(Chain rule)
(b). Use the chain rule to find and so, where w = x2 + y2 + z2, x = st, y = scost, z = s sint when s= 1 and t=0.
Consider the following. w = In(x2 + y), x = 2t, y = 5 - t (a) Find af by using the appropriate Chain Rule. (b) Find by converting w to a function of t before differentiating. -/1 POINTS LARCALC11 13.R.054. Differentiate implicitly to find oux x2 = 9 x + y -11 POINTS LARCALC11 13.R.069. Find an equation of the tangent plane to the surface at the given point. z = x2 + y2 + 9, (1, 2, 14)
(b). Use the chain rule to find me and where w = 22 + y2 + 22, x = st, y = scost, z = ssint when s = 1 and t = 0.
Question 2. (15 pts) Given w = x-siny, x = s – t, y= t2. Use the chain rule to find the partial derivatives aw as and ow at
Please help solve the following with steps. Thank you! 3. Determine the center of mass of the paraboloid given by the surface -4-x2-y2 and (a) ρ(x, y, z)= 1 (b) pr, y,a) 5 0 if -z 3. Determine the center of mass of the paraboloid given by the surface -4-x2-y2 and (a) ρ(x, y, z)= 1 (b) pr, y,a) 5 0 if -z
All of 10 questions, please. 1. Find and classify all the critical points of the function. f(x,y) - x2(y - 2) - y2 » 2. Evaluate the integral. 3. Determine the volume of the solid that is inside the cylinder x2 + y2- 16 below z-2x2 + 2y2 and above the xy - plane. 4. Determine the surface area of the portion of 2x + 3y + 6z - 9 that is in the 1st octant. » 5. Evaluate JSxz...
3)If w = x2 + y2 + z2 ; x = cos st, y = sin st , z = sat find 4)Find the minimum of the function f(x,y) = x2 + y2 subject to the constraint g(x, y) = xy - 3 = 0 5)Find the first and second order Taylor polynomials to the function f(x,y) = ex+y at (0,0). 6) Let f(x, y, z) = x2 – 3xy + 2z, find Vf and Curl(f)
Triple Integration Problems. 1. Integrate zdV JJ w where ll' is enclosed by the planes z = 0 and cylinders x2 + y2 4 and x2 + y,: 9 = x+9+ 3 and by the 2. Integrate where E is bounded by the zu-plane and the hemispheres z/9-2y2 and z = V/10-22-27 Change the order of integration and evaluate x3 sin(уз)dydx. 0 Jr2 1. Integrate zdV JJ w where ll' is enclosed by the planes z = 0 and cylinders...
1. Consider XPy4 lim (x,y)=(0,0) x2 + y2 Compute the limit along the two lines y = 0 and y = mx. 2. Let F(x, y) = sin(x2y?), where x = sin(u) + cos(v) and y = eutu. Use the chain rule (substitution will earn zero credit) to find ƏF au
Suppose that X = (Xi, X2, . . . , Xn) and Y = (y,Y2, . . . ,Yn) are random samples from continuous distributions F and G, respectively. Wilcoxon's two-sample test statistic W = W(X,Y) is defined to be Σ-ngi Ri where Ri is the rank of in the combined sample. 4. Explain why the identity W -Um(m1)/2 in Questions 2, shows that the value of Δ which minimises W(X, Y is given by