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Tugas Kisi-Kisi UAS MTK Sem. 2

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TUGAS MATEMATIKA Kisi-Kisi Test Akhir Sem.2 MTK2 Di susun oleh : Nama : Pradana P. S Kelas : 1 ElektronikaB Semester : 2 (Genap) Jurusan : Elektronikadan Informatika POLITEKNIK MANUFAKTUR NEGERI BANGKA BELITUNG Kawasan Industri Air Kantung Sungailiat 33211 Bangka Induk Propinsi Kepulauan Bangka Belitung Telp : (0717) 431335 ext. 2281, 2126 Fax : (0717) 93585 email : polman@polman-babel.ac.id http://www.polman-babel.ac.id/
1 . ∫(π‘₯10 βˆ’ 6 π‘₯5 + √π‘₯73 ) 𝑑π‘₯ = ∫(π‘₯10 βˆ’ 6π‘₯βˆ’5 + π‘₯ 7 3) 𝑑π‘₯ = 1 11 π‘₯11 + 6 4 π‘₯βˆ’4 + 3 10 π‘₯ 10 3 +c = 1 11 π‘₯11 + 3 2 π‘₯βˆ’4 + 3 10 π‘₯ 10 3 +c 2. ∫[cos(9π‘₯ βˆ’ 11) + 𝑠𝑒𝑐2(6π‘₯ βˆ’ 8)] 𝑑π‘₯ = 1 9 sin(9π‘₯ βˆ’ 11) + 1 6 tan(6π‘₯ βˆ’ 8) + 𝑐 3. Denganmenggunakancara subsitusi ∫ π‘₯ √6+π‘₯2 𝑑π‘₯ =∫ π‘₯(6 + π‘₯2) 1 2 𝑑π‘₯ Misalkan : 𝑒 = 6 + π‘₯2 𝑑𝑒 𝑑π‘₯ = 2π‘₯ 𝑑𝑒 = 1 2π‘₯ 𝑑𝑒 ∫ π‘₯(6 + π‘₯2) 1 2 𝑑π‘₯ =∫ π‘₯ π‘ˆ βˆ’1 2 . 1 2π‘₯ 𝑑𝑒 =∫ π‘₯ 2π‘₯ . π‘ˆ βˆ’1 2 𝑑𝑒 =∫ 1 2 . π‘ˆ βˆ’1 2 𝑑𝑒 = 1 2 βˆ’1 2 +1 π‘ˆ βˆ’1 2 +1 + 𝐢 = 1 2 1 2 π‘ˆ 1 2 + 𝐢 =(6π‘₯ + π‘₯2) 1 2 + 𝐢
4. Denganmenggunkancara subsitusi ∫(2π‘₯ + 5)cos(2π‘₯2 + 10π‘₯ + 8 ) 𝑑π‘₯ Misalkan U =2π‘₯2 + 10π‘₯ + 8 𝑑𝑒 𝑑π‘₯ = 4π‘₯ + 10 Dx= 1 4π‘₯+10 𝑑𝑒 ∫(2π‘₯ + 5)cos(2π‘₯2 + 10π‘₯ + 8 ) 𝑑π‘₯ =∫(2π‘₯ + 5)cos 𝑒 1 4π‘₯+10 du ∫ (2π‘₯+5) 2 (2π‘₯+5) cos 𝑒 𝑑𝑒 ∫ 1 2 cos u du = 1 2 sinu du = 1 2 sin(2π‘₯ 2+ 10x +8 ) + c 5. Integral parsial ∫2π‘₯. sin(10π‘₯ + 3) dx Misalkan: u= 2x du =2dx dv =sin(10x +3 ) v=∫sin(10π‘₯ + 3) 𝑑π‘₯ = βˆ’ 1 10 cos(10π‘₯ + 3) =∫ π‘ˆπ‘‘π‘£ = 𝑒𝑣 βˆ’βˆ« 𝑣 𝑑𝑒 =∫2π‘₯.sin(10π‘₯ + 3) 𝑑π‘₯ =2π‘₯ (βˆ’ 1 10 cos(10π‘₯ + 3)) βˆ’ βˆ«βˆ’ 1 10 cos(10π‘₯ + 3). 2 𝑑π‘₯ =βˆ’ 1 5 π‘₯.cos(10π‘₯ + 3) 𝑑π‘₯ + 2 100 sin(10π‘₯ + 3) + 𝐢
