Given the eqn 2y^2 - 2xy - 4y + x^2 = 0 , how to get the x coordinates of each point at which the curve has a horizontal tangent?

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Given the eqn 2y^2 - 2xy - 4y + x^2 = 0 , how to get the x coordinates of each point at which the curve has a horizontal tangent?

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Answer 1 · 2018-02-18T20:56:53

Use Calculus

Explanation:

Implicitly differentiate both sides of the equation, rearrange to get
$dy/dx = (y-x)/(2y-x-2)$
Horizontal tangent: gradient =0
$0=(y-x)/(2y-x-2)$
$0=y-x$
$y=x$

So horizontal tangents occur when y=x

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Given the eqn 2y^2 - 2xy - 4y + x^2 = 0 , how to get the x coordinates of each point at which the curve has a horizontal tangent?

1 Answer

Explanation:

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