diketahui
P(A) = 0,75 dan n = 24. Maka:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Fh(A)
= 24 × 0,75 = 18 perusahaan.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">6)<span style="font-size: 7pt;"> </span></span>Terdapat tiga orang (X, Y dan Z) yang
akan duduk bersama di sebuah bangku. Ada berapa urutan yang dapat terjadi ?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:
<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">nPx
= n! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">3P3
= 3! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
1 x 2 x 3 <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
6 cara (XYZ, XZY, YXZ, YZX, ZXY, ZYX).<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">77)<span style="font-size: 7pt;"> </span></span>Suatu kelompok belajar yang
beranggotakan empat orang (A, B, C dan D) akan memilih ketua dan wakil ketua
kelompok. Ada berapa alternatif susunan ketua dan wakil ketua dapat dipilih ?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:
<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">nPx
= (n!)/(n-x)! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">4P2
= (4!)/(4-2)! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
12 cara (AB, AC, AD, BA, BC, BD, CA, CB, CD, DA, DB, DC) .<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">8)<span style="font-size: 7pt;"> </span></span>Berapa banyaknya permutasi dari cara
duduk yang dapat terjadi jika 8 orang disediakan 4 kursi, sedangkan salah
seorang dari padanya selalu duduk dikursi tertentu. <o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jika
salah seorang selalu duduk dikursi tertentu maka tinggal 7 orang dengan 3 kursi
kosong.<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Maka
banyaknya cara duduk ada :<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">7P3
= 7!/(7-3)! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
7!/4! <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
7.6.5 <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
210 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">9)<span style="font-size: 7pt;"> </span></span>Ada berapa cara 5 gelas warna yang
mengitari meja kecil, dapat menempati kelima tempat dengan urutan yang
berlainan? <o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Banyaknya
cara duduk ada (5 – 1) ! = 4 ! ® 4. 3 . 2 . 1 = 24 cara.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">110)<span style="font-size: 7pt;"> </span></span>Tentukan banyaknya permutasi siklus
dari 3 unsur yaitu A, B, C<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">jawab:</span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jika
A sebagai urutan I : ABC<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jika
B sebagai urutan I : BCA<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jika
C sebagai urutan III : CAB<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jika
banyak unsur n=4 –> A, B, C, D<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">jadi
banyaknya permutasi siklis dari 4 unsur ( A B C D) adalah 4!/4 = 4.3.2.1/4 = 6<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">KOMBINASI<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">11)<span style="font-size: 7pt;"> </span></span>Dalam mengadakan suatu pemilihan
dengan menggunakan obyek 4 orang pedagang kaki lima untuk diwawancarai, maka
untuk memilih 3 orang untuk satu kelompok. Ada berapa cara kita dapat
menyusunnya?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">4C3
=4! / 3! (4-3)!<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
(4.3.2.1) / 3.2.1.1<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
24 / 6<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
4 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">12)<span style="font-size: 7pt;"> </span></span>Suatu warna tertentu dibentuk dari
campuran 3 warna yang berbeda. Jika terdapat 4 warna, yaitu Merah, Kuning, Biru
dan Hijau, maka berapa kombinasi tiga jenis warna yang dihasilkan.<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:
<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">nCx
= (n!)/(x!(n-x)!) <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">4C3
= (4!)/(3!(4-3)!) <o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">=
24/6 = 4 macam kombinasi (MKB, MKH, KBH, MBH). <o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">13)<span style="font-size: 7pt;"> </span></span>Dalam suatu pertemuan terdapat 10
orang yang belum saling kenal. Agar mereka saling kenal maka mereka saling
berjabat tangan. Berapa banyaknya jabat tangan yang terjadi.<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:
<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">10C2
= (10!)/(2!(10-2)!) = 45 jabat tangan<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">14)<span style="font-size: 7pt;"> </span></span>Suatu kelompok yang terdiri dari 3
orang pria dan 2 orang wanita akan memilih 3 orang pengurus. Berapa cara yang
dapat dibentuk dari pemilihan jika pengurus terdiri dari 2 orang pria dan 1
orang wanita.<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:
<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">3C2
. 2C1 = (3!)/(2!(3-2)!) . (2!)/(1!(2-1)!) = 6 cara, yaitu : L1 L2 W1 ; L1 L3 W1
; L2 L3 W1 ; L1 L2 W2 ; L1 L3 W2 ; L2 L3 W2<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">15)<span style="font-size: 7pt;"> </span></span>Dalam sebuah ujian, seorang mahasiswa
diwajibkan mengerjakan 5 soal dari 8 soal yg tersedia. Tentukan:<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 72pt; text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">a.<span style="font-size: 7pt;"> </span></span>banyaknya jenis pilihan soal yg
mungkin untuk dikerjakan<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 72pt; text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">b.<span style="font-size: 7pt;"> </span></span>banyaknya jenis pilihan soal yg
mungkin dikerjakan jika no.6 dan 7 wajib dikerjakan.<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="margin-left: 72pt; text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">c.<span style="font-size: 7pt;"> </span></span>8 C5 = 8!/5!(8-5)! = (8×7×6×5!)/5!3! =
56 cara<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpLast" style="margin-left: 72pt; text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">d.<span style="font-size: 7pt;"> </span></span>6C3 = 6!/3!(6-2)! = (6×5×4×3!)/3!3! =
20 cara<o:p></o:p></span><!--[endif]--></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">16)<span style="font-size: 7pt;"> </span></span>Banyak cara memilih 4 pengurus dari 6
calon, yang ada sama dengan ....<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">6C4
= 6!/4!(6-4)! = (6×5×4!)/4!2! = 15 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">17)<span style="font-size: 7pt;"> </span></span>Dalam sebuah kantoh terdapat 7
kelereng. Berapa banyak cara mengambil 4 kelereng dari kantong tersebut?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">7C4
= 7!/4!(7-4)! = (7×6×5×4!)/4!3! = 35 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">18)<span style="font-size: 7pt;"> </span></span>Siswa di minta mengerjakan 9 dari 10
soal ulangan, tetapi soal 1-5 harus di kerjakan. Banyaknya pilihan yang dapat
diambil murid adalah.<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">5C4
= 5!/4!(5-4)! = (5×4!)/4!1! = 5 cara<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpFirst" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">19)<span style="font-size: 7pt;"> </span></span>Seorang peternak akan membeli 3 ekor
ayam dan 2 ekor kambing dari seorang pedagang yang memiliki 6 ekor ayam dan 4
ekor kambing. Dengan berapa cara peternak tersebut dapat memilih ternak-ternak
yang di inginkannya?<o:p></o:p></span><!--[endif]--></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Banyak
cara memilih ayam = 6C3 = 6!/3!(6-3)! = 6!/3!3! = 20 cara<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Banyak
cara memilih kambing = 4C2 = 4!/2!(4-2)! = (4×3×2!)/2!2! = 6 cara<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jadi,
peternak tersebut memiliki pilihan sebanyak = 20×6 = 120 cara<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left; text-indent: -18pt;">
