plz like the answer
1) The region of integration of I is represented by the blue region in: O a...
Let f(x,y) = 2x2 - 4x + y2 - 4y +1. 1) The number of critical points of f is: a. 0 b. 1 c. 2 d. 3 Оа. Ob. Ос. Od 2) The point (1,2) is: a. a local maximum forf b. a local minimum forf a saddle point for c. Оа. Ob Oc. Let1 = f'secx dydx. .) The region of integration of I is represented by the blue region in b O a Od 2) By reversing...
Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I secx dydx. 2) By reversing the order of integration of I, we get: a. I = $ S secx dxdy b. 1= SS secx dxdy c. IESU secx dxdy d. 1 = secx dxdy
Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = SL, secx dydx. 2)By reversing the order of integration of I, we get: a. I = 16 secx dxdy b. I = foto secx dxdy c. 1 = 1secx dxdy d. 1 = SS, SS,' secx dxdy C. O d.
Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = secx dydx. 2) By reversing the order of integration of I, we get: a. I = secx dxdy b. I = ('secx dxdy c. INSS secx dxdy d. I = So, secx dxdy
Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = S secx dydx. 1) The region of integration of I is represented by the blue region in: * Oь. C. O d.
Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = SMS secx dydx. 1) The region of integration of I is represented by the blue region in Oь. d
Exercise 4. Implicit differentiation (15 pts) Given z - xy + yz + y = 2 and z is a differentiable function in x and y. Then at (1,1,1) is: az дх a. 0 b. 1 1 C 2 d. d e. None of the above a. b. C. d. e. Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = S. secx dydx. 1) The region of integration ofl is represented by the blue region in:...
Please Solve As soon as Solve quickly I get you thumbs up directly Thank's Abdul-Rahim Taysir 2) The point (1,2) is: a. a local maximum for f b. a local minimum for f c. a saddle point for f a Ο Ο Ο b Exercise 6. Double integral in rectangular coordinates (10 pts+10 pts) Let I = secx dydx.
6. (4 pts) Consider the double integral∫R(x2+y)dA=∫10∫y−y(x2+y)dxdy+∫√21∫√2−y2−√2−y2(x2+y)dxdy.(a) Sketch the region of integration R in Figure 3.(b) By completing the limits and integrand, set up (without evaluating) the integral in polar coordinates. 2 1 2 X -2 FIGURE 3. Figure for Problem 6. 6. (4 pts) Consider the double integral V2 2-y2 (2? + y) dA= (32 + y) dx dy + (x2 + y) dx dy. 2-y? (a) ketch the region of integration R in Figure 3. (b) By completing...
6. (4 pts) Consider the double integral∫R(x2+y)dA=∫10∫y−y(x2+y)dxdy+∫√21∫√2−y2−√2−y2(x2+y)dxdy.(a) Sketch the region of integration R in Figure 3.(b) By completing the limits and integrand, set up (without evaluating) the integral in polar coordinates.∫R(x2+y)dA=∫∫drdθ.7. (5 pts) By completing the limits and integrand, set up (without evaluating) an iterated inte-gral which represents the volume of the ice cream cone bounded by the cone z=√x2+y2andthe hemisphere z=√8−x2−y2using(a) Cartesian coordinates.volume =∫∫∫dz dxdy.(b) polar coordinates.volume =∫∫drdθ. -1 -2 FIGURE 3. Figure for Problem 6. 6. (4 pts)...