- Question 16 Of 17 View Policies Current Attempt In Progress 1 Given That X X And Are Solutions Of The Homogeneous E 1 (148.82 KiB) Viewed 52 times
- Question 16 Of 17 View Policies Current Attempt In Progress 1 Given That X X And Are Solutions Of The Homogeneous E 2 (138.22 KiB) Viewed 52 times
- Question 16 Of 17 View Policies Current Attempt In Progress 1 Given That X X And Are Solutions Of The Homogeneous E 3 (389.26 KiB) Viewed 52 times
Question 14 of 17 View Policies Current Attempt in Progress < Use the method of reduction of order to find a second solution of the differential equation t'y" - 4ty' + 6y = 0, t > 0; y₁(t) = t². NOTE: y₁ and y₂ form a fundamental set of solutions. Y₂(t) -
Question 17 of 17 View Policies Current Attempt in Progress Y Find the solution of the initial value problem y" + 2y' + 2y = 0, T = 0, y (7) y(t): < = > Choose one = 9. How does the solution behave as t → ∞? Choose one Decreasing without bounds Increasing without bounds Exponential decay to a constant Oscillating with increasing amplitude Oscillating with decreasing amplitude