<!--[if !supportLists]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="mso-bidi-font-family: "Lucida Calligraphy"; mso-fareast-font-family: "Lucida Calligraphy";">20)<span style="font-size: 7pt;"> </span></span>Sebuah
perusahaan membutuhkan karyawan yg terdiri dari 5 putra dan 3 putri. Jika
terdapat 15 pelamar, 9 diantaranya putra. Tentukan banyaknya cara menyeleksi
karyawan!<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Jawaban:<o:p></o:p></span></div>
<div class="MsoListParagraphCxSpMiddle" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">Pelamar
putra = 9 dan pelamar putri 6 banyak cara menyeleksi:</span></div>
<div class="MsoListParagraphCxSpLast" style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;">9C5
x 6C3 = 9!/5!x(9-5)! x 6!/3!x(6-3)! = 2360</span></div>
<div class="MsoNormal" style="text-align: left;">
<div style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<div style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></div>
<h4>
<span style="font-family: Arial,Helvetica,sans-serif;"><br /></span></h4>
</div>
</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com23tag:blogger.com,1999:blog-336492081521334799.post-69489619112852640672012-12-04T08:34:00.001-08:002012-12-04T08:38:59.777-08:00Tugas Matematika Diskrit<div dir="ltr" style="text-align: left;" trbidi="on">
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-he0oqM7SxLc/UL4hOpBg6uI/AAAAAAAAAEA/FcHZ8cPUyBc/s1600/1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://4.bp.blogspot.com/-he0oqM7SxLc/UL4hOpBg6uI/AAAAAAAAAEA/FcHZ8cPUyBc/s320/1.jpg" width="251" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-cPxiA-Vhqko/UL4hwAYSNbI/AAAAAAAAAEI/hpNdahLFXQA/s1600/2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://2.bp.blogspot.com/-cPxiA-Vhqko/UL4hwAYSNbI/AAAAAAAAAEI/hpNdahLFXQA/s1600/2.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-Ul9irO59r70/UL4iS1uSFvI/AAAAAAAAAEQ/vdI89Hi5j6c/s1600/3.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://3.bp.blogspot.com/-Ul9irO59r70/UL4iS1uSFvI/AAAAAAAAAEQ/vdI89Hi5j6c/s1600/3.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-38-uF-BXb5Y/UL4ipPUuK5I/AAAAAAAAAEY/EpIGYeFAMno/s1600/4.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-38-uF-BXb5Y/UL4ipPUuK5I/AAAAAAAAAEY/EpIGYeFAMno/s1600/4.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-mr-6AJP6sBo/UL4i89Dm9cI/AAAAAAAAAEg/KlIwuKY1EWk/s1600/5.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://4.bp.blogspot.com/-mr-6AJP6sBo/UL4i89Dm9cI/AAAAAAAAAEg/KlIwuKY1EWk/s1600/5.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-ClrKoSUVakY/UL4jJsbrW7I/AAAAAAAAAEo/BQHt82w0Zfc/s1600/6.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-ClrKoSUVakY/UL4jJsbrW7I/AAAAAAAAAEo/BQHt82w0Zfc/s1600/6.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-AXXOljskExw/UL4jcQMPC6I/AAAAAAAAAEw/qBVVgpPnWuk/s1600/7.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://4.bp.blogspot.com/-AXXOljskExw/UL4jcQMPC6I/AAAAAAAAAEw/qBVVgpPnWuk/s1600/7.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-xq_JAIhhO5Q/UL4jtrUE54I/AAAAAAAAAE4/7c8FHE0PPnY/s1600/8.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-xq_JAIhhO5Q/UL4jtrUE54I/AAAAAAAAAE4/7c8FHE0PPnY/s1600/8.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-5RYZ35dVOog/UL4j55vH6aI/AAAAAAAAAFA/4xTTzCQeO3w/s1600/9.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://2.bp.blogspot.com/-5RYZ35dVOog/UL4j55vH6aI/AAAAAAAAAFA/4xTTzCQeO3w/s1600/9.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-quCAE3ZRmxU/UL4kK9KHlwI/AAAAAAAAAFI/5ynkiwR74Wg/s1600/10.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-quCAE3ZRmxU/UL4kK9KHlwI/AAAAAAAAAFI/5ynkiwR74Wg/s1600/10.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-UVi5917dcM8/UL4kYP5srWI/AAAAAAAAAFQ/N512gnanuvk/s1600/11.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://4.bp.blogspot.com/-UVi5917dcM8/UL4kYP5srWI/AAAAAAAAAFQ/N512gnanuvk/s1600/11.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-ItitsiJA9Rk/UL4koYpWd-I/AAAAAAAAAFY/1hjrGvS4TPE/s1600/12.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-ItitsiJA9Rk/UL4koYpWd-I/AAAAAAAAAFY/1hjrGvS4TPE/s1600/12.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-CmIg7BxVNO0/UL4kzRj3XJI/AAAAAAAAAFg/GlAJhHc8sKs/s1600/13.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-CmIg7BxVNO0/UL4kzRj3XJI/AAAAAAAAAFg/GlAJhHc8sKs/s1600/13.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-zoL4CJu69hM/UL4lCNiSY1I/AAAAAAAAAFo/tbjjrCjfJXA/s1600/14.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://4.bp.blogspot.com/-zoL4CJu69hM/UL4lCNiSY1I/AAAAAAAAAFo/tbjjrCjfJXA/s1600/14.jpg" /></a></div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-0IHq69xW_u4/UL4lUbMmiYI/AAAAAAAAAFw/Cn8cbVXfH-Q/s1600/15.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-0IHq69xW_u4/UL4lUbMmiYI/AAAAAAAAAFw/Cn8cbVXfH-Q/s1600/15.jpg" /> </a></div>
<div class="separator" style="clear: both; text-align: center;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
nama : dikdik</div>
<div class="separator" style="clear: both; text-align: center;">
kelas : A</div>
<div class="separator" style="clear: both; text-align: center;">
</div>
</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com0tag:blogger.com,1999:blog-336492081521334799.post-16731577812434267792012-11-22T06:19:00.001-08:002012-11-22T06:20:24.907-08:00Download Web<div dir="ltr" style="text-align: left;" trbidi="on">
Jika ada yang bertanya apa bisa kita mendownload sebuah web?? jawabannya ya bisa-bisa saja, dengan semakin canggihnya ilmu teknologi apa sih yang tidak mungkin untuk saat ini.<br />
Pada kesempatan kali ini saya akan beri tahu bagai mana cara mendownload sebuah web yang ada di internet.<br />
<br />
langkah-langkahnya adalah sebagai berikut<br />
<ol>
<li>Download aplikasi HTTrack Website Copier <a href="http://www.mediafire.com/?dv5d9g3hekqe1kc">Download</a></li>
<li>Buka halaman sebuah web yang akan di download</li>
<li>Buka aplikasi HTTrack Website Copier yang kita download tadi<br /> </li>
<li><img alt="" height="169" src="data:image/jpeg;base64,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" width="320" />klik next </li>
<li><img alt="" src="data:image/jpeg;base64,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" />isi nama projek dan catagorinya,</li>
<li>Next <img alt="" src="data:image/jpeg;base64,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" /> </li>
</ol>
masukan alamat web adress(URL) yang akan kita download- Next<br />
<br />
tampilan ketika web itu di download<br />
<br />
<br />
<br />
<img alt="" src="data:image/jpeg;base64,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" /><br />
<br />
<br />
<br />
<br />
jika selesai klik Finis dan kita bisa langsung lihat hasilnya<br />
<br />
Pada kesempatan kali ini dicukupkan sekian mudah-mudahan bisa bermanpaat bagi sahabat bloger<br />
<br />
sampai jumpa di pertemuan selanjutnya<br />
<br />
:)</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com0tag:blogger.com,1999:blog-336492081521334799.post-38658166865733022742012-11-14T15:08:00.001-08:002012-11-14T15:08:14.799-08:00<div dir="ltr" style="text-align: left;" trbidi="on">
<br />
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">BAB
I</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">PENDAHULUAN</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<br /></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Latar
Belakang<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Sub bidang Matematika Terapan di LPTK dirinci
dalam lima mata kuliah, yaitu: Persamaan Diferensial, Masalah Nilai Awal dan
Syarat Batas, Komputer dan Pemrograman dengan Basic, Metode Numerik dan
Matematika Diskrit (Ristono, 1999). Selanjutnya, Sufri (1997) mengatakan bahwa
Persamaan Diferensial bukanlah merupakan hal yang asing bagi matematikawan,
banyak fenomena alam yang dapat dinyatakan dalam bentuk persamaan diferensial,
seperti dalam ilmu matematika, kimia, fisika dan biologi.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dalam teori persamaan diferensial, masalah
utama yang dihadapi adalah mengetahui adanya penyelesaian persamaan diferensial
(adanya suatu fungsi terdiferensialkan dan memenuhi persamaan diferensial).
