Use the method of Lagrange multiplier to:
The solution to Exercise
A person wants to plant a rectangular garden along one side of a house and put a fence on the other three sides. (See Fig.
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- Find the minimum value of f(x,y)=x^2+y^2 subject to the constraint 6x+4y=18 using the method of Lagrange multipliers and evaluate λ. minimum f = ? λ = ?arrow_forwardA function, z = ax + by, is to be optimized subject to the constraint, x2 + y2=1 where a and b are positive constants. Use Lagrange multipliers to show that this problem has only one solution in the positive quadrant (i.e. in the region x > 0, y > 0) and that the optimal value of z is √a2 +b2.arrow_forward
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