" (ii) "y=e^(2x)(a+bx)

Find the differential equation satisfying y=e^(2x)(a+ bx ) ,a and b are arbitrary constants.

Form a differential equation representing the given family of curves by eliminating arbitrary constants a and b: y = e^(2x) (a + bx)

Form a differential equation representing the given family of curves by eliminating arbitrary constants a and b.y=e^(2x)(a+bx)

Form the differential equations of the following families of curves by elimnating the parameters (arbitrary constants) given against them in the brackets. (i) y = c(x-c)^(2), (c) (ii) xy = a e^(x) + b e^(-x), (a, b) (iii) y = (a+bx)e^(Kx), (a,b) (iv) y = a cos (nx + b), (a,b) (v) = y = a e^(3x) + be^(4x), (a,b) (vi) y = ax^(2) + bx, (a,b) (vii) ax^(2) + by^(2) = 1 (a,b)

y = e^(2x)(a + bx) , find dy/dx

The differential equation for y=e^(x)(a+bx) is

If int x^(2)e^(-2x)=e^(-2x)(ax^(2)+bx+c)+d then

If int x^2e^(-2x)= e^(-2x)(ax^2+bx+c)+d then