Oleh karena itu, diperlukan teorema yang menjamin adanya suatu penyelesaian
(Siswanto, 1997).<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Persamaan diferensial eksak yang merupakan
bagian dari persamaan diferensial memiliki penyelesaian sebagai berikut:<o:p></o:p></span></div>
<ol start="1" type="1">
<li class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt;"><i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">F</span></i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">(<i>x</i>, <i>y</i>) = + = <i>c</i></span><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman";"><o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pilih sebarang titik (<i>x</i><sub>0, </sub><i>y</i><sub>0</sub>)
secara bijaksana pada daerah dimana fungsi-fungsi <i>M</i>, <i>N</i>,
turunan-turunan parsial <i>M<sub>y</sub> </i>dan <i>N<sub>y</sub></i> kontinu.
Titik (<i>x</i><sub>0, </sub><i>y</i><sub>0</sub>) diperoleh secara
bijaksana, tetapi hal tersebut tidaklah mudah (Finizio dan Ladas, 1988).</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<br /></div>
<ol start="2" type="1">
<li class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt;"><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";"><a name='more'></a>Pengelompokan<o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Menyelesaikan persamaan diferensial eksak
dengan mengelompokkan kembali suku-sukunya, harus diketahui bahwa masing-masing
kelompok adalah diferensial total dari suatu fungsi (Ayres, 1981).<o:p></o:p></span></div>
<ol start="3" type="1">
<li class="MsoNormal" style="line-height: 18pt; margin-bottom: 0.0001pt;"><i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">F</span></i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">(<i>x</i>, <i>y</i>) = + <i>c</i>(<i>y</i>)</span><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman";"><o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .3in; mso-margin-top-alt: auto; text-indent: -.05in;">
<i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">c</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>y</i>)
= (Ross, 1984)</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: 0in; margin-right: 0in; margin-top: 5.75pt; text-indent: 35.3pt;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dari
ketiga cara penyelesaian persamaan diferensial eksak, cara ketiga merupakan
cara yang sistematik (Finizio dan Ladas, 1988). Ditambahkan Ross (1984), cara
ketiga merupakan cara yang standar dalam menyelesaikan persamaan diferensial
eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: 35.3pt;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Penyelesaian persamaan diferensial eksak
dengan menggunakan rumus standar <i>F</i>(<i>x</i>,<i>y</i>)=+ <i>c</i>(<i>y</i>)
atau <i>F</i>(<i>x</i>,<i>y</i>) = + <i>c</i>(<i>x</i>). Jika dikaji
dari langkah-langkah pengerjaannya, maka peneliti tertarik agar rumus
penyelesaian persamaan diferensial eksak disederhanakan sehingga
langkah-langkah penyelesaian soal-soal persamaan diferensial eksak lebih
sederhana.</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Eksistensi suatu rumus untuk menyelesaikan persamaan
diferensial eksak merupakan hal yang esensial untuk dibuktikan dan dijelaskan.
