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प्रश्न
Find: `I=intdx/(sinx+sin2x)`
Find: `I=int (d theta)/(sintheta+sin2theta)`
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उत्तर
`I=intdx/(sinx+sin2x)`
`=int1/(sinx+2sinxcosx)dx`
`=int1/(sinx(1+2cosx))dx`
`=intsinx/(sin^2x(1+2cosx))dx`
Let u=cosx
⇒du=−sinxdx
Also,
`sin^2x=1−cos^2x=1−u^2`
`∴ I = ∫−1/((1−u^2)(1+2u))du`
`=int 1/((1+u)(1-u)(1+2u))du`
Using partial fractions, we get
`1/((1+u)(1-u)(1+2u))=A/(1+u)+B/(1-u)+C/(1+2u)`
`=>−1=A(1−u)(1+2u)+B(1+u)(1+2u)+C(1+u)(1−u)`
`⇒−1=A(1+u−2u^2)+B(1+3u+2u^2)+C(1−u^2)`
`⇒−1=(−2A+2B−C)u^2+(A+3B)u+(A+B+C)`
Equating the respective coefficients on the LHS and the RHS, we get
−2A+2B−C=0 .....(1)
A+3B=0 .....(2)
A+B+C=−1 .....(3)
Adding (1), (2) and (3), we get
6B=−1
⇒B=−1/6
From (2), we get
A=−3B
⇒A=1/2
From (3), we get
C=−1−A−B
⇒C=−4/3
So,
`1/((1+u)(1-u)(1+2u))=1/(2(1+u))-1/(6(1-u))-4/(3(1+2u))`
`=>I=int[1/(2(1+u))-1/(6(1-u))-4/(3(1+2u))]du`
`= 1/2log(1+u)+1/6log(1−u)−4/(xx2)log(1+2u)+C`
`= 1/2log(1+cosx)+1/6log(1−cosx)−2/3log(1+2cosx)+C`
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