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Problem 1 (8 pt) Given a 3 dimensional scalar field T(1, y, z) = ry +...
10. For this problem, use the vector field Fx, y, z) = (y2, 23, ry+22) (a) 3 points Show that F is conservative. (b) 8 points Find a potential function f(x, y, :) such that F = V. (c) 4 points Evaluate SF. dr where C is any smooth curve from (1,0,-2) to (4,6,3). (d) 2 points What is the value of JF dr where is the circle 12 + y2 = 36 in the ry-plane?
1.) (8 pts.) Consider the vector field F(t, y, z) = (3cʻz + 3 + yzbi – (22 - 12)ī + (23 – 2yz +2 + xy)k Find a scalar function f, which has a gradient vector equal to F, or determine that this is impossible.
Find the solution y of the initial value problem 3"(t) = 2 (3(t). y(1) = 0, y' (1) = 1. +3 g(t) = M Solve the initial value problem g(t) g” (t) + 50g (+)? = 0, y(0) = 1, y'(0) = 7. g(t) = Σ Use the reduction order method to find a second solution ya to the differential equation ty" + 12ty' +28 y = 0. knowing that the function yı(t) = + 4 is solution to that...
Let $(x, y, z) = - x In (y + z) be a scalar field. Find the directional derivative of dat P(-2, 1, 0) in the direction of the vector V = Enter the exact value of your answer in the boxes below using Maple syntax. Number
8.) (16 pts.) Verify Stoke's Theorem for the Vector Field F (, y, z) = (-y)i + (-2)5+(z)k, where Surface S is that portion of the paraboloid z= 6 – 12 – yº, which lies above the plane z = 2.
2. Evaluate the surface integral (cos(zz),3ev,-e y) and S is the part of the sphere z2+-2)2 8 where F(x, y,z) that lies above the ry-plane, oriented by outward normal.
2. Evaluate the surface integral (cos(zz),3ev,-e y) and S is the part of the sphere z2+-2)2 8 where F(x, y,z) that lies above the ry-plane, oriented by outward normal.
URGENT TRUE/FALSE
1 T F The intersection of 2 = 12 + y and rº + y² + 2 = 18 is a circle of radius 9. 2. T F = 2x + y is an equation of the tangent plane for f(z,y) = ry at the point where I = 1 and y=1. 3. T F Assume that (1,1) is a critical point for the function f(x,y) = 1 + y - 4ry+3. Then (1,1) is a local maximum...
Problem 1 You are given the maximum and minimum of the function f(x, y, z) = x2 - y2 on the surface x2 + 2y2 + 3z2 = 1 exist. Use Lagrange multiplier method to find them. Let us recall the extreme value theorem we discussed before the spring break: Extreme Value Theorem (For Functions Of Two Variables) If f(x,y) is continuous on a closed, bounded region D in the plane, then f attains a maximum value f(x,y) and a...
e) The temparature at the point y,z) is given by T(x,y,z) x2yz °C Use the method of tagrane multipliers to find the hottest and coldest points on the surface of the sphere x2y2z2 12. What are the hottest and coldest temperatures on the surface of the sphere in degrees Celsius? Question 2. (6 marks+ 4 marks+ 2 marks+3 marks+5 marks 20 marks) a) Find all solutions of the system of linear equation Ax = b where 2 3 12 5...
Problem 3. (1 point) The temperature at a point (X,Y,Z) is given by T(x, y, z) = 200e-x=y+14–2–19, where T is measured in degrees Celsius and x,y, and z in meters. There are lots of places to make silly errors in this problem; just try to keep track of what needs to be a unit vector. Find the rate of change of the temperature at the point (-1, 1,-1) in the direction toward the point (-4,-5, -5). In which direction...