Bagi yang awam tentang matematika, persoalan ini bukan merupakan pemikiran bagi
mereka, artinya mereka hanya menggunakan hasil penyederhanaan tersebut tanpa
pernah muncul pertanyaan dalam pikirannya mengapa penyelesaian itu caranya
berbeda. Sementara bagi orang matematika hal tersebut harus dapat dibuktikan
dan dijelaskan.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Berdasarkan
uraian-uraian yang telah dipaparkan, peneliti akan mengadakan penelitian dengan
judul: Penyederhanaan penyelesaian persamaan diferensial eksak.<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Batasan
Masalah<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pada penelitian ini pembahasan diferensial
eksak dibatasi yaitu:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Persamaan diferensial tingkat satu dan
derajat satu untuk dua variabel dengan bentuk umum persamaan diferensial <i>M</i>(<i>x</i>, <i>y</i>) <i>dx</i> + <i>N</i>(<i>x</i>, <i>y</i>) <i>dy</i> = <i>0</i></span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">= M</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>x</i>, <i>y</i>), <i>= N</i>(<i>x</i>, <i>y</i>)
dan <i>=</i></span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Rumus penyelesaiannya adalah <i>F</i>(<i>x</i>, <i>y</i>)=+ <i>c</i>(<i>y</i>)
atau</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .25in;">
<i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">F</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>x</i>, <i>y</i>) =
+ <i>c</i>(<i>x</i>)</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l1 level1 lfo5; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Rumusan
Masalah</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 18.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Berdasarkan latar belakang dan batasan
masalah, peneliti merumuskan masalah sebagai berikut:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 18.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Bagaimana cara menyederhanakan rumus <i>F</i>(<i>x</i>,<i>y</i>)
= + <i>c</i>(<i>y</i>) dan<br />
<i>F</i>(<i>x</i>,<i>y</i>) = + <i>c</i>(<i>x</i>), sehingga <i>c</i>(<i>y</i>)
= + <i>c</i> dan <i>c</i>(<i>x</i>) = + <i>c</i>.</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l3 level1 lfo6; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Tujuan
Penelitian</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pada prinsipnya penelitian ini berusaha untuk
menjawab masalah-masalah yang dipaparkan pada latar belakang dan rumusan
masalah yaitu untuk menyederhanakan penyelesaian persamaan diferensial eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l7 level1 lfo7; mso-margin-top-alt: auto; page-break-before: always; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Manfaat Hasil Penelitian</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Hasil penelitian ini diharapkan dapat
bermanfaat sebagai berikut:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dari
peneliti, manfaat yang dapat diambil adalah untuk mengembangkan pengetahuan
yang ada pada peneliti.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dalam
kaitannya dengan pengembangan pendidikan tinggi di Indonesia, penelitian ini
diharapkan dapat memberikan tinjauan baru dalam teori persamaan diferensial
eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Informasi
yang diberikan dalam penelitian ini akan membuka peluang diadakan penelitian
lebih lanjut dengan melibatkan bentuk-bentuk persamaan diferensial yang lain.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<br /></div>
<div class="MsoNormal">
<br /></div>
</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com0tag:blogger.com,1999:blog-336492081521334799.post-89006735590533549372012-11-14T15:02:00.000-08:002012-11-14T15:02:52.506-08:00MAKALAH MATEMATIKA<div dir="ltr" style="text-align: left;" trbidi="on">
<br />
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">BAB
I</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">PENDAHULUAN</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div align="center" class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-align: center;">
<br /></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Latar
Belakang<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Sub bidang Matematika Terapan di LPTK dirinci
dalam lima mata kuliah, yaitu: Persamaan Diferensial, Masalah Nilai Awal dan
Syarat Batas, Komputer dan Pemrograman dengan Basic, Metode Numerik dan
Matematika Diskrit (Ristono, 1999). Selanjutnya, Sufri (1997) mengatakan bahwa
Persamaan Diferensial bukanlah merupakan hal yang asing bagi matematikawan,
banyak fenomena alam yang dapat dinyatakan dalam bentuk persamaan diferensial,
seperti dalam ilmu matematika, kimia, fisika dan biologi.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dalam teori persamaan diferensial, masalah
utama yang dihadapi adalah mengetahui adanya penyelesaian persamaan diferensial
(adanya suatu fungsi terdiferensialkan dan memenuhi persamaan diferensial).
Oleh karena itu, diperlukan teorema yang menjamin adanya suatu penyelesaian
(Siswanto, 1997).<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Persamaan diferensial eksak yang merupakan
bagian dari persamaan diferensial memiliki penyelesaian sebagai berikut:<o:p></o:p></span></div>
<ol start="1" type="1">
<li class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt;"><i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">F</span></i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">(<i>x</i>, <i>y</i>) = + = <i>c</i></span><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman";"><o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pilih sebarang titik (<i>x</i><sub>0, </sub><i>y</i><sub>0</sub>)
secara bijaksana pada daerah dimana fungsi-fungsi <i>M</i>, <i>N</i>,
turunan-turunan parsial <i>M<sub>y</sub> </i>dan <i>N<sub>y</sub></i> kontinu.
Titik (<i>x</i><sub>0, </sub><i>y</i><sub>0</sub>) diperoleh secara
bijaksana, tetapi hal tersebut tidaklah mudah (Finizio dan Ladas, 1988).</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
</div>
<ol start="2" type="1">
<li class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt;"><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">Pengelompokan<o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .25in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Menyelesaikan persamaan diferensial eksak
dengan mengelompokkan kembali suku-sukunya, harus diketahui bahwa masing-masing
kelompok adalah diferensial total dari suatu fungsi (Ayres, 1981).<o:p></o:p></span></div>
<ol start="3" type="1">
<li class="MsoNormal" style="line-height: 18pt; margin-bottom: 0.0001pt;"><i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">F</span></i><span lang="IN" style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-ansi-language: IN; mso-fareast-font-family: "Times New Roman";">(<i>x</i>, <i>y</i>) = + <i>c</i>(<i>y</i>)</span><span style="font-family: "Times New Roman","serif"; font-size: 12.0pt; mso-fareast-font-family: "Times New Roman";"><o:p></o:p></span></li>
</ol>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .3in; mso-margin-top-alt: auto; text-indent: -.05in;">
<i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">c</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>y</i>)
= (Ross, 1984)</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: 0in; margin-right: 0in; margin-top: 5.75pt; text-indent: 35.3pt;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"></span><br />
<a name='more'></a><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dari
ketiga cara penyelesaian persamaan diferensial eksak, cara ketiga merupakan
cara yang sistematik (Finizio dan Ladas, 1988). Ditambahkan Ross (1984), cara
ketiga merupakan cara yang standar dalam menyelesaikan persamaan diferensial
eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: 35.3pt;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Penyelesaian persamaan diferensial eksak
dengan menggunakan rumus standar <i>F</i>(<i>x</i>,<i>y</i>)=+ <i>c</i>(<i>y</i>)
atau <i>F</i>(<i>x</i>,<i>y</i>) = + <i>c</i>(<i>x</i>). Jika dikaji
dari langkah-langkah pengerjaannya, maka peneliti tertarik agar rumus
penyelesaian persamaan diferensial eksak disederhanakan sehingga
langkah-langkah penyelesaian soal-soal persamaan diferensial eksak lebih
sederhana.</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Eksistensi suatu rumus untuk menyelesaikan persamaan
diferensial eksak merupakan hal yang esensial untuk dibuktikan dan dijelaskan.
