The area bounded by the curve `y=x(1-log_(e)x)` and x-axis is a)`(e^(2))/(4)` b)`(e^(2))/(2)` c)`(e^(2)-e)/(2)` d)`(e^(2)-e)/(4)`

Find the area bounded by y=|log_(e)|x||" and "y=0

Find the area bounded by y=log_(e)|x|" and "y=0

The area bounded by the curves y=log_(e)x and y=(log_(e)x)^(2) is a) e-2 sq. units b) 3-e sq. units c)e sq. units d) e-1 sq. units

Area bounded by the curves y = e ^(x) , y = e ^(-x) and the straight line x =1 is (in sq units) A) e + (1)/(e) B) e + (1)/(e) + 2 C) e + (1)/(e) -2 D) e - (1)/(e) +2

(e^x+e^(-x)) d y-(e^x-e^(-x)) d x=0

Integrate the following functions (e^(2x) -e^(-2x))/(e^(2x) + e^(-2x)

The sum of the infinite series 2^2/(2!)+2^4/(4!)+2^6/(6!)+..... is equal to a) (e^2+1)/(2e) b) (e^4+1)/(2e^2) c) (e^2-1)^2/(2e^2) d) (e^2+1)^2/(2e^2)