B) use the integrating factor eith the given m(x) to solve the given differential equations. i.onto both sides of the equation.i. Show that with the above values, μ(r) (y' + f(x)y)) = (y · µ(x))'ii. Show that, with the above values, a solution to the differential equation isii.iii.O Search(b) Use the integrating factor method with the given u(x) to solve the given differentialcquations:y =Ly11(T) / (9(T)µ(x)] day' - 8y = 20,Y 2X3.xy' + 4xy = 20x³,||2APage <µ(x) = c¹n(x)µ(x) = e-8xamazonMath 12 Worksheet 8.pdfacerµ¹(x) = c²x²2B> of 2CCAug 25, 2022 Aug 25, 2022

To solve the following problem using the integrating factors given

with the above values, µ(x) (y' + f(x)y)) = (y · µ(x))' ii. Show that, with the above values, a solution to the differential equation is i. Use the integrating factor method with the given (r) to solve the given differential equations: ii. y = iii. 1 H(T) / (9(x)µ(x)] dr y' - 8y = 20, y' - Y x 2 3.x y' + 4xy = 20x³, 2 μ(x) = e-8x μ(x) = n(x) µ¹(x) = c²r²

with the above values, µ(x) (y' + f(x)y)) = (y · µ(x))' ii. Show that, with the above values, a solution to the differential equation is i. Use the integrating factor method with the given (r) to solve the given differential equations: ii. y = iii. 1 H(T) / (9(x)µ(x)] dr y' - 8y = 20, y' - Y x 2 3.x y' + 4xy = 20x³, 2 μ(x) = e-8x μ(x) = n(x) µ¹(x) = c²r²

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) use the integrating factor eith the given m(x) to solve the given differential equations.

i.
onto both sides of the equation.
i. Show that with the above values, μ(r) (y' + f(x)y)) = (y · µ(x))'
ii. Show that, with the above values, a solution to the differential equation is
ii.
iii.
O Search
(b) Use the integrating factor method with the given u(x) to solve the given differential
cquations:
y =
L
y
1
1(T) / (9(T)µ(x)] da
y' - 8y = 20,
Y 2
X
3.x
y' + 4xy = 20x³,
||
2
A
Page <
µ(x) = c¹n(x)
µ(x) = e-8x
amazon
Math 12 Worksheet 8.pdf
acer
µ¹(x) = c²x²
2
B
> of 2
C
C
Aug 25, 2022 Aug 25, 2022

With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.

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