Bagi yang awam tentang matematika, persoalan ini bukan merupakan pemikiran bagi
mereka, artinya mereka hanya menggunakan hasil penyederhanaan tersebut tanpa
pernah muncul pertanyaan dalam pikirannya mengapa penyelesaian itu caranya
berbeda. Sementara bagi orang matematika hal tersebut harus dapat dibuktikan
dan dijelaskan.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Berdasarkan
uraian-uraian yang telah dipaparkan, peneliti akan mengadakan penelitian dengan
judul: Penyederhanaan penyelesaian persamaan diferensial eksak.<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-outline-level: 1; text-align: justify;">
<b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 12pt;">Batasan
Masalah<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pada penelitian ini pembahasan diferensial
eksak dibatasi yaitu:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Persamaan diferensial tingkat satu dan
derajat satu untuk dua variabel dengan bentuk umum persamaan diferensial <i>M</i>(<i>x</i>, <i>y</i>) <i>dx</i> + <i>N</i>(<i>x</i>, <i>y</i>) <i>dy</i> = <i>0</i></span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">= M</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>x</i>, <i>y</i>), <i>= N</i>(<i>x</i>, <i>y</i>)
dan <i>=</i></span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l5 level1 lfo4; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Rumus penyelesaiannya adalah <i>F</i>(<i>x</i>, <i>y</i>)=+ <i>c</i>(<i>y</i>)
atau</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .25in;">
<i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">F</span></i><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">(<i>x</i>, <i>y</i>) =
+ <i>c</i>(<i>x</i>)</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l1 level1 lfo5; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Rumusan
Masalah</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 18.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Berdasarkan latar belakang dan batasan
masalah, peneliti merumuskan masalah sebagai berikut:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 18.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Bagaimana cara menyederhanakan rumus <i>F</i>(<i>x</i>,<i>y</i>)
= + <i>c</i>(<i>y</i>) dan<br />
<i>F</i>(<i>x</i>,<i>y</i>) = + <i>c</i>(<i>x</i>), sehingga <i>c</i>(<i>y</i>)
= + <i>c</i> dan <i>c</i>(<i>x</i>) = + <i>c</i>.</span><span style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l3 level1 lfo6; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Tujuan
Penelitian</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Pada prinsipnya penelitian ini berusaha untuk
menjawab masalah-masalah yang dipaparkan pada latar belakang dan rumusan
masalah yaitu untuk menyederhanakan penyelesaian persamaan diferensial eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l7 level1 lfo7; mso-margin-top-alt: auto; page-break-before: always; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;">
</span></span><!--[endif]--><b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Manfaat Hasil Penelitian</span></b><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; mso-margin-top-alt: auto; text-indent: .5in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Hasil penelitian ini diharapkan dapat
bermanfaat sebagai berikut:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">1.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dari
peneliti, manfaat yang dapat diambil adalah untuk mengembangkan pengetahuan
yang ada pada peneliti.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">2.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Dalam
kaitannya dengan pengembangan pendidikan tinggi di Indonesia, penelitian ini
diharapkan dapat memberikan tinjauan baru dalam teori persamaan diferensial
eksak.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<!--[if !supportLists]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">3.<span style="font-family: 'Times New Roman'; font-size: 7pt; line-height: normal;"> </span></span><!--[endif]--><span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;">Informasi
yang diberikan dalam penelitian ini akan membuka peluang diadakan penelitian
lebih lanjut dengan melibatkan bentuk-bentuk persamaan diferensial yang lain</span></div>
<div class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: center; text-indent: -0.25in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><b>BAB II</b></span></div>
<div class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: center; text-indent: -0.25in;">
<span lang="IN" style="font-family: 'Times New Roman', serif; font-size: 13.5pt;"><b>ISI</b></span></div>
<div class="MsoNormal" style="line-height: 24pt; margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: center; text-indent: -0.25in;">
<br /></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-indent: -0.25in;">
</div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">Persamaan diferensial pada matematika diskrit khususnya adalah Persamaan suatu fungsi matematika yang memiliki satu variabel atau lebih, dimana fungsi tersebut saling berhubungan antara fungsi itu sendiri dan turunanya. Selain dalam matematika diskrit, Persamaan diferensial ini juga digunakan dalam ilmu hitung lainya baik dari ilmu fisika, ekonomi dan ilmu lainya</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Persamaan diferensial adalah persamaan matematika yang memepelajari fungsi yang tidak diketahui nilai dari satu atau beberapa variabel yang saling berhubungan, nilai-nilai fungsi itu sendiri dan turunannya dari berbagai operasi matematika. Persamaan diferensial memainkan peran penting dalam aplikasi matematika pada bidang teknik, fisika, ekonomi, dan disiplin lainnya.Persamaan diferensial kerap muncul dalam banyak bidang ilmu pengetahuan dan teknologi, khususnya setiap kali terdapat hubungan deterministik yang melibatkan beberapa elemen yang terus menerus bervariasi (dapat dibuat model matematika dengan menggunakan fungsi) dan tingkat perubahan elemen-elemen tersebut dalam ruang dan / atau waktu (dinyatakan sebagai turunan) . </span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Hal ini kerap diilustrasikan dalam mekanika klasik, di mana gerakan digambarkan oleh posisi dan kecepatan yang dipengaruhi oleh waktu. Hukum Newton memungkinkan seseorang (mengingat posisi, kecepatan, percepatan dan berbagai kekuatan bertindak pada tubuh) untuk menyatakan variabel-variabel dinamis sebagai persamaan diferensial untuk posisi yang tidak diketahui tubuh sebagai fungsi waktu. Dalam beberapa kasus, persamaan diferensial (disebut persamaan gerak) dapat dipecahkan Contoh aplikasi matematika menggunakan persamaan diferensial adalah penentuan kecepatan bola jatuh melalui udara, jika variabel yang digunakan hanya gravitasi dan hambatan udara. Percepatan bola ke arah tanah dihiung dari percepatan gravitasi dikurangi perlambatan karena hambatan udara. Diasumsikan gravitasi dianggap konstan, dan hambatan udara dapat dimodelkan sebagai berbanding lurus dengan kecepatan bola. Hal ini mengindikasikan percepatan bola, yang merupakan turunan dari fungsi kecepatannya, yang tergantung pada kecepatan. Mencari kecepatan sebagai fungsi atas waktu membutuhkan pemecahan sebuah persamaan diferensial.