Page 1 of 1
a. (17 points) Let f(x, y) = xexy - 4√x² + y². Evaluate a af and 8²f 𐐀х𐐀у b. (20 points) Let f(x, y) = x³y² - 12x + 4y +
Posted: Sat Jul 09, 2022 2:19 pm
by answerhappygod
- 1 (27.36 KiB) Viewed 45 times
a. (17 points) Let f(x, y) = xexy - 4√x² + y². Evaluate a af and 8²f 𐐀х𐐀у b. (20 points) Let f(x, y) = x³y² - 12x + 4y + 2. Use the First Derivative Test to find the (x, y) coordinates of all the points at which the function possibly has a relative maximum or a relative minimum. Then use the formula D(x, y) = (3) (03) - (27) to determine whether those points are the locations of the relative maximums, relative minimums, saddle points, or "undetermined" by the Derivative Test.