Use an integrating factor to reduce the equation to an exact differential equation, then find general...

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.

Find an appropriate integrating factor that will convert the given not exact differential equation cos ⁡...

Find an appropriate integrating factor that will convert the given not exact differential equation cos ⁡ x d x + ( 1 + 2 y ) sin ⁡ x d y = 0 into an exact one. Then solve the new exact differential equation.

(a) Use an Integrating Factor to solve the ordinary differential equation, r dy/dr + 2y =...

(a) Use an Integrating Factor to solve the ordinary differential equation, r dy/dr + 2y = 4 ln r, subject to the initial condition, y(1) = 0. [5 marks] (b) Solve the ordinary differential equation which is given in part (a) by first making the substitution, r = e x , to transform it into a differential equation for y in terms of x. [5 marks]

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

1. Find the general solution of each of the following differential equations a.) y' − 4y...

1. Find the general solution of each of the following differential equations a.) y' − 4y = e^(2x) b.) dy/dx = 1/[x(y − 1)] c.) 2y'' − 5y' − 3y = 0

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

A) In this problem we consider an equation in differential form ???+???=0Mdx+Ndy=0. The equation (5?^4?+4cos(2?)?^−4)??+(5?^5−3?^−4)??=0 in...

A) In this problem we consider an equation in differential form ???+???=0Mdx+Ndy=0. The equation (5?^4?+4cos(2?)?^−4)??+(5?^5−3?^−4)??=0 in differential form ?˜??+?˜??=0 is not exact. Indeed, we have My-Mx= ________ 5x^4-4(4)cos(2x)*y^(-5)-25x^4 (My-Mn)/M=_____ -4/y in function y alone. ?(?)= _____y^4 Multiplying the original equation by the integrating factor we obtain a new equation ???+???=0 where M=____ N=_____ which is exact since My=_____ Nx=______ This problem is exact. Therefore an implicit general solution can be written in the form  ?(?,?)=? where ?(?,?)=_________ Finally find the value...

Question 11: What is the general solution of the following homogeneous second-order differential equation? d^2y/dx^2 +...

Question 11: What is the general solution of the following homogeneous second-order differential equation? d^2y/dx^2 + 10 dy/dx + 25.y =0 (a) y = e 12.5.x (Ax + B) (b) y = e -5.x (Ax + B) (c) y = e -10.x (Ax + B) (d) y = e +5.x (Ax + B) Question 12: What is the general solution of the following homogeneous second-order differential equation? Non-integers are expressed to one decimal place. d^2y/dx^2 − 38.y =0 (a) y...

Use the Integrating Factor Technique to find the solution to the first-order linear differential equation (1...

Use the Integrating Factor Technique to find the solution to the first-order linear differential equation (1 − ? ∙ ?in(?)) ∙ ?? − cos(?) ∙ ?? = 0 with ?(?) = 1

Find the general solution of the following differential equation: y^4 - 3y''' + 3y'' - 3y'...

Find the general solution of the following differential equation: y^4 - 3y''' + 3y'' - 3y' + 2y = 0