If `I=int(sqrt(cotx)-sqrt(tanx))dx,` then `I` equalsA. `sqrt(2)log(sqrt(tanx)-sqrt(cotx))+C`B. `sqrt(2)log|sinx+cosx+sqrt(sin2x)|+C`C. `sqrt(2)log|sinx-cosx+sqrt(2)sinx cosx|+C`D. `sqrt(2)log|sin(x+pi//4)+sqrt(2)sinx cosx|+C`

If `I=int(sqrt(cotx)-sqrt(tanx))dx,` then `I` equalsA. `sqrt(2)log(sqr

1.	If `I=int(sqrt(cotx)-sqrt(tanx))dx,` then `I` equalsA. `sqrt(2)log(sqrt(tanx)-sqrt(cotx))+C`B. `sqrt(2)log\|sinx+cosx+sqrt(sin2x)\|+C`C. `sqrt(2)log\|sinx-cosx+sqrt(2)sinx cosx\|+C`D. `sqrt(2)log\|sin(x+pi//4)+sqrt(2)sinx cosx\|+C`
Answer» Correct Answer - B `I=int(cosx-sinx)/(sqrt(cosx sinx))dx` Put `sinx+cosx=t, " so that " 2sinx cosx=t^(2)-1` ` :. I=sqrt(2)int(dt)/(sqrt(t^(2)-1))=sqrt(2)log\|t+sqrt(t^(2)-1)\|+C` `=sqrt(2)log\|sinx+cosx+sqrt(sin2x)\|+C`

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