" The integral "int(1)^(e){((x)/(e))^(2x...

" The integral "int_(1)^(e){((x)/(e))^(2x)-((e)/(x))^(x)}log_(e)xdx" is equal to: "

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The integral int_(1)^(e){((x)/(e))^(2x)-((e)/(x))^(x)} "log"_(e)x dx is equal to

The integral int_(1)^(e){(x/e)^(2x)-(e/x)^x}log_exdx is equal to

The integral int_(1)^(e){(x/e)^(2x)-(e/x)^x}log_exdx is equal to

The integral int_(1)^(e){(x/e)^(2x)-(e/x)^x}log_exdx is equal to

int[((x)/(e))^(x)+((e)/(x))^(x)]ln xdx

int_(1)^(3)|(2-x)log_(e )x|dx is equal to:

int_(1)^(3)|(2-x)log_(e )x|dx is equal to:

int_(1)^(e)(e^(x)(x log_(e)x+1))/(x)dx is equal to

The intergral int_(1)^(2) e^(x) . X^(2) (2 + log_(e)x) dx equals "

Integrate : int (e^(x) dx)/(1-3e^(x)-3e^(2x))

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