show solution (c) Determine which of the following pairs forms a fundamental set of solutions:[y₁ (1), 3(1)]; [Y2(1), y3(t)]; [y₁(t), y4(t)]; [y4(t), y5(t)].○ [y₁ (t), y3 (t)], [y2(t), y3(t)], and [y4 (t), y5 (t)]O [yi(t), y3(1)] and [y₁ (t), y4 (1)]O [y4(1), y5 (1)] and [y₂(1), 3(1)]O [y2(1), y3(1)] and [y₁ (t), y4 (t)], and [y4 (t), Y5(t)]○ [y₁ (t), y3(t)], [y₁ (t), y4(t)], and [y4 (t), Y5 (1)] Consider the equationy" y' - 2y = 0.Assume that y₁ (t) = e-¹ and y₂(t) = e²t form a fundamental set of solutions.(b) LetY3 (1)Y4 (t)= y₁ (t) + 6y₂ (t)ys(t) = 6y₁ (t) — 6y3(t).=- 6e²tAre y3 (t), y4 (t), and ys (t) also solutions of the given differential equation?O NoO Impossible to tellO Yes

Answered: Image /qna-images/answer/a6d4276c-1700-4b01-a98f-f079be9c763d.jpg

Consider the equation y" y' - 2y = 0. Assume that y₁ (t) = e' and y₂(1) (b) Let Y3 (1) Y4 (t) = y₁ (t) + 6y₂ (1) Y5 (t) = 6y₁ (t) - 6y3(t). = - 6e²1 - = O No O Impossible to tell O Yes e2¹ form a fundamental set of solutions. Are y3 (1), y4 (t), and ys (t) also solutions of the given differential equation?

Consider the equation y" y' - 2y = 0. Assume that y₁ (t) = e' and y₂(1) (b) Let Y3 (1) Y4 (t) = y₁ (t) + 6y₂ (1) Y5 (t) = 6y₁ (t) - 6y3(t). = - 6e²1 - = O No O Impossible to tell O Yes e2¹ form a fundamental set of solutions. Are y3 (1), y4 (t), and ys (t) also solutions of the given differential equation?

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

show solution

(c) Determine which of the following pairs forms a fundamental set of solutions:
[y₁ (1), 3(1)]; [Y2(1), y3(t)]; [y₁(t), y4(t)]; [y4(t), y5(t)].
○ [y₁ (t), y3 (t)], [y2(t), y3(t)], and [y4 (t), y5 (t)]
O [yi(t), y3(1)] and [y₁ (t), y4 (1)]
O [y4(1), y5 (1)] and [y₂(1), 3(1)]
O [y2(1), y3(1)] and [y₁ (t), y4 (t)], and [y4 (t), Y5(t)]
○ [y₁ (t), y3(t)], [y₁ (t), y4(t)], and [y4 (t), Y5 (1)]

Consider the equation
y" y' - 2y = 0.
Assume that y₁ (t) = e-¹ and y₂(t) = e²t form a fundamental set of solutions.
(b) Let
Y3 (1)
Y4 (t)
= y₁ (t) + 6y₂ (t)
ys(t) = 6y₁ (t) — 6y3(t).
=
- 6e²t
Are y3 (t), y4 (t), and ys (t) also solutions of the given differential equation?
O No
O Impossible to tell
O Yes

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