=βˆ’ 1 5 π‘₯.cos(10π‘₯ + 3) + 1 50 sin(10π‘₯ + 3) + 𝐢 6. Denganmenggunakantable ∫ π‘₯2 π‘’βˆ’7π‘₯ 𝑑π‘₯ Turunan U Integral dv +π‘₯2 -2x +2 -0 π‘’βˆ’7π‘₯ βˆ’ 1 7 π‘’βˆ’7π‘₯ 1 49 π‘’βˆ’7π‘₯ βˆ’ 1 363 π‘’βˆ’7π‘₯ ∫ 𝑒𝑑𝑣 = π‘₯2 ( βˆ’ 1 7 π‘’βˆ’7π‘₯) -2x . 1 49 π‘’βˆ’7π‘₯ + 2 (βˆ’ 1 369 π‘’βˆ’7π‘₯)+ 𝑐 = βˆ’π‘₯2 1 7 π‘’βˆ’7π‘₯ -2x . 1 49 βˆ’ 2 363 π‘’βˆ’7π‘₯ π‘’βˆ’7π‘₯ + 2 + 𝑐 = βˆ’ 1 7 π‘₯2 π‘’βˆ’7π‘₯ -2x . 1 49 βˆ’ 2 363 π‘’βˆ’7π‘₯ π‘’βˆ’7π‘₯ + 2 + 𝑐 7.Integral fungsi rasional ∫ π‘₯ π‘₯2βˆ’2π‘₯βˆ’35 𝑑π‘₯ π‘₯ π‘₯2βˆ’2π‘₯βˆ’35 = π‘₯ ( π‘₯βˆ’7)(π‘₯+5) = 𝐴 (π‘₯βˆ’7) + 𝐡 (π‘₯+5) = 𝐴( π‘₯+5)+𝐡(π‘₯βˆ’7) ( π‘₯βˆ’7)( π‘₯+5) 𝐴π‘₯+5𝐴+𝐡π‘₯βˆ’7𝐡) ( π‘₯βˆ’7)( π‘₯+5) A+B = 1 x5 5A+5B = 5 5A +B =0 x1 5A-7B = 0 12B=5
B= 5 12 A= 7 12 Sehingga: ∫ π‘₯ ( π‘₯βˆ’7)(π‘₯+5) 𝑑π‘₯ = ∫ 𝐴 ( π‘₯βˆ’7) 𝑑π‘₯ + ∫ 𝐡 ( π‘₯+5) 𝑑π‘₯ =∫ 7 12 ( π‘₯βˆ’7) 𝑑π‘₯ + ∫ 5 12 ( π‘₯+5) 𝑑π‘₯ = 7 12 𝑙𝑛 x-7 + 5 12 𝑙𝑛 x+5 + C 8.∫ ( π‘₯45 1 + 3π‘₯ + 1 π‘₯3 ) 𝑑π‘₯ =∫ ( π‘₯45 1 + 3π‘₯ + π‘₯βˆ’3 ) 𝑑π‘₯ = 1 5 [π‘₯5 + 3 2 π‘₯2 βˆ’ 1 2 π‘₯βˆ’2]5 1 = ( 1 5 55 + 3 2 52 βˆ’ 1 2 π‘₯5βˆ’2 ) –( 1 5 15 + 3 2 12 βˆ’ 1 2 1βˆ’2 ) =(625 + 75 2 βˆ’ 1 50 ) βˆ’ ( 1 5 + 3 2 βˆ’ 1 2 ) =625- 1 + 75 2 βˆ’ 1 50 βˆ’ 1 5 =624 + 75 2 - 1 50 - 1 5 31200 + 1875 βˆ’ 1 βˆ’ 10 50 = 33064 50 = 661 14 50 9.Dik = y = π‘₯2 βˆ’ 1 Y = 3x + 9 Dit = Luas daerah Jawab: π‘₯2 βˆ’ 1 = 3π‘₯ + 9 π‘₯2 βˆ’ 1 βˆ’ 3π‘₯ βˆ’ 9 = 0 π‘₯2 βˆ’ 3π‘₯ βˆ’ 10 = 0 (x-5) (x+2) = 0
