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

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

1. Find the general solutions a. xy’ + ln(x)y = 0 b. xy’ - 3x = 0 2. Solve the initial value a. xy’ + (1 + xcox(x))y = 0;     y(pi/2) = 2

Find the General solution of xy''-2(x+1)+(x+2)y=x3e2x if its know that f(x)=ex is a solution to xy''-2(x+1)+(x+2)y=0....

Find the General solution of xy''-2(x+1)+(x+2)y=x3e2x if its know that f(x)=ex is a solution to xy''-2(x+1)+(x+2)y=0. By uusing reduction of order method.

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.

Find general solution to the equations: 1)y'=x-1-y²+xy² 2)xy²dy=(x³+y³)dx

Find general solution to the equations: 1)y'=x-1-y²+xy² 2)xy²dy=(x³+y³)dx

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

(61). (Bernoulli’s Equation): Find the general solution of the following first-order differential equations:(a) x(dy/dx)+y= y^2+ln(x) (b)...

(61). (Bernoulli’s Equation): Find the general solution of the following first-order differential equations:(a) x(dy/dx)+y= y^2+ln(x) (b) (1/y^2)(dy/dx)+(1/xy)=1

(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))

(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

Find the general solution by the method of variation of parameters. B. (x^2)y''-xy'+y=(1/x)

Find the general solution by the method of variation of parameters. B. (x^2)y''-xy'+y=(1/x)

3. Find the general solution to the differential equation: (x^2 + 1/( x + y) +...

3. Find the general solution to the differential equation: (x^2 + 1/( x + y) + y cos(xy)) dx + (y ^2 + 1 / (x + y) + x cos(xy)) dy = 0