solve the IVP using the annihilator approach y(3) + 9y' = excos(3x) y(0) = 2 y'(0) = 1 y''(0) = 1
Solve the given differential equations: х 1. y' = y(0) = -2 y+x2y 2. 3x²y dx – (x3 + y3)dy = 0 , y(1) = -2
Solve x′ =2x+y, x(0)=1 y′ =3x+4y, y(0)=0
Solve the given initial value problem by undetermined coefficients (annihilator approach). el cos(3x) y(3) +9y' y(0) y'(0) = 2 - y"(0) = 1
Solve the given initial value problem by undetermined coefficients (annihilator approach). y'''+9y'=e^xcos(3x) y(0) = 2 y'(0) = y''(0) =1
Solve the following initial value problem y(0) = 0 cosx (dy/dx) - ysinx = 3x^2
2. Solve the DE: (3x²y + cos x) dx +(x +e") dy = 0
PROBLEMS Solve for y. 3.1. - x + 4x + sin 6x 3.4. y + 3x = 0 3.5. (x-1)? ydx + x? (y - 1)dy = 0 Just find a solution. Solving for y is tough. Test for exactness and solve if exact. 3.6. (y - x) dx + (x? - y) dy - 0 3.7. (2x + 3y) dx + (3x + y - 1) dy - 0 3.8. (2xy Y + 2xy + y) dx + (x*y*el...
Solve the equation (3x?y - 1)dx + (y - 4x?y-2)dy = 0 is an arbitrary constant, and V by multiplying by the integrating factor. An implicit solution in the form F(x,y) = C is = C, where (Type an expression using x and y as the variables.)
Solve differential equation 3x^2y" +6xy' +y = 0