solve: x2y' + x2y = x3 y(0) = 3

Solve the initial value problem below. x2y''−xy'+y=0,  y(1)=1, y'(1)=3 y=

Solve the initial value problem below. x2y''−xy'+y=0,  y(1)=1, y'(1)=3 y=

solve x2y'' = xy' + (y')3 // note; that's (y')^3 // // // sorry for the...

solve x2y'' = xy' + (y')3 // note; that's (y')^3 // // // sorry for the typo. // it is now written correctly I think can be solved by using say z = y'... using this we'll get to a Bernoulli to solve...and proceed from them

Solve the following non homogenous Cauchy-Euler equations for x > 0. a. x2y′′+3xy′−3y=3x2. b. x2y′′ −2xy′...

Solve the following non homogenous Cauchy-Euler equations for x > 0. a. x2y′′+3xy′−3y=3x2. b. x2y′′ −2xy′ +3y = 5x2, y(1) = 3,y′(1) = 0.

Find general solution to x2y''-4xy'+6y=x using variation of parameters (may take granted that y=x2 and y=x3...

Find general solution to x2y''-4xy'+6y=x using variation of parameters (may take granted that y=x2 and y=x3 are both solutions to x2y''-4xy'+6y=0)

solve IVP, using variation of parameters x2y'' - 5xy' + 8y = 32x6 y(1) = 0,...

solve IVP, using variation of parameters x2y'' - 5xy' + 8y = 32x6 y(1) = 0, y'(1) = -8

Solve the following initial value problem: x2y′′+xy′−9y=0; y(1) = 6; y′(1) = 12

Solve the following initial value problem: x2y′′+xy′−9y=0; y(1) = 6; y′(1) = 12

solve diffeential equation. ( x2y +xy -y )dx + (x2 y -2 x2) dy =0 answer...

solve diffeential equation. ( x2y +xy -y )dx + (x2 y -2 x2) dy =0 answer x + ln x + x-1 + y- 2 lny = c dy / dx + 2y = e-2x - x^2 y (0) =3 answer y =  3 e -2s + e-2x ( intefral of e -s^2ds ) s is power ^ 2 means s to power of 2  

Find the equation for the tangent line to the curve x2y +x3 = 1 at the...

Find the equation for the tangent line to the curve x2y +x3 = 1 at the point (1, 0).

Solve the given differential equation by variation of parameters. x2y'' − xy' + y = 10x...

Solve the given differential equation by variation of parameters. x2y'' − xy' + y = 10x Please show step by step.  

Solve the equation y''-y'=-3 y(0)=0 and y'(0)=0 by using laplace transforms

Solve the equation y''-y'=-3 y(0)=0 and y'(0)=0 by using laplace transforms