Since smaller loops correspond to larger z values, those loops collapse down to the location of a maximum. We'll see how to find the exact coordinates in the next folder.
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Equations for the critical points
Peitke see kaust õpilaste eest.
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The critical points should be the solutions of the following equations. Turn them on to see where those curves intersect.
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Avaldis 12: negative 2 "x" minus 3 "x" squared minus 2 "y" plus 2 "x" "y" equals 0−2x−3x2−2y+2xy=0
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Avaldis 13: negative 2 minus 2 "x" plus "x" squared plus 2 "y" plus 3 "y" squared equals 0−2−2x+x2+2y+3y2=0
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Avaldis 14: "m" equals "f" left parenthesis, negative 0.7 6 5 , negative 0.0 6 4 , right parenthesism=f−0.765,−0.064
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Avaldis 15: "n" equals "f" left parenthesis, 0.4 4 5 , negative 1.3 3 8 , right parenthesisn=f0.445,−1.338
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Avaldis 16: left parenthesis, negative 0.7 6 5 , negative 0.0 6 4 , right parenthesis−0.765,−0.064
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Avaldis 17: left parenthesis, 0.4 4 5 , negative 1.3 3 8 , right parenthesis0.445,−1.338
