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Multivariable Calc Cheat Sheet - Web to a calc 1 type of min/max problem to solve. Compare this result to approaching. Check each line (0 x 5would give x=0. If point is de ned, limit exists. The following only apply only if a boundary is given 1. Check the corner points 2. Find and classify the critical points of the following functions: (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Substitute in for x and y.

Check each line (0 x 5would give x=0. Web to a calc 1 type of min/max problem to solve. Find and classify the critical points of the following functions: Compare this result to approaching. Substitute in for x and y. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. The following only apply only if a boundary is given 1. Check the corner points 2. If point is de ned, limit exists.

Substitute in for x and y. If point is de ned, limit exists. Check each line (0 x 5would give x=0. The following only apply only if a boundary is given 1. Compare this result to approaching. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Web to a calc 1 type of min/max problem to solve. Check the corner points 2. Find and classify the critical points of the following functions:

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Substitute in for x and y. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. If point is de ned, limit exists. Check the corner points 2. Web to a calc 1 type of min/max problem to solve.

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Compare this result to approaching. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Find and classify the critical points of the following functions: Check each line (0 x 5would give x=0. Substitute in for x and y.

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Check the corner points 2. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Substitute in for x and y. Web to a calc 1 type of min/max problem to solve. If point is de ned, limit exists.

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Compare this result to approaching. If point is de ned, limit exists. The following only apply only if a boundary is given 1. Substitute in for x and y. Check the corner points 2.

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The following only apply only if a boundary is given 1. Check each line (0 x 5would give x=0. Compare this result to approaching. If point is de ned, limit exists. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2.

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Compare this result to approaching. Substitute in for x and y. Find and classify the critical points of the following functions: Check each line (0 x 5would give x=0. Web to a calc 1 type of min/max problem to solve.

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Check the corner points 2. Find and classify the critical points of the following functions: The following only apply only if a boundary is given 1. Web to a calc 1 type of min/max problem to solve. Check each line (0 x 5would give x=0.

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Web to a calc 1 type of min/max problem to solve. The following only apply only if a boundary is given 1. If point is de ned, limit exists. Check the corner points 2. Find and classify the critical points of the following functions:

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Check each line (0 x 5would give x=0. If point is de ned, limit exists. Web to a calc 1 type of min/max problem to solve. Check the corner points 2. Find and classify the critical points of the following functions:

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Check the corner points 2. Substitute in for x and y. If point is de ned, limit exists. (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Check each line (0 x 5would give x=0.

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Find and classify the critical points of the following functions: (a) f(x,y) = x5+y4−5x−32y+81 (b) f(x,y) = x3+y3+3xy−27 (c) f(x,y) = x2y+3xy−3x2−4x+2y+1 2. Check each line (0 x 5would give x=0. Compare this result to approaching.