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Kisi kisi
- 1. Tugas Matematika Kisi-kisi test 2 Disusun Oleh : POLITEKNIK MANUFAKTUR NEGERI BANGKA BELITUNG TAHUN AJARAN 2014/2015 Industri Air Kantung Sungailiat 33211 Bangka Induk, Propinsi Kepulauan Bangka Belitung Telp : +62717 93586 Fax : +6271793585 email : polman@polman-babel.ac.id http://www.polman-babel.ac.id Nama : Sarman Kelas : 1 EB Prodi : Elektronika Semester : 2 ( Genap)
- 3. PENYELESAIAN : 1 . (π₯10 β 6 π₯5 + π₯73 ) ππ₯ = (π₯10 β 6π₯β5 + π₯ 7 3) ππ₯ = 1 11 π₯11 + 6 4 π₯β4 + 3 10 π₯ 10 3 +c = 1 11 π₯11 + 3 42 π₯β4 + 3 10 π₯ 10 3 +c 2. cos 9π₯ β 11 + π ππ2 6π₯ β 8 ππ₯ 1 9 sin (9x-11) + 1 6 tan (6x-8 ) + c 3. Dengan menggunakan cara subsitusi π₯ 6+π₯2 ππ₯ = π₯(6 + π₯2 ) 1 2 ππ₯ Misalkan : π’ = 6 + π₯2 ππ’ ππ₯ = 2π₯ ππ’ = 1 2π₯ ππ’ π₯ 6 + π₯2 1 2 ππ₯ = π₯ π’ 1 2 . 1 2π₯ ππ’ = π₯ 2π₯ π’ 1 2 ππ’ = 1 2 π’ 1 2 ππ’ = 1 2 1 2 +1 π’ 3 2 + π = 1 3 π’ 3 2 +c = 1 3 ( 6 + π₯2 ) 3 2 + π 4. Dengan menggunkan cara subsitusi 2π₯ + 5 cosβ‘(2π₯2 + 10π₯ + 8 ) ππ₯ Misalkan U =2π₯2 + 10π₯ + 8 ππ’ ππ₯ = 4π₯ + 10 Dx= 1 4π₯+10 ππ’ 2π₯ + 5 cosβ‘(2π₯2 + 10π₯ + 8 ) ππ₯ = 2π₯ + 5 cos π’ 1 4π₯+10 du 2π₯+5 2 2π₯+5 cos π’ ππ’ 1 2 cos u du
- 4. = 1 2 sin u du = 1 2 sin (2π₯ 2 + 10x +8 ) + c 5. Integral parsial 2π₯. sinβ‘(10π₯ + 3) dx Mislkan : U = 2x dv =sin (10x +3 ) du =2dx v = sin 10π₯ + 3 ππ₯ = β 1 10 cos(10π₯ 3) Type equation here. πππ£ =Uv - πππ’ = 2 π₯ . sin 10π + 3 ππ₯ = 2π₯ ( 1 10 cos 10π₯ + 3 β 1 10 cos 10π₯ + 3 . 2 ππ₯ = 1 5 π₯ cos 10π₯ + 3 + 2 100 sin (10x +3) + c = 1 5 π₯ cos 10π₯ + 3 + 1 50 sin (10x +3) + c 6. Dengan menggunakan table π₯2 πβ7π₯ ππ₯ Turunan U Integral dv + π₯2 - 2x + 2 - 0 πβ7π₯ β 1 7 πβ7π₯ 1 49 πβ7π₯ β 1 363 πβ7π₯ π’ππ£ = π₯2 ( β 1 7 πβ7π₯ ) -2x . 1 49 πβ7π₯ + 2 β 1 369 πβ7π₯ + π = βπ₯2 1 7 πβ7π₯ - 2x . 1 49 β 2 363 πβ7π₯ πβ7π₯ + π = β 1 7 π₯2 πβ7π₯ - 2 49 π₯ π β7π₯ β 2 363 πβ7π₯ + π
- 5. 7. Integral fungsi rasional π₯ π₯2 β 2π₯ β 35 ππ₯ π₯ π₯2β2π₯β35 = π₯ π₯β7 (π₯+5) = π΄ (π₯β7) + π΅ (π₯+5) = π΄ π₯+5 +π΅(π₯β7) π₯β7 π₯+5 = π΄π₯+5π΄+π΅π₯β7π΅) π₯β7 π₯+5 A+B = 1 π₯5 5A+5B = 5 5A +B =0 π₯1 5A-7B = 0 - 12B =5 B= 5 12 A= 7 12 Sehingga : π₯ π₯ β 7 (π₯ + 5) ππ₯ = π΄ π₯ β 7 ππ₯ + π΅ π₯ + 5 ππ₯ = 7 12 π₯β7 ππ₯ + 5 12 π₯+5 ππ₯ = 7 12 ππ π₯ β 7 + 5 12 ππ π₯ + 5 +c 8. ( π₯45 1 + 3π₯ + 1 π₯3 ) ππ₯ = ( π₯45 1 + 3π₯ + π₯β3 ) ππ₯ = 1 5 π₯5 + 3 2 π₯2 β 1 2 π₯β2 5 1 = ( 1 5 55 + 3 2 52 β 1 2 π₯5β2 ) β( 1 5 15 + 3 2 12 β 1 2 1β2 ) (625 + 75 2 β 1 50 ) β ( 1 5 + 3 2 β 1 2 ) =625- 1 + 75 2 - 1 50 - 1 5 =624 + 75 2 - 1 50 - 1 5 31200 + 1875 β 1 β 10 50 = 33064 50 = 661 14 50
- 6. 9. Dik = y = π₯2 β 1 y = 3x + 9 Dit = Luas daerah Jawab : π₯2 β 1 = 3π₯ + 9 π₯2 β 1 β 3π₯ β 9 = 0 π₯2 β 3π₯ β 10 = 0 (x-5) (x+2) = 0 X= 5 v x=-2 = 3π₯ + 9 β (π₯25 β2 β 1) ππ₯ = 3π₯ β 5 β2 π₯2 + 10 ππ₯ = 3 2 π₯2 β 1 3 π₯3 + 10π₯ 5 β2 = 3 2 52 β 1 3 53 + 10.5 β 3 2 (β2)2 β 1 3 (β2)3 + 10.β2 = 75 2 β 125 3 + 50 β 6 + 8 3 β 20 = 225β250+300 6 β 18+8β60 3 = 275 6 + 34 3 = 275+68 6 = 343 6 = 57 1 6 10. Diketahu : y = 3x y= x y= 0 y= 2 Dit : Volume benda mengelilingi sumbu y Jawab : V = π π₯2 β π₯22 ππ¦ π π = π (π¦2 β ( 2 0 1 3 π¦)2 ) dy = π π¦2 β 2 0 1 9 π¦2 dy = π β 2 0 8 9 π¦2 dy =π( 8 9 2+1 π¦2+1 ) 2 0 = π( 8 27 π¦3 ) 2 0 = π( 8 27 23 - 8 27 β 03 ) = π( 64 27 =2 10 27 β π