1. Find the general solutions a. xy’ + ln(x)y = 0 b. xy’ - 3x =...

Solve for the general solution x^4y''''+4x^3y'''+3x^2y''-xy'+y=0

Solve for the general solution x^4y''''+4x^3y'''+3x^2y''-xy'+y=0

Question: Find the general solution for: xy' + y = x^(2)(ln(x)), you can assume x >...

Question: Find the general solution for: xy' + y = x^(2)(ln(x)), you can assume x > 0.

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot...

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot y + 4y =0 y = (Pi/2)=2

(a) Find an equation of the plane tangent to the surface xy ln x − y^2...

(a) Find an equation of the plane tangent to the surface xy ln x − y^2 + z^2 + 5 = 0 at the point (1, −3, 2) (b) Find the directional derivative of f(x, y, z) = xy ln x − y^2 + z^2 + 5 at the point (1, −3, 2) in the direction of the vector < 1, 0, −1 >. (Hint: Use the results of partial derivatives from part(a))

Given that y=e^x is a solution of the equation (x-1)y''-xy'+y=0, find the general solution to (x-1)y''-xy'+y=1.

Given that y=e^x is a solution of the equation (x-1)y''-xy'+y=0, find the general solution to (x-1)y''-xy'+y=1.

(1-x)y'' + xy' - y = 2(x-1)^2 e^(-x), 0 < x < 1 Find the general...

(1-x)y'' + xy' - y = 2(x-1)^2 e^(-x), 0 < x < 1 Find the general solution of the ODE

Solve the following: (3x^2 - y^2)dx + (xy - x^3y^-1)dy = 0

Solve the following: (3x^2 - y^2)dx + (xy - x^3y^-1)dy = 0

1. Find the general solution to the differential equation y''+ xy' + x^2 y = 0...

1. Find the general solution to the differential equation y''+ xy' + x^2 y = 0 using power series techniques

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

Solve the following a)y=tan^-1 (sqrt((x+1)/(x+2) b)y=ln(sin^-1(x)) c)d/dx[sec^-1(x)]=1/(x(sqrt(x^2 -1) d)Find Y' tan^-1(x^2 y)=x+xy^2

Solve the following a)y=tan^-1 (sqrt((x+1)/(x+2) b)y=ln(sin^-1(x)) c)d/dx[sec^-1(x)]=1/(x(sqrt(x^2 -1) d)Find Y' tan^-1(x^2 y)=x+xy^2