(1 point) Consider the logistic equation y = y(1 - y) (a) Find the solution satisfying...
Find the solution y of the initial value problem 3"(t) = 2 (3(t). y(1) = 0, y' (1) = 1. +3 g(t) = M Solve the initial value problem g(t) g” (t) + 50g (+)? = 0, y(0) = 1, y'(0) = 7. g(t) = Σ Use the reduction order method to find a second solution ya to the differential equation ty" + 12ty' +28 y = 0. knowing that the function yı(t) = + 4 is solution to that...
Consider the differential equation y" – 7y + 12 y = 0. (a) Find r1, 72, roots of the characteristic polynomial of the equation above. 11,2 M (b) Find a set of real-valued fundamental solutions to the differential equation above. yı(t) M y2(t) M (C) Find the solution y of the the differential equation above that satisfies the initial conditions y(0) = -4, y'(0) = 1. g(t) = M Consider the differential equation y" – 64 +9y=0. (a) Find r1...
Consider the differential equation: -9ty" – 6t(t – 3)y' + 6(t – 3)y=0, t> 0. a. Given that yı(t) = 3t is a solution, apply the reduction of order method to find another solution y2 for which yı and y2 form a fundamental solution set. i. Starting with yi, solve for w in yıw' + (2y + p(t)yı)w = 0 so that w(1) = -3. w(t) = ii. Now solve for u where u = w so that u(1) =...
(1 point) Find the function satisfying the differential equation 6er and y(0) = 4 (1 point) Solve the following initial value problem: dy +(0.9) y = 3t with y(0) = 8. (Find y as a function of t.) y =
(1 point) Consider the linear system 3 2 ' = y. -5 -3 a. Find the eigenvalues and eigenvectors for the coefficient matrix. 2 = 15 and 2 V2 b. Find the real-valued solution to the initial value problem Syi ly 3y1 + 2y2, -541 – 3y2, yı(0) = 0, y2(0) = -5. Use t as the independent variable in your answers. yı(t) y2(t)
Let ?(?)y(t) be the solution to ?′=?+?y′=t+y satisfying ?(5)=6.satisfying y(5)=6. Use Euler's Method with time step ℎ=0.1h=0.1 to approximate ?(5.5).approximate y(5.5). (Use decimal notation. Give your answers to four decimal places.) n= 0, to = 5, yo = n = 1, 11 = 5.1, yı = n = 2, 12 = 5.2, y2 = n = 3,13 = 5.3, y3 = n = 4, 14 = 5.4, y4 = n = 5, t5 = 5.5, y5 =
dP Consider a rabbit population Pit) satisfying the logistic equation aP-bP, where B-aP is the time rate at which births occur and D bP is the rate at which deaths occur. If the initial population is 220 rabbits and there are 6 deaths per month occurring at time t 0, how many months does it take for P(t) to reach 115 % of the limiting population M? births per month and months (Type an integer or decimal rounded to two...
(1 point) Consider the linear system 3 y y 5 3 a. Find the eigenvalues and eigenvectors for the coefficient matrix. 2 0 and A2 = -1 02 -3- -3+1 b. Find the real-valued solution to the initial value problem Svi C = -3y - 2y2, 591 +372 y.(0) = 6, 32(0) = -15. Use t as the independent variable in your answers. yı() y2(t) = 0
Let y(t) be the solution to y = t + y satisfying y(6) = 4. Use Euler's Method with time step h = 0.1 to approximate y(6.5). (Use decimal notation. Give your answers to four decimal places.) n= 0, to = 6, Yo = n = 1, 1 = 6.1, yı = n = 2,12 = 6.2, y2 = n= 3, 13 = 6.3, y3 = n= 4,14 = 6.4, y4 = n= 5,15 = 6.5, ys =
(1 point) The system of first order differential equations: y = -3y + 2y2 y = -4yı + 1y2 where yı(0) = 4, y2(0) = 3 has solution: yı(t) = yz(t) = *Note* You must express the answer in terms of real numbers only.