X= 5 v x=-2 L=∫ (3π‘₯ + 9 )– (π‘₯25 βˆ’2 βˆ’ 1) 𝑑π‘₯ =∫ 3π‘₯ βˆ’ 5 βˆ’2 π‘₯2 + 10 𝑑π‘₯ = 3 2 [π‘₯2 βˆ’ 1 3 π‘₯3 + 10π‘₯] 5 βˆ’2 =( 3 2 52 βˆ’ 1 3 53 + 10.5) βˆ’ ( 3 2 (βˆ’2)2 βˆ’ 1 3 (βˆ’2)3 + 10. βˆ’2) = ( 75 2 βˆ’ 125 3 + 50) βˆ’ (6 + 8 3 βˆ’ 20) = ( 225βˆ’250+300 6 ) βˆ’ ( 18+8βˆ’60 3 ) = 275 6 + 34 3 = 275+68 6 = 343 6 = 57 1 6 10. Diketahu : iy= 3x Y= x Y= 0 y= 2 Dit : Volume benda =mengelilingi sumbuy Jawab= V = πœ‹ ∫ ( π‘₯2 βˆ’ π‘₯22) 𝑑𝑦 𝑑 𝑒 = πœ‹βˆ« (𝑦2 βˆ’ ( 2 0 1 3 𝑦)2 ) dy = πœ‹βˆ« 𝑦2 βˆ’ 2 0 1 9 𝑦2 dy = πœ‹βˆ« βˆ’ 2 0 8 9 𝑦2 dy =πœ‹[( 8 9 2+1 𝑦2+1)] 2 0 = πœ‹( 8 27 𝑦3) 2 0 = πœ‹( 8 27 23-)-( 8 27 . 03) = πœ‹ 64 27 =2 10 27 πœ‹

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Tugasmtk10 150712214046-lva1-app6891

  • 1.
    TUGAS MATEMATIKA Kisi-Kisi TestAkhir Sem.2 MTK2 Di susun oleh : Nama : Pradana P. S Kelas : 1 ElektronikaB Semester : 2 (Genap) Jurusan : Elektronikadan Informatika POLITEKNIK MANUFAKTUR NEGERI BANGKA BELITUNG Kawasan Industri Air Kantung Sungailiat 33211 Bangka Induk Propinsi Kepulauan Bangka Belitung Telp : (0717) 431335 ext. 2281, 2126 Fax : (0717) 93585 email : polman@polman-babel.ac.id http://www.polman-babel.ac.id/
  • 2.
    1 . ∫(π‘₯10βˆ’ 6 π‘₯5 + √π‘₯73 ) 𝑑π‘₯ = ∫(π‘₯10 βˆ’ 6π‘₯βˆ’5 + π‘₯ 7 3) 𝑑π‘₯ = 1 11 π‘₯11 + 6 4 π‘₯βˆ’4 + 3 10 π‘₯ 10 3 +c = 1 11 π‘₯11 + 3 2 π‘₯βˆ’4 + 3 10 π‘₯ 10 3 +c 2. ∫[cos(9π‘₯ βˆ’ 11) + 𝑠𝑒𝑐2(6π‘₯ βˆ’ 8)] 𝑑π‘₯ = 1 9 sin(9π‘₯ βˆ’ 11) + 1 6 tan(6π‘₯ βˆ’ 8) + 𝑐 3. Denganmenggunakancara subsitusi ∫ π‘₯ √6+π‘₯2 𝑑π‘₯ =∫ π‘₯(6 + π‘₯2) 1 2 𝑑π‘₯ Misalkan : 𝑒 = 6 + π‘₯2 𝑑𝑒 𝑑π‘₯ = 2π‘₯ 𝑑𝑒 = 1 2π‘₯ 𝑑𝑒 ∫ π‘₯(6 + π‘₯2) 1 2 𝑑π‘₯ =∫ π‘₯ π‘ˆ βˆ’1 2 . 1 2π‘₯ 𝑑𝑒 =∫ π‘₯ 2π‘₯ . π‘ˆ βˆ’1 2 𝑑𝑒 =∫ 1 2 . π‘ˆ βˆ’1 2 𝑑𝑒 = 1 2 βˆ’1 2 +1 π‘ˆ βˆ’1 2 +1 + 𝐢 = 1 2 1 2 π‘ˆ 1 2 + 𝐢 =(6π‘₯ + π‘₯2) 1 2 + 𝐢
  • 3.
