Solve the initial value problem. = 12x (3x? -5)". y(1)=4 04. =(3x?-5) -4 O B. y=3...
Solve the initial value problem 2yy'+3=y2+3x with y(0)=4a. To solve this, we should use the substitution u=With this substitution,y=y'=uEnter derivatives using prime notation (e.g., you would enter y' for dy/dx ).b. After the substitution from the previous part, we obtain the following linear differential equation in x, u, u'c. The solution to the original initial value problem is described by the following equation in x, y.
(1 point) Solve the initial value problem 2yy' 3 = y 3x with y(0) = 9 a. To solve this, we should use the substitution y^2 help (formulas) With this substitution, help (formulas) y' = help (formulas) Enter derivatives using prime notation (e.g., you would enter y' for b. After the substitution from the previous part, we obtain the following linear differential equation in x, u, u'. help (equations) c. The solution to the original initial value problem is described...
Solve the initial value problem. d²y = 5 - 7x, y' (O) = 8, y(0) = 2 dx² 5 7 2 ОА. y= 2 + 3 X° - 8x-2 OB. y= 2 OC. y - x2 +8x + 2 OD. y=5x² + 7x3 + 8x + 2
please solve the initial value problem 3-04 +2=– 1 - 0 3, 39 = 0, v9-5 y' – 3y + 2y = 58(t – 1) - U2 (t)e-2, y(0) = 0, y (0) = 5
Chapter 04.08:Problem #1 1. Solve the following system of equations using the Gauss-Seidel method. 12x, + 7х, + 3x, %3D17 Зх, + 6х, +2х, 3D9 2x1+7x2-11x,49 = Conduct 3 iterations. Calculate the maximum absolute relative approximate error at the end of each iteration. Choose [x, x,J= [1 3 5 as your initial guess. x, Chapter 04.08:Problem #1 1. Solve the following system of equations using the Gauss-Seidel method. 12x, + 7х, + 3x, %3D17 Зх, + 6х, +2х, 3D9 2x1+7x2-11x,49...
Solve the initial value problem. dy/dx = 6sin(3x)(y + 3); y(π/6) = 3
Math 216 Homework webHW9, Problem 8 Solve the initial value problem " 12x 36x -(t - 5) - 6), x(0) -1,x' (0) 1 (or2 0).
Solve the given initial value problem. dx = 3x + y - e 3t. dt x(0) = 2 dy = x + 3y; dt y(0) = - 3 The solution is x(t) = and y(t) = 0
Use separation of variables to solve the initial value problem. 3x2 and y = 1 when x = 0 21) y' =
(1 point) Solve the initial value problem 2yy' + 4 = y2 + 4.r with y(O) = 5. a. To solve this, we should use the substitution help (formulas) With this substitution, y = help (formulas) y' = help (formulas) Enter derivatives using prime notation (e.g., you would enter y' for ). b. After the substitution from the previous part, we obtain the following linear differential equation in 2, u, u'. help (equations) C. The solution to the original initial...