Question 23 1 pts Problem 23: Numerical solution of Ordinary differential equations Consider the following initial...
Question 22 1 pts Problem 22: Numerical solution of Ordinary differential equations Consider the following initial value problem GE:+15y = 1.C:y(0) -0.5 Carry out two-steps of the modified Euler (trapezoidal) method solution from the initial condition with a time step of At = 0.1. and the predicted solutions is y(0.2)-0.20 None of the above. y(0.2) - -0.75 y(0.2)-1.27 y(0.2)=0.25
Question 21 1 pts Problem 21: Numerical solution of Ordinary differential equations Consider the following initial value problem G.EE +15y = 1.C:y(0) - 0.5 Carry out a single step of the modified Euler (trapezoidal) method solution from the initial condition with a time step of At = 0.2, and the predicted solutions is Y(0.2)-0.20 None of the above y(0.2)-1.27 Y(0.2)-0.25 (0.2)--0.75
Question 20 1 pts Problem 20: Numerical solution of Ordinary differential equations Consider the following initial value problem GE: H+ 15y =t 1.C:y(0) = 0.5 Carry out two consecutive steps of the Euler solution from the initial condition with a time step of At = 0.2. and the predicted solutions are None of the above. y(0.2)--0.25 and y(0.4)-0.13 (0.2)-0.05 and y(0.4)-0.03 y(0.2) -- 1.00 and y(0.4)-2.04 y(0.2)-0.13 and y(0.4)-0.20
( x Question 19 1 pts Problem 19: Numerical solution of Ordinary differential equations Consider the following initial value problem GE: +15y = t 1.C:y(0) = 0.5 Using Euler's method, and a time step of At 0.2. do you expect the numerical solution not to oscillate and to be stable? None of the above. No, because Euler's method is implicit and there is not stability limit on At. Yes, because Euler's method is explicit and there is not stability limit...
Question 19 1 pts Problem 19: Numerical solution of Ordinary differential equations Consider the following initial value problem GE: + 15y = + 1.C: y(0) 0.5 Using Euler's method, and a time step of At = 0.2. do you expect the numerical solution not to oscillate and to be stable? No, because the time step far exceeds the critical value At stable < 0.067 for this problem. None of the above Yes, because Euler's method is explicit and there is...
Problem Thre: 125 points) Consider the following initial value problem: dy-2y+ t The y(0) -1 ea dt ical solution of the differential equation is: y(O)(2-2t+3e-2+1)y fr exoc the differential equation numerically over the interval 0 s i s 2.0 and a step size h At 0.5.A Apply the following Runge-Kutta methods for each of the step. (show your calculations) i. [0.0 0.5: Euler method ii. [0.5 1.0]: Heun method. ii. [1.0 1.5): Midpoint method. iv. [1.5 2.0): 4h RK method...