The area of the region bounded by the cu...

The area of the region bounded by the curve `y=e^x` and lines `x=0a n dy=e` is `e-1` (b) `int_1^e1n(e+1-y)dy` `e-int_0^1e^x dx` (d) `int_1^e1nydy`

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Find the area of the region bounded by the curves y= e^(x),y= e^(-x) and the line x=1

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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)

int_0^1(e^x dx)/(1+e^x)

int_0^1 e^-x/(1+e^x)dx

int_(0)^(1)(e^(x)dx)/(1+e^(x))

int_(0)^(1)e^(2x)e^(e^(x) dx =)

int_(0)^(1)e^(2x)e^(e^(x) dx =)

int_(0)^(1)e^(2x)e^(e^(x) dx =)

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