Related MCQs

• The extreme value of the function f(x1, x2,….. xn)=\(\frac{x_1}{2^0}+\frac{x_2}{2^1}+……+\frac{x_n}{2^{n-1}}\) With respect to the constraint Σmi=1 (xi)2 = 1 where m always stays lesser than n and as m,n tends to infinity is?
• The span of a Astroid is increased along both the x and y axes equally. Then the maximum value of: z = x + y along the Astroid is?
• Consider the points closest to the origin on the planes x + y + z = a.
• Find the points on the plane x + y + z = 9 which are closest to origin.
• Maximum value of a 3-d plane is to be found over a circular region. Which of the following happens if we increase the radius of the circular region.
• Which one of these is the right formula for the Lagrange multiplier with more than one constraint?
• Maximize the function x + y – z = 1 with respect to the constraint xy=36.
• In a simple one-constraint Lagrange multiplier setup, the constraint has to be always one dimension lesser than the objective function.
• <p>The span of a Astroid is increased along both the x and y axes equally. Then the maximum value of: z = x + y along the Astroid</p>
• Consider the points closest to the origin on the planes x + y + z =a.