(1) Let C₁ and C₂ be arbitrary constants. The general solution to the homogeneous differential equation a²y" - 17xy' +81y = 0 is the function y(x) = C₁ y₁ (x) + C₂ Y2(x) = C₁ +C₂ (2) The unique solution to the initial value problem is the function y(x) = for 2 € For -∞ type -inf and for ∞ type inf. x²y" 17xy' +81y = 0, y(1) = 7, y'(1) = -3.

(1) Let C₁ and C₂ be arbitrary constants. The general solution to the homogeneous differential equation a²y" - 17xy' +81y = 0 is the function y(x) = C₁ y₁ (x) + C₂ Y2(x) = C₁ +C₂ (2) The unique solution to the initial value problem is the function y(x) = for 2 € For -∞ type -inf and for ∞ type inf. x²y" 17xy' +81y = 0, y(1) = 7, y'(1) = -3.

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter11: Differential Equations

Section11.CR: Chapter 11 Review

Problem 15CR

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Question

(1) Let C₁ and C₂ be arbitrary constants. The general solution to the homogeneous differential equation x²y" - 17xy' +81y = 0 is the function y(x) = C₁ y₁(x) + C₂ Y2(x) = C₁
+C₂
(2) The unique solution to the initial value problem
is the function y(x) = for a €
For -∞ type -inf and for x type inf.
x²y" - 17xy' +81y = 0, y(1) = 7, y'(1) = −3.

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