`y=2e^(x)`

The equation of one of the curves whose slope of tangent at any point is equal to y+2x is (A) y=2(e^(x)+x-1) (B) y=2(e^(x)-x-1) (C) y=2(e^(x)-x+1) (D) y=2(e^(x)+x+1)

If (dy)/(dx)+y=2e^(2x) , then y is equal to

Find the general solution of the following differential equations : y'+2y=e^(2x)

Solve: (dy)/(dx)+2y=e^(-x)

If y=e^(x) , then (d^(2)y)/(dx^(2)) = e^(x) .

The equation of the tangent to the curve y=2 e^((-x)/(3)) where it crosses the y- axis is

If A={(x,y):y=e^(x),x in R} and B={(x,y):y=e^(-2x),x in R}, then

The inverse of the function y=(e^(2x)-e^(-2x))/(e^(2x)+e^(-2x)) is/an

The integrating factor of (d ^(2) y )/( dx ^(2)) - y = e ^(x) is e ^(-x) then its solution is