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Find dy/dx by implicit differentiation. x2 − 8xy + y2 = 8
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2 votes
Find dy/dx by implicit differentiation. x2 − 8xy + y2 = 8

User Nex
by
5.5k points

2 Answers

4 votes

Answer:


(dy)/(dx) = (8y - 2x)/(2y - 8x)

Explanation:

The denominator is always the variable that we want to find the derivation in relation of. So it is always dx.

The number is the variable we derivated. So


x^(2) - 8xy + y^(2) = 8


2x(dx)/(dx) - 8y(dx)/(dx) - 8x(dy)/(dx) + 2y(dy)/(dx) = 0


2x - 8y + (2y - 8x)(dy)/(dx) = 0


(2y - 8x)(dy)/(dx) = 8y - 2x


(dy)/(dx) = (8y - 2x)/(2y - 8x)

User Dhafin Rayhan
by
6.5k points
3 votes
we have that

x² − 8xy + y² = 8
2x-8y-8x(dy/dx)+2y*(dy/dx)=0
8x(dy/dx)-2y*(dy/dx)=2x-8y
[8x-2y]*(dy/dx)=2x-8y
(dy/dx)=[2x-8y]/[8x-2y]
(dy/dx)=2*[x-4y]/2*[4x-y]
(dy/dx)=[x-4y]/[4x-y]

the answer is
(dy/dx)=[x-4y]/[4x-y]

User Tim Wachter
by
5.8k points
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