Question #3d707

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Question #3d707

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Answer 1 · 2018-01-16T23:12:51

This is an elliptic paraboloid, having a single minimum.

Explanation:

Let $f (x, y) = 2 x^{2} + 2 y^{2} + 1$ $f(x, y) = 2x^2 + 2y^2 + 1$ .
Then $f_{x} (x, y) = 4 x$ $f_x(x, y) = 4x$
and $f_{y} (x, y) = 4 y$ $f_y(x, y) = 4y$ .
Clearly $f_{x} = 0$ $f_x = 0$ when x = 0, and $f_{y} = 0$ $f_y = 0$ when y = 0.
The two partial derivatives are zero only at (0, 0).

This is the only critical point.

Now, we could the second partials test.
$f_{\times} (x, y) = 4$ $f_(xx)(x, y) = 4$ (Second partial with respect to x twice.)
$f_{x y} (x, y) = 0 = f_{y x} (x, y)$ $f_(xy)(x, y) = 0 = f_(yx)(x, y)$
$f_{y y} (x, y) = 4$ $f_(yy)(x, y) = 4$
Therefore $D = f_{\times} (x, y) f_{y y} (x, y) - f_{x y} (x, y) f_{y x} (x, y)$ $D = f_(xx)(x, y)f_(yy)(x, y) - f_(xy)(x, y)f_(yx)(x, y)$
$= 16$ $= 16$
Since D > 0, we examine f-xx. Since f-xx = 4 > 0, this is a (local) minimum.

However, we might also skip the partials test. We observe that since both variables are squared, the global minimum value must occur where x = 0 and y = 0. That is, the minimum value is $0 + 0 + 1 = 1$ $0 + 0 + 1 = 1$ , and the origin is the minimum.

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Question #3d707

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