Hi, I need help solving number 13. Please show all the steps, thank you. :)
Hi, I need help solving number 13. Please show all the steps, thank you. :) Consider the solid Q bounded by z-2-y2;z-tx at each point Р (x, y, z) is given by mass of Q [15 pts] 9. x-4. The density Z/...
Use spherical coordinates to find the mass m of a solid Q that lies between the spheres x2 + y2 +z" 1 and x2 + y2 + z2-4 given that the density at each point P(x, y, z) is inversely proportional to the distance from P to the origin and 8(o, 3,02 15 pts] (0, 1,0)-2/m3 from P to the origin and
Use spherical coordinates to find the mass m of a solid Q that lies between the spheres x2...
Please do #2
40 1. 16 pts) Evaluate the integral( quadrant enclosed by the cirle x + y2-9 and the lines y - 0 and y (3x-)dA by changing to polar coordinates, where R is the region in the first 3x. Sketch the region. 2. [6 pts) Find the volume below the cone z = 3、x2 + y2 and above the disk r-3 cos θ. your first attempt you might get zero. Think about why and then tweak your integral....
Find the mass of the solid with density p(x, y, z) and the given shape. P(x, y, z) = 38, solid bounded by z= x² + y2 and z = 81 Mass =
(1 point) Suppose F(x, y, z) = (x, y, 4z). Let W be the solid bounded by the paraboloid z = x2 + y2 and the plane z = 4. Let S be the closed boundary of W oriented outward. (a) Use the divergence theorem to find the flux of F through S. ſ FdA = 48pi S (b) Find the flux of F out the bottom of S (the truncated paraboloid) and the top of S (the disk). Flux...
Please show all steps! Thank you.
5. Let Q be the solid bounded by the plane 1: x + y + z 1 and the coordinate planes. If the density at each point P(x, y, z) in Q is given by: 8 (x, y, z) 2(z +1) kg find the total mass of Q m3'
5. Let Q be the solid bounded by the plane 1: x + y + z 1 and the coordinate planes. If the density at...
If R is a solid in space with density ρ(x, y, z), it's centre of mass is the point with coordinates i, y, 2, given by za(x, y, z) dV, where z, y, z) dV is the mass of the object. Find the centre of mass of each solid R below (a) Rls the cube with 0 < x < b, 0· у<b, 0-2-band ρ(x, y, z) = x2 + y2 + 22; (b) R is the tetrahedron bounded by...
i will rate. thanks.
[20 pts) Let Q be the solid region Q={ (1,Y,Z): 2Vx2 + y2 < < <2} The density at each point (1,y,z) of Q is given as o(x, y, z) = x2 + y2 + z2. Calculate the moment of inertia about the z-axis, 1,, by hand, showing all work.
Bonus. (8 pts) Many of the definitions we used for two-dimensional mass and moments can be extended to three dimensions rather easily. For example, mass = ESSA 1, 2) av would represent the mass of the solid Q where p(x, y, ) is the density at any point (x, y, z). Find the mass of the solid bounded laterally by the cylinder 2? + y2 = 2x and bounded above and below by the cone x2 = x2 + y2....
Question 3. A solid E with density px is bounded by the surfaces z-0, x1 and z-x 2-y2. Sketch the solid E and find its mass. [10 marks]
Question 3. A solid E with density px is bounded by the surfaces z-0, x1 and z-x 2-y2. Sketch the solid E and find its mass. [10 marks]
Please try helping with all three questions.......please
1 point) Integratef(x, y, z) 6xz over the region in the first octant (x,y, z 0) above the parabolic cylinder z = y2 and below the paraboloid Answer Find the volume of the solid in R3 bounded by y-x2 , x-уг, z-x + y + 24, and Z-0. Consider the triple integral fsPw xyz2 dV, where W is the region bounded by Write the triple integral as an iterated integral in the order...