[15] (4) GIVEN: z = f(x, y) = x²y, where (x, y) is subject to the constraint: T: x² + xy + 7y² 27, x>0, y > 0. = a) Find MAX(z) (Find the maximum value of z, ) and b) The point (x, y) = I so that MAX(z) = f(x, y) Us the METHOD of the Lagrange Multiplier HINT: (A = ²B-4 = B [A AB = AD A + 0,B0 C# 0,D#0' (provided Add on extra pages as needed for your solution.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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[15] (4) GIVEN: z =
f(x, y) = x²y,
where (x, y) is subject to the constraint:
I: x² + xy + 7y²
27, x > 0, y > 0.
=
a) Find MAX(z)
and
b) The point (x, y) = I so that MAX(z)
A
AB
· C = ADⓇ
(Find the maximum value of z, )
Us the METHOD of the Lagrange Multiplier HINT:
(provided
f(x, y)
4 =B
A
=
A# 0,B #0
C# 0,D#0'
(Add on extra pages
as needed for your
solution.
ILLUSTRATION of
Lagrange Solution
Transcribed Image Text:[15] (4) GIVEN: z = f(x, y) = x²y, where (x, y) is subject to the constraint: I: x² + xy + 7y² 27, x > 0, y > 0. = a) Find MAX(z) and b) The point (x, y) = I so that MAX(z) A AB · C = ADⓇ (Find the maximum value of z, ) Us the METHOD of the Lagrange Multiplier HINT: (provided f(x, y) 4 =B A = A# 0,B #0 C# 0,D#0' (Add on extra pages as needed for your solution. ILLUSTRATION of Lagrange Solution
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