</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Persamaan diferensial secara matematis dipelajari dari perspektif yang beranekaragam, sebagian besar mereka peduli dengan solusi-himpunan fungsi yang memenuhi persamaan (tujuannya hanya berupa perkembangan ilmu). Hanya persamaan diferensial sederhana umumnya mendapatkan hasi formula sebuah formula eksplisit. Namun, beberapa sifat-sifat dari solusi dari persamaan diferensial yang diberikan dapat ditentukan tanpa menemukan solusi yang tepat dari pemecahan persamaan diferensial tersebut. Jika solusi analitik tidak dapat ditemukan, solusi dapat diestimasi secara numerik menggunakan komputer. Teori sistem dinamik menekankan pada analisis kualitatif sistem dijelaskan oleh persamaan diferensial, sementara metode numerik yang telah dikembangkan untuk menentukan solusi dengan tingkat galat tertentu.</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Persamaan diferensial parsial adalah persamaan diferensial di mana fungsi yang tidak diketahui adalah fungsi dari banyak variabel bebas, dan persamaan tersebut juga melibatkan turunan parsial. Orde persamaan didefinisikan seperti pada persamaan diferensial biasa, namun klasifikasi lebih jauh ke dalam persamaan eliptik, hiperbolik, dan parabolik, terutama untuk persamaan diferensial linear orde dua, sangatlah penting. Baik persamaan diferensial biasa maupun parsial dapat digolongkan sebagai linier atau nonlinier.</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Klasifikasi lain adalah tergantung pada banyaknya fungsi-fungsi yang tidak diketahui.Jika hanya terdapat fungsi tunggal yang akan ditentukan maka satu persamaan sudah cukup. Akan tetapi jika terdapat dua atau lebih fungsi yang tidak diketahui maka sebuah sistem dari persamaan diperlukan. Untuk contohnya, persamaan Lotka-Volterra atau predator-pray adalah contoh sistem persamaan yang sangat penting yang merupakan model dalam ekologi. </span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">Persamaan tersebut mempunyai bentuk :</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">dx/dt = ax - axy</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">dy/dt = -cy+ °xy</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">Persamaan diferensial sendiri dapat dibagi menurut : </span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">1. Menurut jenis atau tipe : yaitu persamaan diferensial biasa dan persamaan diferensial parsial. </span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">2. Menurut orde: orde persamaan diferensial adalah orde tertinggi turunan fungsi yang ada dalam persamaan. d3y/dx3 adalah orde tiga d2y/dx2adalah orde dua dy/dx adalah orde satu.</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">3. Menurut derajat: derajat suatu persamaan diferensial adalah pangkat tertinggi dari turunan fungsi orde tertinggi. Sebagai contoh: ( d3y/dx3)2 + ( d2y / dx2)5 + y/x2+1 =ex adalah persamaan diferensial biasa, orde tiga, derajat dua. </span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"><br /></span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;">Penerapan persamaan diferensial pada kehidupan sehari-hari dan Matematika diskrit</span></div>
<div class="MsoNormal" style="margin-bottom: 0.0001pt; margin-left: 0.5in; text-align: justify; text-indent: -0.25in;">
<span style="line-height: 32px;"> Dalam penerapanya Persamaan Diferensial ini dalam matematika adalah pencarian nilai fungsi turunan untuk memudahkan perhitungan, sedangkan untuk penerapan lain ilmu yang dipengaruhi oleh Persamaan diferensial ini adalah Ilmu Fisika misal dalam hukum newton, Percepatan dan Kecepatan, Perhitungan Radio Nuklir dan masih banyak lagi.</span></div>
<div style="line-height: 24pt;">
<br /></div>
<br />
<div class="MsoNormal" style="line-height: 24.0pt; margin-bottom: .0001pt; margin-bottom: 0in; margin-left: .5in; mso-list: l4 level1 lfo8; mso-margin-top-alt: auto; tab-stops: list .5in; text-indent: -.25in;">
<span style="text-align: center;"><br /></span></div>
<div class="MsoNormal">
<o:p><br /></o:p></div>
</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com0tag:blogger.com,1999:blog-336492081521334799.post-52605169979403993192011-12-18T03:02:00.000-08:002012-11-14T15:04:04.921-08:00SEJARAH KOMPUTER<div dir="ltr" style="text-align: left;" trbidi="on">
<b>>Sejarah Komputer dan Perkembanganya</b> – Sejak dahulu, proses pengolahan data telah dilakukan oleh manusia. Manusia juga menemukan alat-alat mekanik dan elektronik untuk membantu manusia dalam penghitungan dan pengolahan data supaya bisa mendapatkan hasil lebih cepat. Komputer yang kita temui saat ini adalah suatu evolusi panjang dari penemuan-penemuan manusia sejak dahulu kala berupa alat mekanik maupun elektronik<br />
Saat ini komputer dan piranti pendukungnya telah masuk dalam setiap aspek kehidupan dan pekerjaan. Komputer yang ada sekarang memiliki kemampuan yang lebih dari sekedar perhitungan matematik biasa. Diantaranya adalah sistem komputer di kassa supermarket yang mampu membaca kode barang belanja, sentral telepon yang menangani jutaan panggilan dan komunikasi, jaringan komputer dan internet yang menghubungkan berbagai tempat di dunia.<br />
<a href="http://merahitam.com/sejarah-komputer-dan-perkembanganya.html" title="Sejarah Komputer ">Sejarah Komputer</a> menurut periodenya adalah:<br />
<ul>
<li>Alat Hitung Tradisional dan Kalkulator Mekanik</li>
<li>Komputer Generasi Pertama</li>
<li>Komputer Generasi Kedua</li>
<li>Komputer Generasi Ketiga</li>
<li>Komputer Generasi Keempat</li>
<li>Komputer Generasi Kelima<a name='more'></a></li>
</ul>
<img alt="eniac 3 full Sejarah Komputer dan Perkembanganya" height="340" src="http://gakadaloegakrame.files.wordpress.com/2011/07/eniac_3-full.jpg" title="Sejarah
Komputer dan Perkembanganya" width="412" /><br />
<b>1. Komputer Generasi Pertama (1946 – 1959)</b><br />
Dengan terjadinya Perang Dunia II, negaranegara yang terlibat dalam perang tersebut berusaha mengembangkan untuk mengeksploit potensi strategis yang dimiliki komputer.<br />
Hal ini meningkatkan pendanaan pengembangan komputer serta mempercepat kemajuan teknik komputer.<br />
(1) Colassus<br />
(2) Mark I<br />
(3) ENIAC<br />
(4) EDVAC<br />
(5) UNIVAC I<br />
Ciri komputer generasi pertama adalah:<br />
- Penggunaan tube vakum (yang membuat komputer pada masa tersebut berukuran sangat besar)<br />
- Adanya silinder magnetik untuk penyimpanan data.<br />
- Instruksi operasi dibuat secara spesifik untuk suatu tugas tertentu.<br />
- Setiap komputer memiliki program kodebiner yang berbeda yang disebut “bahasa mesin” (machine language). Hal ini menyebabkan komputer sulit untuk diprogram dan membatasi kecepatannya.<br />
