Find the solution of the ED (2y+1)y" = (y')^2

Find the equilibrium solution to y'= (y^2-2y+1) (x^2-4)

Find the equilibrium solution to y'= (y^2-2y+1) (x^2-4)

2. Find the solution to the following IVP: 2y'' +2y' -2y = 6x^2 - 4x -1...

2. Find the solution to the following IVP: 2y'' +2y' -2y = 6x^2 - 4x -1 y(0) =-32 y'(0) =5

Find the complete solution to the following differential equations. a) y''+2y'-y=10 b) 2y''- y = 3x^2

Find the complete solution to the following differential equations. a) y''+2y'-y=10 b) 2y''- y = 3x^2

find y(t) solution of the initial value problem y'=(2y^2 +bt^2)/(ty), y(1)=1 t>o

find y(t) solution of the initial value problem y'=(2y^2 +bt^2)/(ty), y(1)=1 t>o

find the general solution of y”+2y’+y=x-1+3e^(-x)

find the general solution of y”+2y’+y=x-1+3e^(-x)

Find the general solution. Express the solution in vector form. x' = x + 2y y'...

Find the general solution. Express the solution in vector form. x' = x + 2y y' = 4x+3y Find the general solution. Express the solution in scalar form. x' = −4x + 2y y' = − 5/2 x + 2y

y''-2y'-3y=15te^2t y(0)=2 y'(0)=0 find the solution

y''-2y'-3y=15te^2t y(0)=2 y'(0)=0 find the solution

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0)...

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0) = -1/3

Find the general solution of the following nonhomogeneous equations: • y '' − 2y ' +...

Find the general solution of the following nonhomogeneous equations: • y '' − 2y ' + 5y = 25x ^2 + 12 • y ''− 3y ' + 2y = 10 sen 2x • y '' − 2y ' + y = e^x + e^−2x • y '' − y = x sen x • y '' − 6y ' + 9y = 5e^x sen x • y '' + y ' + y + 1 = sen x +...

find the general solution of the given differential equation 1. y''−2y'+2y=0 2. y''+6y'+13y=0 find the solution...

find the general solution of the given differential equation 1. y''−2y'+2y=0 2. y''+6y'+13y=0 find the solution of the given initial value problem 1. y''+4y=0, y(0) =0, y'(0) =1 2. y''−2y'+5y=0, y(π/2) =0, y'(π/2) =2 use the method of reduction of order to find a second solution of the given differential equation. 1. t^2 y''+3ty'+y=0, t > 0; y1(t) =t^−1