The equation of one of the curves whose slope at any point is equal to `y+2x and y(0)=0` is

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)

Show that the equation of the curve whose slope at any point is equal to y + 2x and which passes through the origin is y = 2(e^(x) - x-1) .

Show that the equation of the curve whose slope at any point is equal to y+2x and which passes through the origin is y+2(x+1)=2e^(2x)

show that the equation of the curve whose slope at any point is equal to y+2x and which passes through the origin is y+2(x+1)=2e^(2x)

What is the equation of the curve whose slope any point is equal to 2x and which passes through the origin?

The slope of the tangent to the curve at any point is equal to y + 2x. Find the equation of the curve passing through the origin .