Could someone show me how to solve this:
Could someone show me how to solve this: Find the maximum and minimum values attained by...
Find the absolute minimum and maximum values of the function on the given region D. Be sure to sketch D. f(x, y) = x+y-xy, D is the closed triangular region with vertices (0,0), (0,2), and (4,0). Hint: for this region, you have three lines, two are similar to the square problem and the hypothenuse is a line y = mx + b. So f(x,y) = f(x, mx + b) along that path.
I need help with how to solve these simultaneous equations. Could someone please show me the steps to get to the answer. Sum of forces in the x direction is zero i.e. FCD COs 33.69"-FAD COS 33.69"-FDE COS 33.690-0 54.08xcos 33.69 - FAD coS 33.69 F cos 33.69... .(5) Sum of forces in the y direction is zero i.e FRD +Fcn sin 33.69" + FAD sin 33.69 - FDE sin 33.690 -20-54.08x sin 33.69" + FD sin 33.69-Fg sin 33.690...
Determine the absolute maximum and minimum values of the function f(x,y) = xy-exp(-xy) in the region {0<x<2} x {0 <y<b} where 1 <b< . Does the function possess a maximum value in the unbounded region {0 < x <2} x {y >0}?
Find the minimum and maximum values of the function Find the maximum and minimum values of the function g(0) = 60 – 8 sin(0) on the interval (0,7) Minimum value = Preview Maximum value = Preview
could someone help me with this Solve the following initial value problem 22 y (z) – 7 (de v(z)) + 10 y (2) = 18 sin (z) – 14 cos (2) with d. 2 y(0)=2, dy(0) dr =12
(1 point) Find the maximum and minimum values of the function f(x, y, z) = yz + xy subject to the constraints y2 + z2 Minimum value is | = 196 and xy = 8. Maximum value is
how to do part A B and C? Use Lagrange multipliers to find the maximum and minimum values of the function f subject to the given constraints g and h f(x, y, z)-yz-6xy; subject to g : xy-1-0 h:ỷ +42-32-0 and a) (i)Write out the three Lagrange conditions, i.e. Vf-AVg +yVh Type 1 for A and j for y and do not rearrange any of the equations Lagrange condition along x-direction: Lagrange condition along y-direction: Lagrange condition along z-direction: 0.5...
4. (20 points) Find the local minimum and local maximum values and saddle points of the function f(x, y)= 4ary- xy-ay2 4. (20 points) Find the local minimum and local maximum values and saddle points of the function f(x, y)= 4ary- xy-ay2
Could someone please help me figure out how to solve these problems for Fundamentals of Electromagnetics? I've seen posts for this questions that simply post the converted base vectors and answers, but I'm confused how to convert them in the first place. For example, in part b, I see answers that immediately convert ay into but I can't figure out how that was determined in the first place. Can someone please help me with those steps in particular? Thank you...
Find the local maximum and minimum values and saddle point(s) of the function. If you have three dimensional graphing software, graph the function with a domain and viewpoint that reveal all the important aspects of the function. (Enter NONE in any unused answer blanks.) f(x, y) = 4ex cos(y) f(x, y) -4ex cos(y) maximum (larger x value) minimum (larger x value) saddle points ) (smallest x value) )(largest x value) f(x, y) -4ex cos(y) maximum (larger x value) minimum (larger...