Find all the local maxima, local minima, and saddle points of the function.
A. f(6, 6) = -1,679,610, local minimum
B. f(0, 0) = 6, local maximum; f(6, 6) = -1,679,610, local minimum
C. f(6, 0) = 6, saddle point; f(0, 6) = 6, saddle point
D. f(0, 0) = 6, local maximum
Answer: D
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Use the brute force algorithm to find a minimum Hamilton circuit for the graph. Also, determine the total weight of the minimum Hamilton circuit.
A. Minimum Hamilton circuit is W ? X ? Y ? Z ? W; weight = 60 B. Minimum Hamilton circuit is W ? X ? Z ? Y ? W; weight = 79 C. Minimum Hamilton circuit is W ? Y ? X ? Z ? W; weight = 67 D. Minimum Hamilton circuit is W ? Z ? X ? Y ? W; weight = 60
Provide an appropriate response.Mentally divide by using powers of 10: 
A. 9 B. 3 C. 900 D. 300
Find the requested function.If f(x) = x2 - 3x + 3, find f(x + h).
A. x2 + xh + h2 - 3x - 3h - 3 B. x2 + h2 - 3x - 3h + 3 C. x2 + h2 - 3x - 3h + 6 D. x2 + 2xh + h2 - 3x - 3h + 3
Find three positive numbers x, y, and z whose sum is 32 and 
is a maximum.
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