[" For xebentizs nup "],[" For "x in R,x!=0," if "y(x)" is a differentiable function such that "],[x int y(t)dt=(x+1)int ty(t)dt," then "y(x)" equals "]

For x in R, x != 0, if y(x) differential function such that x int_1^x y(t)dt=(x+1)int_1^x t y(t)dt, then y(x) equals:

For x in R, x != 0, if y(x) differential function such that x int_1^x y(t)dt=(x+1)int_1^x t y(t)dt, then y(x) equals: (where C is a constant.)

For x in x != 0, if y(x) differential function such that x int_1^x y(t)dt=(x+1)int_1^x t y(t)dt, then y(x) equals: (where C is a constant.)

For x in x!=0, if y(x) differential function such that x int_(1)^(x)y(t)dt=(x+1)int_(1)^(x)ty(t)dt then y(x) equals: (where C is a constant.)

For x in R, x != 0 , if y(x) is a differentiable function such that x int_(1)^(x) y(t) dt=(x+1)int_(1)^(x)ty (t) dt , then y(x) equals: (where C is a constant.)

For x in R, x != 0 if y(x) is a differentiable function such that x int_(1)^(x)y(t)dt = (x+1) int_(1)^(x)ty(t)dt , then y(x) equals (where C is a constant)

If f(x) is differentiable function and f(x)=x^(2)+int_(0)^(x) e^(-t) (x-t)dt ,then f)-t) equals to

If int_a^x ty(t)dt=x^2+y(x), then find y(x)

If int_a^x ty(t)dt=x^2+y(x), then find y(x)