1. Consider the ODE dy/ dx = tanh(x) − y tanh(x). Use the integrating factor method...

Consider ODE: (xy-1)dy+x^2dx=0. Prove that φ (x, y) = 1/x it is an integrating factor. Solve...

Consider ODE: (xy-1)dy+x^2dx=0. Prove that φ (x, y) = 1/x it is an integrating factor. Solve the ODE.

consider the equation y*dx+(x^2y-x)dy=0. show that the equation is not exact. find an integrating factor o...

consider the equation y*dx+(x^2y-x)dy=0. show that the equation is not exact. find an integrating factor o the equation in the form u=u(x). find the general solution of the equation.

Use dy/dx + p(x)y = f(x) has the solution y = y_c + y_p to solve....

Use dy/dx + p(x)y = f(x) has the solution y = y_c + y_p to solve. (Integrating Factor method) Find the General solution for the DEQ: dy/dx + 2xy = y + 4x - 2. Show step by step. Please explain or I will give a down-vote. Thank you

Find an integrating factor and solve the O.D.E. 1 + (x/y − sin(y) *dy/dx = 0.

Find an integrating factor and solve the O.D.E. 1 + (x/y − sin(y) *dy/dx = 0.

engineering mathematics solve (3y2+2x+1)dx+(2xy+2y)dy=0 Find an integrating factor and solve the ode,tks.

engineering mathematics solve (3y2+2x+1)dx+(2xy+2y)dy=0 Find an integrating factor and solve the ode,tks.

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

Solve the following equation using integrating factor. y dx + (2x − ye^y) dy = 0

Solve the following equation using integrating factor. y dx + (2x − ye^y) dy = 0

solve by the integrating facote method the following initial value problem dy/dx=y+x, y(0)=0

solve by the integrating facote method the following initial value problem dy/dx=y+x, y(0)=0

Find the solution to the following equation using an appropriate integrating factor. Include largest interval solution...

Find the solution to the following equation using an appropriate integrating factor. Include largest interval solution is valid for x(dy/dx)-2y√(x) =3√(x) y(1)= -1

Consider the system [ x' = -2y & y' = 2x] . Use dy/dx to find...

Consider the system [ x' = -2y & y' = 2x] . Use dy/dx to find the curves y = y(x). Draw solution curves in the xy phase plane. What type of equilibrium point is the origin?