`int sqrt(e^(x)-1)dx` is equal toA. `2[sqrt(e^(x)-1)-tan^(-1) sqrt(e^(x)-1)]+c`B. `sqrt(e^(x)-1)-tan^(-1) sqrt(e^(x)-1)+c`C. `sqrt(e^(x)-1)+tan^(-1) sqrt(e^(x)-1)+c`D. `2[sqrt(e^(x)-1)+tan^(-1) sqrt(e^(x)-1)]+c`

`int sqrt(e^(x)-1)dx` is equal toA. `2[sqrt(e^(x)-1)-tan^(-1) sqrt(e^(

1.	`int sqrt(e^(x)-1)dx` is equal toA. `2[sqrt(e^(x)-1)-tan^(-1) sqrt(e^(x)-1)]+c`B. `sqrt(e^(x)-1)-tan^(-1) sqrt(e^(x)-1)+c`C. `sqrt(e^(x)-1)+tan^(-1) sqrt(e^(x)-1)+c`D. `2[sqrt(e^(x)-1)+tan^(-1) sqrt(e^(x)-1)]+c`
Answer» Correct Answer - A `I=int sqrt(e^(x)-1)dx` Let ` e^(x)-1=t^(2)" or " e^(x)dx=2t dt " or " dx=(2t)/(t^(2)+1)dt` ` :. I=int t(2t)/(t^(2)+1)dt=int (2t^(2))/(t^(2)+1)dt` `=int(2(t^(2)+1)-2)/(t^(2)+1)dt=int2dt-int(2t)/(t^(2)+1)` `=2t-2tan^(-1)t+C` `=2sqrt(e^(x)-1)-2tan^(-1) sqrt(e^(x)-1)+C`

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