<b>2. Komputer Generasi Kedua (1959 – 1964)</b><br />
Stretch dan LARC<br />
Mesin pertama yang memanfaatkan teknologi baru ini adalah superkomputer. IBM membuat superkomputer bernama Stretch, dan Sprery Rand membuat komputer bernama LARC. Komputerkomputer ini,yang dikembangkan untuk laboratorium energi atom, dapat menangani sejumlah besar data, sebuah kemampuan yang sangat dibutuhkan oleh peneliti atom. Mesin tersebut sangat mahal dan cenderung terlalu kompleks untuk kebutuhan komputasi bisnis, sehingga membatasi kepopulerannya.<br />
Hanya ada dua LARC yang pernah dipasang dan digunakan: satu di Lawrence Radiation Labs di Livermore, California, dan yang lainnya di US Navy Research and Development Center di Washington D.C. Komputer generasi kedua menggantikan bahasa mesin dengan bahasa assembly. Bahasa assembly adalah bahasa yang menggunakan singkatansingakatan untuk menggantikan kode biner.<br />
Pada awal 1960an, mulai bermunculan komputer generasi kedua yang sukses di bidang bisnis, di universitas, dan di pemerintahan. Komputer generasi kedua ini merupakan komputer yang sepenuhnya menggunakan transistor. Mereka juga memiliki komponenkomponen yang dapat diasosiasikan dengan komputer pada saat ini: printer, penyimpanan dalam disket, memory, sistem operasi, dan program.<br />
Ciri-ciri komputer pada generasi kedua:<br />
- Penggunaan transistor sehingga ukurannya lebih kecil<br />
- Adanya pengembangan memori intimagnetik membantu pengembangan komputer generasi kedua yang lebih kecil, lebih cepat, lebih dapat diandalkan, dan lebih hemat energi dibanding para pendahulunya<br />
- Penggantian dari bahasa mesin menjadi bahasa Asembly<br />
- Muncul bahasa pemrograman COBOL dan FORTRAN<br />
<b>3. Komputer Generasi Ketiga (1964 – 1970)</b><br />
Walaupun transistor dalam banyak hal mengungguli tube vakum, namun transistor menghasilkan panas yang cukup besar, yang dapat berpotensi merusak bagianbagian internal komputer. Batu kuarsa (quartz rock) menghilangkan masalah ini. Jack Kilby, seorang insinyur di Texas Instrument, mengembangkan sirkuit terintegrasi (IC : integrated circuit) di tahun 1958. IC mengkombinasikan tiga komponen elektronik dalam sebuah piringan silikon kecil yang terbuat dari pasir kuarsa.<br />
Pada ilmuwan kemudian berhasil memasukkan lebih banyak komponenkomponen ke dalam suatu chiptunggal yang disebut semikonduktor. Hasilnya, komputer menjadi semakin kecil karena komponenkomponen dapat dipadatkan dalam chip. Kemajuan komputer generasi ketiga lainnya adalah penggunaan system operasi (operating system) yang memungkinkan mesin untuk menjalankan berbagai program yang berbeda secara serentak dengan sebuah program utama yang memonitor dan mengkoordinasi memori komputer.<br />
Ciri-ciri komputer pada generasi ketiga:<br />
- Penggunaan IC(Intregrated Circuit)<br />
- Ukuran komputer menjadi lebih kecil<br />
- Ditemukannya Sistem Operasi<br />
<b>4. Komputer Generasi Keempat (1979 – sekarang)</b><br />
Setelah IC, tujuan pengembangan menjadi lebih jelas: mengecilkan ukuran sirkuit dan komponenkomponen elektrik. Large Scale Integration (LSI) dapat memuat ratusan komponen dalam sebuah chip. Pada tahun 1980 an, Very Large Scale Integration (VLSI) memuat ribuan komponen dalam sebuah chip tunggal. UltraLarge Scale Integration (ULSI) meningkatkan jumlah tersebut menjadi jutaan. Kemampuan untuk memasang sedemikian banyak komponen dalam suatu keping yang berukurang setengah keping uang logam mendorong turunnya harga dan ukuran komputer. Hal tersebut juga meningkatkan daya kerja, efisiensi dan keterandalan komputer.<br />
Chip Intel 4004 yang dibuat pada tahun 1971 membawa kemajuan pada IC dengan meletakkan seluruh komponen dari sebuah komputer (central processing unit, memori, dan kendali input/output) dalam sebuah chip yang sangat kecil. Sebelumnya, IC dibuat untuk mengerjakan suatu tugas tertentu yang spesifik. Sekarang, sebuah mikroprosesor dapat diproduksi dan kemudian diprogram untuk memenuhi seluruh kebutuhan yang diinginkan. Tidak lama kemudian, setiap <a href="http://merahitam.com/perangkat-keras-komputer-hardware.html" title="Perangkat Keras
Komputer (Hardware, Fungsi dan Pengertianya)">perangkat</a> rumah tangga seperti microwave oven, televisi, dan mobil dengan electronic fuel injection dilengkapi dengan mikroprosesor.<br />
Perkembangan yang demikian memungkinkan orangorang biasa untuk menggunakan komputer biasa. Komputer tidak lagi menjadi dominasi perusahaanperusahaan besar atau lembaga pemerintah. Pada pertengahantahun 1970an, perakit komputer menawarkan produk komputer mereka ke masyarakat umum. Komputerkomputer ini, yang disebut minikomputer, dijual dengan paket piranti lunak yang mudah digunakan oleh kalangan awam. Piranti lunak yang paling populer pada saat itu adalah program word processing dan spreadsheet. Pada awal 1980an, video game seperti Atari 2600 menarik perhatian konsumen pada komputer rumahan yang lebih canggih dan dapat diprogram.<br />
Pada tahun 1981, IBM memperkenalkan penggunaan Personal Computer (PC) untuk penggunaan di rumah, kantor, dan sekolah. Jumlah PC yang digunakan melonjak dari 2 juta unit di tahun 1981 menjadi 5,5 juta unit di tahun 1982. Sepuluh tahun kemudian, 65 juta PC digunakan. Komputer melanjutkan evolusinya menuju ukuran yang lebih kecil, dari komputer yang berada di atas meja (desktop computer) menjadi komputer yang dapat dimasukkan ke dalam tas (laptop), atau bahkan komputer yang dapat digenggam (palmtop).<br />
IBM PC bersaing dengan <a href="http://merahitam.com/biografi-steve-jobs-kiprah-serta-karir-steve-jobs.html" title="See
also Biografi Steve Jobs, Kiprah Serta Karir Steve Jobs">Apple</a> Macintosh dalam memperebutkan pasar komputer. <a href="http://merahitam.com/modal-apple-untuk-1unit-iphone4s.html" title="See also Modal
Apple Untuk 1 Unit iPhone 4S Hanya Rp1,6 Juta">Apple</a> Macintosh menjadi terkenal karena mempopulerkan system grafis pada komputernya, sementara saingannya masih menggunakan komputer yang berbasis teks. Macintosh juga mempopulerkan penggunaan piranti mouse.<br />
Pada masa sekarang, kita mengenal perjalanan IBM compatible dengan pemakaian CPU: IBM PC/486, Pentium, Pentium II, Pentium III, Pentium IV (Serial dari CPU buatan Intel). Juga kita kenal AMD k6, Athlon, dsb. Ini semua masuk dalam golongan komputer generasi keempat. Seiring dengan menjamurnya penggunaan komputer di tempat kerja, cara cara baru untuk menggali potensial terus dikembangkan. Seiring dengan bertambah kuatnya suatu komputer kecil, komputerkomputer tersebut dapat dihubungkan secara bersamaan dalam suatu jaringan untuk saling berbagi memori, piranti lunak, informasi, dan juga untuk dapat saling berkomunikasi satu dengan yang lainnya. Komputer jaringan memungkinkan komputer tunggal untuk membentuk kerjasama elektronik untuk menyelesaikan suatu proses tugas. Dengan menggunakan perkabelan langsung (disebut juga local area network, LAN), atau kabel telepon, jaringan ini dapat berkembang menjadi sangat besar.<br />
