The area of the region bonded by `y=e^(x),y=e^(-x),x=0` and x = 1 is (a) `e+(1)/(e)` (b) `log(4/e)` (c) `4log(4/e)` (d) `e+(1)/(e)-2`

Compute the area of the region bounded by the curves y=e x(log)_e xa n dy=(logx)/(e x)

Compute the area of the region bounded by the curves y-e x(log)_e xa n dy=(logx)/(e x)

Solve log_(e)(x-a)+log_(e)x=1.(a>0)

If the area bounded by y le e -|x-e| and y ge 0 is A sq. units, then log_(e)(A) is equal is

Find the area enclosed by y=log_(e)(x+e) and x=log_(e)((1)/(y)) and the x-axis.

The primitive of the function f(x)=(1-1/(x^2))a^(x+1/x)\ ,\ a >0 is (a) (a^(x+1/x))/((log)_e a) (b) (log)_e adota^(x+1/x) (c) (a^(x+1/x))/x(log)_e a (d) x(a^(x+1/x))/((log)_e a)

Find the area bounded by y=-(log)_e x , y=(log)_e x ,y=(log)_e(-x),a n dy=-(log)_e(-x)dot

Find the area bounded by y=log_e x , y=-log_e x ,y=log_e(-x),a n dy=-log_e(-x)dot

If e^(sin x)-e^(-sin x)-4=0 , then x= (a) 0 (b) sin^(-1){(log)_e(2+sqrt(5))} (c) 1 (d) none of these

int_(0)^(log 2)(e^(x))/(1+e^(x))dx=