Find all points on the curve $x^2y^2+xy=2$ where the slope of the tangent line is $-1$ ?

Question

58534 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-03-11T19:55:47

Use Implicit Differentiation (and hope it all falls out the bottom)

Differentiate both sides of the equation:
$D (x^2y^2 + xy) = D(2)$

using the product rule (a couple of times) and the chain rule:
$(2x*y^2 +x^2*2y*y') + ((1)*y + xy') = 0$

giving
$y' (2yx^2 + x) + 2xy^2 + y = 0$
or
$y' = - (2xy^2 + y)/(2yx^2 + x)$

We are asked for the points where the slope ( $y'$ ) equals $- 1$
so
$- (2xy^2 + y)/(2yx^2 + x) = - 1$
or
$2xy^2 + y = 2yx^2 + x$

$y (2xy + 1) = x (2xy + 1)$

provided $xy != - 1/2$ (which can be ruled out as extraneous by referring to the original equation
we have
$y = x$

The original equation becomes
$x^2*x^2 + x*x = 2$

$x^4 + x^2 - 2 = 0$

$(x^2+2)*(x^2-1) = 0$

since $x^2+2 = 0$ is obviously extraneous
$x^2 = +- 1$

with (as already determined $y=x$ )
the required points are
$(-1,-1)$ and $(1,1)$

Find all points on the curve x^2y^2+xy=2x^2y^2+xy=2 where the slope of the tangent line is -1-1?