    4. Denganmenggunkancara subsitusi ∫(2π‘₯+ 5)cos(2π‘₯2 + 10π‘₯ + 8 ) 𝑑π‘₯ Misalkan U =2π‘₯2 + 10π‘₯ + 8 𝑑𝑒 𝑑π‘₯ = 4π‘₯ + 10 Dx= 1 4π‘₯+10 𝑑𝑒 ∫(2π‘₯ + 5)cos(2π‘₯2 + 10π‘₯ + 8 ) 𝑑π‘₯ =∫(2π‘₯ + 5)cos 𝑒 1 4π‘₯+10 du ∫ (2π‘₯+5) 2 (2π‘₯+5) cos 𝑒 𝑑𝑒 ∫ 1 2 cos u du = 1 2 sinu du = 1 2 sin(2π‘₯ 2+ 10x +8 ) + c 5. Integral parsial ∫2π‘₯. sin(10π‘₯ + 3) dx Misalkan: u= 2x du =2dx dv =sin(10x +3 ) v=∫sin(10π‘₯ + 3) 𝑑π‘₯ = βˆ’ 1 10 cos(10π‘₯ + 3) =∫ π‘ˆπ‘‘π‘£ = 𝑒𝑣 βˆ’βˆ« 𝑣 𝑑𝑒 =∫2π‘₯.sin(10π‘₯ + 3) 𝑑π‘₯ =2π‘₯ (βˆ’ 1 10 cos(10π‘₯ + 3)) βˆ’ βˆ«βˆ’ 1 10 cos(10π‘₯ + 3). 2 𝑑π‘₯ =βˆ’ 1 5 π‘₯.cos(10π‘₯ + 3) 𝑑π‘₯ + 2 100 sin(10π‘₯ + 3) + 𝐢
  • 4.
    =βˆ’ 1 5 π‘₯.cos(10π‘₯ + 3)+ 1 50 sin(10π‘₯ + 3) + 𝐢 6. Denganmenggunakantable ∫ π‘₯2 π‘’βˆ’7π‘₯ 𝑑π‘₯ Turunan U Integral dv +π‘₯2 -2x +2 -0 π‘’βˆ’7π‘₯ βˆ’ 1 7 π‘’βˆ’7π‘₯ 1 49 π‘’βˆ’7π‘₯ βˆ’ 1 363 π‘’βˆ’7π‘₯ ∫ 𝑒𝑑𝑣 = π‘₯2 ( βˆ’ 1 7 π‘’βˆ’7π‘₯) -2x . 1 49 π‘’βˆ’7π‘₯ + 2 (βˆ’ 1 369 π‘’βˆ’7π‘₯)+ 𝑐 = βˆ’π‘₯2 1 7 π‘’βˆ’7π‘₯ -2x . 1 49 βˆ’ 2 363 π‘’βˆ’7π‘₯ π‘’βˆ’7π‘₯ + 2 + 𝑐 = βˆ’ 1 7 π‘₯2 π‘’βˆ’7π‘₯ -2x . 1 49 βˆ’ 2 363 π‘’βˆ’7π‘₯ π‘’βˆ’7π‘₯ + 2 + 𝑐 7.Integral fungsi rasional ∫ π‘₯ π‘₯2βˆ’2π‘₯βˆ’35 𝑑π‘₯ π‘₯ π‘₯2βˆ’2π‘₯βˆ’35 = π‘₯ ( π‘₯βˆ’7)(π‘₯+5) = 𝐴 (π‘₯βˆ’7) + 𝐡 (π‘₯+5) = 𝐴( π‘₯+5)+𝐡(π‘₯βˆ’7) ( π‘₯βˆ’7)( π‘₯+5) 𝐴π‘₯+5𝐴+𝐡π‘₯βˆ’7𝐡) ( π‘₯βˆ’7)( π‘₯+5) A+B = 1 x5 5A+5B = 5 5A +B =0 x1 5A-7B = 0 12B=5
  • 5.
