Find the absolute min and max values of ?(?) = 2?^3 – 32?, on the interval [0, 5].
Find the absolute min and max values of ?(?) = 2?^3 – 32?, on the interval...
. Find the absolute max and min values of f(x) in the given interval: f(x) = x^2- 2x + 5 over the closed interval [-1,2]
For y = 4x2 * ex on the interval [-4,4] a) find the absolute max/min : b) find the extreme slopes c) make the y’ and y’’ number lines and show their A/B patterns d) List the local max and mins and IPs from c) e) Sketch y showing all the important points and label its patterns, and list its xintercepts and y intercept.
5. Find the absolute max and absolute min of f(:1, y) = x2 + 2y2 – 2.0 – 4y on the rectangle (<r<2,0 <y<3.
use Lagrange Multipliers to find absolute max & min values of the function f(x,y) with constraint X. y 2
Let f(x)=x^3−(3/2)x^2 on the interval [−1,2]. Find the absolute maximum and absolute minimum of f(x) on this interval. The absolute max occurs at x= . The absolute min occurs at
Provide an appropriate response. Find the absolute maximum and minimum values offlx)-9x 3-108x 2 + 405x-437 on the interval [-2,7]. O max fx) (1) 4361 min fix) -f(-6) -49 0 max f(x)-13)-49 min f(x) -f(-2) 1751 0 max f(x) = f(7) = 193 min f(x) - f(-2) - -1751 fo) -f-6)- -4361 || O max fx)-(6) = 4361 min f(x) = f(1) = 49
I find f(x the ) = absolute x + 1 max on and absoulte min of (o.s, 20] max and absolute min. [-oo,o] find the absolute 160) = x ek on
Locate the absolute extrema of the function f(x) = 4x4-16x-4 on the closed interval (-4,4 absolute max: (-4, 124); no absolute min no absolute max or min no absolute max, absolute min: (-4, 124) absolute max: (14, 124); absolute min: (2, -20) absolute max: (2.-20), absolute min: (-4, 124) Question 3 1 pts The height of an object 1 seconds after it is dropped from a height of 350 meters is so - -4.91* +350. Find the average velocity of...
1. (12) Find the critical points and the extreme max and min values of the function f(x) = 3x* - 4x on the interval [-2, 2].
1. (12) Find the critical points and the extreme max and min values of the function f(x)= 3x* - 4x' on the interval [-2, 2].