- Problem 1 5 5 5 15 Marks Let H R3 R Be Such That H X1 X2 X3 X1x2x3 1 Find Critical Values Of H Over H Si 1 (36.67 KiB) Viewed 23 times
Problem 1 (5+5+5=15 Marks). Let h: R3 → R be such that h(x1, X2, X3) = x1x2x3. 1. Find critical values of h over h Si :=
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Problem 1 (5+5+5=15 Marks). Let h: R3 → R be such that h(x1, X2, X3) = x1x2x3. 1. Find critical values of h over h Si :=
Problem 1 (5+5+5=15 Marks). Let h: R3 → R be such that h(x1, X2, X3) = x1x2x3. 1. Find critical values of h over h Si := {(x1, x2, 13) | 2 + x3 + x3 = 1, 2x3 = x1 + x2}. := + 2. Find critical values of h over S3 := {(x1, X2, X3) | x + xž + x; = 3, 2x3 = x1 + x2}. = 3. Find critical values of h over E := {(21, 12, x3) | 4xí + 9xż + xž = 1, 2x3 = x1 + x2}. = =
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