Solve the IVP: (14y^13 + 8x^3 +42xy^5)dy + (12x^3+24x^2y+7y^6)dx = 0, y(2)=1

solve ivp: (y+6x^2)dx + (xlnx-2xy)dy = 0, y(1)=2, x>0

solve ivp: (y+6x^2)dx + (xlnx-2xy)dy = 0, y(1)=2, x>0

3. Consider the equation (3x^2y + y^2)dx + (x^3 + 2xy + 5)dy = 0. (a)...

3. Consider the equation (3x^2y + y^2)dx + (x^3 + 2xy + 5)dy = 0. (a) Verify this is an exact equation (b) Solve the equation

Use laplace transform to solve the given IVP y''-2y'-48y=0 y(0)=13 y'(0)=6

Use laplace transform to solve the given IVP y''-2y'-48y=0 y(0)=13 y'(0)=6

Consider the IVP (x^2 - 2x)dy/dx = (x-2)y + x^2, y(1)=-2. Solve the IVP. Give the...

Consider the IVP (x^2 - 2x)dy/dx = (x-2)y + x^2, y(1)=-2. Solve the IVP. Give the largest interval over which the solution is defined.

13) (15 pts) Solve the given IVP. y ′′ + 2y ′ + 2y = 10...

13) (15 pts) Solve the given IVP. y ′′ + 2y ′ + 2y = 10 sin(2t), y(0) = 1, y′(0) = 0

solve the following IVP: x^2y'' - 5xy' + 5y = 0, y(1) = 3, y'(1) =...

solve the following IVP: x^2y'' - 5xy' + 5y = 0, y(1) = 3, y'(1) = -5

y''+2y(y')^3=0 ; y(0)=1, y'(0)=1 use u=y' to solve IVP

y''+2y(y')^3=0 ; y(0)=1, y'(0)=1 use u=y' to solve IVP

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

solve for y: 1. dy/dx= xe^y separable 2. x(dy/dx)+3y=x^2 when y(5)=0 1st order linear

solve for y: 1. dy/dx= xe^y separable 2. x(dy/dx)+3y=x^2 when y(5)=0 1st order linear

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2)...

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2) 3y”−y=0 , y(0)=0,y’(0)=1.Use the power series method for this one . And then solve it using the characteristic method Note that 3y” refers to it being second order differential and y’ first