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Suppose x and y are related by the given equation and use implicit differentiation to determine dydx.x7y+y7x=7.

Suppose x and y are related by the given equation and use implicit differentiation to determine dydx.x7y+y7x=7.
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Suppose x and y are related by the given equation and use implicit differentiation to determine dydx.x7y+y7x=7.

User Stupidfrog
by
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1 Answer

2 votes

Looks like the equation is


x^7y+y^7x=7

Differentiate both sides with respect to
x, taking
y to be a function of
x.


(\mathrm d[x^7y+y^7x])/(\mathrm dx)=(\mathrm d[7])/(\mathrm dx)


(\mathrm d[x^7])/(\mathrm dx)y+x^7(\mathrm dy)/(\mathrm dx)+(\mathrm d[y^7])/(\mathrm dx)x+y^7(\mathrm dx)/(\mathrm dx)=0


7x^6y+x^7(\mathrm dy)/(\mathrm dx)+7y^6x(\mathrm dy)/(\mathrm dx)+y^7=0

Solve for
(\mathrm dy)/(\mathrm dx):


(x^7+7y^6)(\mathrm dy)/(\mathrm dx)=-(7x^6y+y^7)


(\mathrm dy)/(\mathrm dx)=-(7x^6y+y^7)/(x^7+7y^6)

User Markrian
by
8.5k points
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