The solution of the differential equation X dy dx – 3y = x sin2x + x4-4x5...
Find the general solution for the differential equation. x dy/dx + 3y = 4x2 – 3x; x>0 y=_______
The differential equation : dy/dx = 2x -3y , has the initial conditions that y = 2 , at x = 0 Obtain a numerical solution for the differential equation, correct to 6 decimal place , using , The Euler-Cauchy method The Runge-Kutta method in the range x = 0 (0.2) 1.0
(ve cos2x - 2e+ sin2x + 2x)dx +(xe" cos2x - 3)dy = 0 a) Determine if it is exact or not; b) Find the general solution.
Use the method for solving Bernoulli equations to solve the following differential equation. dy dx +3y = e Xy - 8 Ignoring lost solutions, if any, the general solution is y=0 (Type an expression using x as the variable.)
Question 4 A power series solution about x = 0 of the differential equation dy dx +(x+2)y = is Select the correct answer. y=00(1-2x+2x2-3x2) OnY=60(1+2x+3x2+3x... Oc. None y=a01 - 21x2+x- Od
Solve the exact differential equation (4x*y+sinx)dx+(x4-y)dy=0.
Find the solution of the differential equation with the given initial condition. Dy/dx = 2x + sec^2x/2y, y(0) = 5.
Find the solution of the differential equation dy dx = x y that satisfies the initial condition y(0)=−7. Answer: y(x)=
(2x+ 2 x y²) dx + ( x ²) - 3y) dy = 0 solve your equation
solve the following differential equations (e* + 2y)dx + (2x – sin y)dy = 0 xy' + y = y? (6xy + cos2x)dx +(9x?y? +e")dy = 0 +2ye * )dx = (w*e * -2rcos x) di