The integral `intsqrt(cotx)e^(sqrt(sinx))sqrt(cosx)dx` equalsA. `(sqrt(tanx)e^(sqrt(sinx)))/(sqrt(cosx))+C`B. `2e^(sqrt(sinx))+C`C. `-(1)/(2)e^(sqrtsinx)+C`D. `(sqrt(cotx)e^(sqrt(sinx)))/(2sqrt(cosx))+C`

The integral `intsqrt(cotx)e^(sqrt(sinx))sqrt(cosx)dx` equalsA. `(sqrt

1.	The integral `intsqrt(cotx)e^(sqrt(sinx))sqrt(cosx)dx` equalsA. `(sqrt(tanx)e^(sqrt(sinx)))/(sqrt(cosx))+C`B. `2e^(sqrt(sinx))+C`C. `-(1)/(2)e^(sqrtsinx)+C`D. `(sqrt(cotx)e^(sqrt(sinx)))/(2sqrt(cosx))+C`
Answer» Correct Answer - B `e^(sqrt(sinx))=trArr(e^(sqrt(sinx)))/(2sqrtsinx)cosxdx=dt` `rArr" "e^(sqrt(sinx))sqrt(cotx)sqrt(cosx)dx=2dt` Hence `int2dt=2t+C=2e^(sqrt(sinx))+C`

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