QUIZ#8 **Problem Statement:**Find the absolute maximum and minimum values of the function \( f(x, y) = x^2 + y^2 + x^2y + 4 \) on the region defined by:\[\Omega = \{(x, y) : |x| \leq 1, |y| \leq 1\}\]**Explanation of the Region:**The region \(\Omega\) is a square in the coordinate plane where both \(x\) and \(y\) range from -1 to 1, inclusive. This region includes all points (x, y) that satisfy the conditions \(|x| \leq 1\) and \(|y| \leq 1\).

Name: QUIZ#8 **Problem Statement:**Find the absolute maximum and minimum val
Uploaded: 2024-03-20T07:07:50.000Z
Channel: Bartleby
Description: QUIZ#8 **Problem Statement:**Find the absolute maximum and minimum values of the function \( f(x, y) = x^2 + y^2 + x^2y + 4 \) on the region defined by:\[\Omega = \{(x, y) : |x| \leq 1, |y| \leq 1\}\]**Explanation of the Region:**The region \(\Omega\

Consider the domain Ω=(x, y): |x|≤1, |y|≤1 We first find critical points by setting fx and fy equal to 0 Consider the function f(x, y)=x2+y2+x2y+4fx=2x+2xyfy=2y+x2Set fx=0⇒2x+2xy=0⇒x(1+y)=0⇒x=0, y=-1Set fy=0⇒2y+x2=0⇒x2=-2yPut x=0 in x2=-2y we gety=0 1st Point (0, 0)∈ΩPut y=-1 in x2=-2y we getx2=2⇒x=±2 2nd Point (±2, -1)As the critical point (±2, -1)∉Ω so we eliminate itWe now check the boundaries We find the critical point of the boundary Consider the boundary B1:- x=x, y=1 Consider, f(x, 1)=2x2 +5 f'(x, 1)=4x=0 ⇒x=0 Thus the critical point is (0, 1) Consider the boundary B2:- x=-1, y=y Consider, f(-1, y)=2y2 +5 f'(-1, y)=4y=0 ⇒y=0 Thus the critical point is (-1, 0) Consider the boundary B3:- x=x, y=-1 Consider, f(x, -1)=5 f'(x, -1)=0 Thus there are no critical point Consider the boundary B4:- x=1, y=y Consider, f(1, y)=y2+y+5 f'(1, y)=2y+1=0 ⇒y=-12 Thus the critical point is (1, -12)Endpoints of the domain are:- (1, 1), (1, -1), (-1, 1), (-1, -1) Critical Points of the function and the boundaries are (0, 0), (0, 1), (-1, 0), (1, -12) Points (x, y) Function:- f(x, y)=x2 +y2 +x2 y+4 (1, 1) 7 (1, -1) 5 (-1, 1) 7 (-1, -1) 5 (0, 0) 4 (0, 1) 5 (-1, 0) 5 (1, -12) 234≈5.75So We get Absolute maxima=7 Absolute minima=4