In Exercises 135–140, use logarithmic differentiation to find the derivative of y with respect to the appropriate variable. 2(x² + 1) Зх + 4 10 136. y 135. y = V 2r 4 Vcos 2x ((t + 1)(t D). (t – 2)(t + 3), 137. y = t> 2 2u2" 138. y = Vư + 1 139. y = (sin 0)Vª 140. y = (In x)'/(ln x)
In Exercises 135–140, use logarithmic differentiation to find the derivative of y with respect to the appropriate variable. 2(x² + 1) Зх + 4 10 136. y 135. y = V 2r 4 Vcos 2x ((t + 1)(t D). (t – 2)(t + 3), 137. y = t> 2 2u2" 138. y = Vư + 1 139. y = (sin 0)Vª 140. y = (In x)'/(ln x)
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter6: Vector Spaces
Section6.7: Applications
Problem 16EQ
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Transcribed Image Text:In Exercises 135–140, use logarithmic differentiation to find the
derivative of y with respect to the appropriate variable.
2(x² + 1)
Зх + 4
10
136. y
135. y =
V 2r
4
Vcos 2x
((t + 1)(t
D).
(t – 2)(t + 3),
137. y =
t> 2
2u2"
138. y =
Vư + 1
139. y = (sin 0)Vª
140. y = (In x)'/(ln x)
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