Ciri-ciri komputer pada generasi keempat:<br />
• Digunakannya LSI, VLSI, ULSI<br />
• Digunakannya mikroprosesor<br />
Banyak kemajuan di bidang disain komputer dan teknologi semakin memungkinkan pembuatan komputer generasi kelima. Dua kemajuan rekayasa yang terutama adalah kemampuan pemrosesan paralel, yang akan menggantikan model von Neumann. Model von Neumann akan digantikan dengan sistem yang mampu mengkoordinasikan banyak CPU untuk bekerja secara serempak. Kemajuan lain adalah teknologi superkonduktor yang memungkinkan aliran elektrik tanpa ada hambatan apapun, yang nantinya dapat mempercepat kecepatan informasi.<br />
Jepang adalah negara yang terkenal dalam sosialisasi jargon dan proyek komputer generasi kelima. Lembaga ICOT (Institute for new Computer Technology) juga dibentuk untuk merealisasikannya. Banyak kabar yang menyatakan bahwa proyek ini telah gagal, namun beberapa informasi lain bahwa keberhasilan proyek komputer generasi kelima ini akan membawa perubahan baru paradigma komputerisasi di dunia. Kita tunggu informasi mana yang lebih valid dan membuahkan hasil.</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com0tag:blogger.com,1999:blog-336492081521334799.post-70885965527078541582011-12-18T02:59:00.000-08:002012-11-14T15:06:23.846-08:00KOMPUTER<div dir="ltr" style="text-align: left;" trbidi="on">
<b>Pengertian <a href="http://merahitam.com/sejarah-komputer-dan-perkembanganya.html" title="See also Sejarah Komputer dan
Perkembanganya">Komputer</a></b> –<br />
dilihat dari beberapa aspek. Istilah komputer mempunyai arti yang luas dan berbeda bagi setiap orang. Istilah komputer (computer) diambil dari bahasa Latin computare yang berarti menghitung (to compute atau to reckon).<br />
<img alt=" Pengertian Komputer, Apa Itu Komputer?" height="135" src="http://qiezzy.files.wordpress.com/2008/12/light-pen.gif?w=143&h=123" title="Pengertian
Komputer, Apa Itu Komputer?" width="157" /><br />
Menurut Blissmer (1985), <b>komputer adalah</b> suatu alat elektronik yang mampu melakukan beberapa tugas, yaitu menerima input, memproses input sesuai dengan instruksi yang diberikan, menyimpan perintah-perintah dan hasil pengolahannya, serta menyediakan output dalam bentuk informasi.<br />
Sedangkan menurut Sanders (1985), komputer adalah sistem elektronik untuk memanipulasi data yang cepat dan tepat serta dirancang dan diorganisasikan supaya secara otomatis menerima dan menyimpan data input, memprosesnya, dan menghasilkan output berdasarkan instruksi-instruksi yang telah tersimpan di dalam memori. Dan masih banyak lagi ahli yang mencoba mendefinisikan secara berbeda tentang komputer. Namun, pada intinya dapat disimpulkan bahwa komputer adalah<br />
suatu peralatan elektronik yang dapat menerima input, mengolah input, memberikan informasi, menggunakan suatu program yang tersimpan di memori komputer, dapat menyimpan program dan hasil pengolahan, serta bekerja secara otomatis.<br />
Dari <i><b>definisi</b></i> tersebut terdapat tiga istilah penting, yaitu input (data), pengolahan data, dan informasi (output). Pengolahan data dengan menggunakan komputer dikenal dengan nama pengolahan data elektronik (PDE) atau elecronic data processing (EDP). Data adalah kumpulan kejadian yang diangkat dari suatu kenyataan (fakta), dapat berupa angka-angka, huruf, simbol-simbol khusus, atau gabungan dari ketiganya. Data masih belum dapat bercerita banyak sehingga perlu diolah lebih lanjut.<br />
Pengolahan data merupakan suatu proses manipulasi dari data ke dalam bentuk yang lebih berguna dan lebih berati, yaitu berupa suatu informasi. Dengan demikian, informasi adalah hasil dari suatu kegiatan pengolahan data yang memberikan bentuk yang lebih bermakna dari suatu fakta. Oleh karena itu, pengolahan data elektronik adalah proses manipulasi dari data ke dalam bentuk yang lebih bermakna berupa suatu informasi dengan menggunakan suatu alat elektronik, yaitu komputer.<br />
Menurut buku <b>Computer Annual</b> (Robert H.Blissmer), komputer adalah suatu alat elektronik yang mampu <br />
<a name='more'></a>melakukan beberapa tugas sebagai berikut :<br />
<ul>
<li>Menerima <i>input</i></li>
<li>Memproses <i>input</i> tadi sesuai dengan programmnya</li>
<li>Menyimpan perintah-perintah dan hasil dari pengolahan</li>
<li>Menyediakan <i>output</i> dalam bentuk informasi</li>
</ul>
Menurut buku <b>Computer Today</b> (Donald H.Sanders), komputer adalah sistem elektronik untuk memanipulasi data yang cepat dan tepat serta dirancang dan diorganisasikan supaya secara otomatis menerima dan menyimpan data input, memprosesnya dan menghasilkan <i>output</i> dibawah pengawasan suatu langkah-langkah instruksi-instruksi program yang tersimpan di memori (<i>stored program</i>).<br />
Menurut buku <b>Computer Organization</b> (V.C. Hamacher, Z.G. Vranesic. S.G. Zaky), komputer adalah mesin penghitung elektronik yang cepat dapat menerima informasi <i>input</i> digital, memprosesnya sesuai dengan suatu program yang tersimpan di memorinya (<i>stored program</i>) dan menghasilkan <i>output </i>informasi.<br />
Menurut buku <b>Introduction To The Computer, The Tool Of Busines</b> (William M.Fouri), komputer adalah suatu pemroses data (<i>data processor</i>) yang dapat melakukan perhitungan besar dan cepat, termasuk perhitungan aritmatika yang besar atau operasi logika, tanpa campur tangan dari manusia mengoperasikan selama pemrosesan.<br />
Menurut buku <b>Introduction To Computers</b> (Gordon B. Davis), komputer adalah tipe khusus alat penghitung yang mempunyai sifat tertentu yang pasti.<br />
Dari beberapa definisi yang didapat dari berbagai buku, dapat disimpulkan bahwa komputer adalah :<br />
<ul>
<li>Alat elektronik</li>
<li>Dapat menerima <i>input</i> data</li>
<li>Dapat mengolah data</li>
<li>Dapat memberikan informasi</li>
<li>Menggunakan suatu program yang tersimpan di memori komputer (<i>stored program</i>)</li>
<li>Dapat menyimpan program dan hasil pengolahan</li>
<li>Bekerja secara otomatis</li>
</ul>
Sedangkan yang disebut dengan program adalah kumpulan instruksi atau perintah terperinci yang sudah dipersiapkan supaya komputer dapat melakukan fungsinya dengan cara yang sudah tertentu.<br />
Seiring dengan perkembangan dunia teknologi maka mungkin saja <b>Pengertian Komputer</b> itu sendiri akan mengalami perubahan sesuai dengan konteksnya nanti. Tertarik seputar komputer sobat bisa baca juga<a href="http://merahitam.com/sejarah-komputer-dan-perkembanganya.html" title="Sejarah Komputer dan Perkembanganya"> sejarah Komputer</a> serta pemahaman akan <a href="http://merahitam.com/perangkat-keras-komputer-hardware.html" title="Perangkat Keras
Komputer ">perangkat keras komputer</a>.</div>
Anonymoushttp://www.blogger.com/profile/01238017227570730734noreply@blogger.com1