Given the following differential equation [e] dx + [2y + x e']dy = 0 Which has an "F" and "g(y)" of F = x e' + g(y) and 8(y) = y2 + C This gives us a general solution of x e + y2 = k Think of the "k" as the "+ C", we just moved it to the other side. Use the initial condition " y(14) = 0 " to find "k" and thus the specific solution for the problem. (A x e' + y? = 196 x e + y? = 0 x e + y2 1 202 604.284 x e + y? = 14 E x e + y? = 1
Given the following differential equation [e] dx + [2y + x e']dy = 0 Which has an "F" and "g(y)" of F = x e' + g(y) and 8(y) = y2 + C This gives us a general solution of x e + y2 = k Think of the "k" as the "+ C", we just moved it to the other side. Use the initial condition " y(14) = 0 " to find "k" and thus the specific solution for the problem. (A x e' + y? = 196 x e + y? = 0 x e + y2 1 202 604.284 x e + y? = 14 E x e + y? = 1
Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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q10
![Given the following differential equation
[e]dx + [2y + x e"] dy = 0
Which has an "F" and "g(y)" of
F = x e' + g(y) and 8(y) = y2 + C
This gives us a general solution of
x e' + y2 = k
Think of the "k" as the "+ C", we just moved it to the other side. Use the initial condition "y(14) = 0" to find "k" and thus the specific
solution for the problem.
(A)
x e' + y? = 196
x e + y2 = 0
x e' + y2 = 1 202 604.284
(D
x e' + y2 = 14
(E
xe + y2 = 1
B,](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F0aabcd98-b978-467b-8964-8be1a3a280f5%2F105ecadf-99fa-4eb0-b136-0612ed6a43b6%2Fe1sm0h4_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Given the following differential equation
[e]dx + [2y + x e"] dy = 0
Which has an "F" and "g(y)" of
F = x e' + g(y) and 8(y) = y2 + C
This gives us a general solution of
x e' + y2 = k
Think of the "k" as the "+ C", we just moved it to the other side. Use the initial condition "y(14) = 0" to find "k" and thus the specific
solution for the problem.
(A)
x e' + y? = 196
x e + y2 = 0
x e' + y2 = 1 202 604.284
(D
x e' + y2 = 14
(E
xe + y2 = 1
B,
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