Find an explicit solution of the given initial-value problem. dx/dt = 7(x^2 + 1), x(π/4)=1
Find an explicit solution of the given initial-value problem. dx/dt = 7(x^2 + 1), x(π/4)=1
Find an implicit and an explicit solution of the given initial-value problem. (Use x for x(t).) dx 4(x2 + 1), (3/4) = 1 dt implicit tan?(x) = 4t+ 311 4. X
Find an explicit solution of the given initial-value problem. ✓ 3 ✓ 1 - y2 dx - V1 - x? dy = 0, y(O) = 2
In problems 7 and 8 find the solution of the given initial value problem in explicit form: 7. sin 2.x dx + cos 3y dy = 0, y /2) = 1/3. 8. y' (1-22)/2 dy = arcsin x dx, y(0) = 1.
Find an explicit solution of the given initial-value problem. V1 - y2 dx - V1 – x2 dy = 0, 7(0) = 1) =
Consider the initial value problem given below dx -2 +t sin (x), dt x(0) 0 Use the improved Euler's method with tolerance to approximate the solution to this initial value problem at t 1. For a tolerance of e-0.01, use a based on absolute error stopping procedure Consider the initial value problem given below dx -2 +t sin (x), dt x(0) 0 Use the improved Euler's method with tolerance to approximate the solution to this initial value problem at t...
(1 point) Consider the initial value problem dx [2 -5 dt 15 2 (a) Find the eigenvalues and elgenvectors for the coefficient matrix and λ2-2-51 (b) Solve the initial value problem. Give your solution in real fornm. x(t)
(1 point) Consider the Initial Value Problem -5 dx dt X x(0) (a) Find the eigenvalues and eigenvectors for the coefficient matrix A = and 2 -- 1 333 (b) Find the solution to the initial value problem. Give your solution in real form Use the phase plotter pplane9.m in MATLAB to help you describe the trajectory Spiral, spiraling inward in the counterclockwise direction 1. Describe the trajectory
Solve the given initial value problem. x(0) = 1 dx = 4x +y- e 3t, dt dy = 2x + 3y; dt y(0) = -3 The solution is X(t) = and y(t) =
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