B. Prove the following identity:dydt+ay=eddtyearwhere a is constant. Using this identity solve the following system of differential equations:dy = -k₁y₁dtdy2=dtWhat form does the solution take for the second differential equation if k, = k₂t=0 y₁ = 1= k₁y₁ - k₂y₂ t=0 y₂ = 0

Answered: Image /qna-images/answer/f4cb2a7a-9b3c-45bd-8807-6de1c6ce8c9c.jpg

B. Prove the following identity: [y] where a is constant. Using this identity solve the following system of differential equations: dy₁ dt dy dt 1 = -k₁y₁ dy 2 +ay=eat t = 0 y₁ = 1 -= k₁y₁-k₂y₂ t=0 y₂ = 0 dt What form does the solution take for the second differential equation if k, = k₂

B. Prove the following identity: [y] where a is constant. Using this identity solve the following system of differential equations: dy₁ dt dy dt 1 = -k₁y₁ dy 2 +ay=eat t = 0 y₁ = 1 -= k₁y₁-k₂y₂ t=0 y₂ = 0 dt What form does the solution take for the second differential equation if k, = k₂

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 4CR

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Question

B. Prove the following identity:
dy
dt
+ay=e
d
dt
year
where a is constant. Using this identity solve the following system of differential equations:
dy = -k₁y₁
dt
dy2=
dt
What form does the solution take for the second differential equation if k, = k₂
t=0 y₁ = 1
= k₁y₁ - k₂y₂ t=0 y₂ = 0

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