You have not submitted your answer. Solve the initial value problem: 16y" + 10y = 0,...
SUM You have not submitted your answer. Solve the initial value problem: 12y" – 8y' = 0, y(-1) = 4, y(2) = -3. Give your answer as y =... . Use t as the independent variable. Answer: Submit answer
Consider the intial value problem: 81y" + 72y' + 16y= 0, y(0) = a > 0, y'(0) = -1. a. Find the solution in terms of a. Give your answer as y=... . Use x as the independent variable. Answer: b. Find the critical value of a that separate solutions that become negative from those that are always positive. critical value of a =
Solve the initial value problem: 4y" +12y + 17y= 0, y(1/2) = 1, y(7/2) = 1. Give your answer as y=... . Use x as the independent variable. Answer:
Question 6 (30 points Solve the initial value problem. y"+8y + 16y = 0, y(0) = 1, y'(0) =1 y(t) = 5e-41 + te-4, Question 7 (30 points) Solve the following equation by undetermined coefficients. -67 5 C2e Question 9 (30 points) Solve for the general solution of the differential equation. Question 10 (10 points) Compute using the table of Laplace Transforms. (s-2) (r-2) (s+2 6 (s+2)
y(1/2) = -2, Solve the initial value problem: 9y" + 18y' + 14y = 0, y' (1/2) = -1. Give your answer as y=... . Use x as the independent variable. Answer:
thank you!! Solve the given initial value problem. y'' - 10y' + 25y = 0; y(0) = -3, y'(0) = 57 4 The solution is y(t) =
(1 point) Use the Laplace transform to solve the following initial value problem: y"-7y+10y 0, (0) 6, /(0) -3 (1) First, using Y for the Laplace transform of y(t), Le, Y find the equation you get by taking the Laplace transform of the differential equation to obtain C() 0 (2) Next solve for Y A (3) Now write the above answer in its partial fraction form, Y + 8-6 8a (NOTE: the order that you enter your answers matter so...
Use Laplace Transform to solve the given initial-value problem. et y'" – 16y y(0) = y"(0) y'(o) 0 = 4
Solve the given initial value problem. y'' + 16y=0; y(0) = 2, y'(0) = 3 y(t) =
Use Laplace Transform to solve the given initial-value problem. y''' − 16y' = e^t y(0) = y''(0) = 0 y'(0) =4