find the solution of the first order differential equation (e^x+y + ye^y)dx +(xe^y - 1)dy =0...

(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

1) Solve the given differential equation by separation of variables. exy dy/dx = e−y + e−6x...

1) Solve the given differential equation by separation of variables. exy dy/dx = e−y + e−6x − y 2) Solve the given differential equation by separation of variables. y ln(x) dx/dy = (y+1/x)^2 3) Find an explicit solution of the given initial-value problem. dx/dt = 7(x2 + 1),  x( π/4)= 1

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

The differential equation given as dy / dx = y(x^3) - 1.4y, y (0) = 1...

The differential equation given as dy / dx = y(x^3) - 1.4y, y (0) = 1 is calculated by taking the current h = 0.2 at the point x = 0.6 and calculated by the Runge-Kutta method from the 4th degree, find the relative error. analytical solution: y(x)=e^(0.25(x^4)-1.4x)

Solve the first order homogeneous differential equation: (2x-5y)dx + (4x-y) dy=0

Solve the first order homogeneous differential equation: (2x-5y)dx + (4x-y) dy=0

Solve the Homogeneous differential equation (7 y^2 + 1 xy)dx - 1 x^2 dy = 0...

Solve the Homogeneous differential equation (7 y^2 + 1 xy)dx - 1 x^2 dy = 0 (a) A one-parameter family of solution of the equation is y(x) = (b) The particular solution of the equation subject to the initial condition y(1) =1/7.

(x-y)dx + (y+x)dy =0 Solve the differential equation

(x-y)dx + (y+x)dy =0 Solve the differential equation

Find the solution to the separable differential equation dy = x cos2 y + sin x...

Find the solution to the separable differential equation dy = x cos2 y + sin x cos2 y satisfying π dx the initial condition y = 4 when x = π.

Find the general solution of the given differential equation (x+!) dy/dx + (x+2)y = 2xe^-x y...

Find the general solution of the given differential equation (x+!) dy/dx + (x+2)y = 2xe^-x y = ______ Determine whether there are any transient terms in the general solution.

1. Sketch the direction field for the following differential equation dy dx = y − x....

1. Sketch the direction field for the following differential equation dy dx = y − x. You may use maple and attach your graph. Also sketch the solution curves with initial conditions y(0) = −1 and y(0) = 1.