    B= 5 12 A= 7 12 Sehingga: ∫ π‘₯ ( π‘₯βˆ’7)(π‘₯+5) 𝑑π‘₯ =∫ 𝐴 ( π‘₯βˆ’7) 𝑑π‘₯ + ∫ 𝐡 ( π‘₯+5) 𝑑π‘₯ =∫ 7 12 ( π‘₯βˆ’7) 𝑑π‘₯ + ∫ 5 12 ( π‘₯+5) 𝑑π‘₯ = 7 12 𝑙𝑛 x-7 + 5 12 𝑙𝑛 x+5 + C 8.∫ ( π‘₯45 1 + 3π‘₯ + 1 π‘₯3 ) 𝑑π‘₯ =∫ ( π‘₯45 1 + 3π‘₯ + π‘₯βˆ’3 ) 𝑑π‘₯ = 1 5 [π‘₯5 + 3 2 π‘₯2 βˆ’ 1 2 π‘₯βˆ’2]5 1 = ( 1 5 55 + 3 2 52 βˆ’ 1 2 π‘₯5βˆ’2 ) –( 1 5 15 + 3 2 12 βˆ’ 1 2 1βˆ’2 ) =(625 + 75 2 βˆ’ 1 50 ) βˆ’ ( 1 5 + 3 2 βˆ’ 1 2 ) =625- 1 + 75 2 βˆ’ 1 50 βˆ’ 1 5 =624 + 75 2 - 1 50 - 1 5 31200 + 1875 βˆ’ 1 βˆ’ 10 50 = 33064 50 = 661 14 50 9.Dik = y = π‘₯2 βˆ’ 1 Y = 3x + 9 Dit = Luas daerah Jawab: π‘₯2 βˆ’ 1 = 3π‘₯ + 9 π‘₯2 βˆ’ 1 βˆ’ 3π‘₯ βˆ’ 9 = 0 π‘₯2 βˆ’ 3π‘₯ βˆ’ 10 = 0 (x-5) (x+2) = 0
  • 6.
    X= 5 vx=-2 L=∫ (3π‘₯ + 9 )– (π‘₯25 βˆ’2 βˆ’ 1) 𝑑π‘₯ =∫ 3π‘₯ βˆ’ 5 βˆ’2 π‘₯2 + 10 𝑑π‘₯ = 3 2 [π‘₯2 βˆ’ 1 3 π‘₯3 + 10π‘₯] 5 βˆ’2 =( 3 2 52 βˆ’ 1 3 53 + 10.5) βˆ’ ( 3 2 (βˆ’2)2 βˆ’ 1 3 (βˆ’2)3 + 10. βˆ’2) = ( 75 2 βˆ’ 125 3 + 50) βˆ’ (6 + 8 3 βˆ’ 20) = ( 225βˆ’250+300 6 ) βˆ’ ( 18+8βˆ’60 3 ) = 275 6 + 34 3 = 275+68 6 = 343 6 = 57 1 6 10. Diketahu : iy= 3x Y= x Y= 0 y= 2 Dit : Volume benda =mengelilingi sumbuy Jawab= V = πœ‹ ∫ ( π‘₯2 βˆ’ π‘₯22) 𝑑𝑦 𝑑 𝑒 = πœ‹βˆ« (𝑦2 βˆ’ ( 2 0 1 3 𝑦)2 ) dy = πœ‹βˆ« 𝑦2 βˆ’ 2 0 1 9 𝑦2 dy = πœ‹βˆ« βˆ’ 2 0 8 9 𝑦2 dy =πœ‹[( 8 9 2+1 𝑦2+1)] 2 0 = πœ‹( 8 27 𝑦3) 2 0 = πœ‹( 8 27 23-)-( 8 27 . 03) = πœ‹ 64 27 =2 10 27 πœ‹