Find the average distance from the origin of all the points of the solid cylinder {(x,y,z) | x2+y2+z2 =<4 and 0=<z=<4}. Use either a triple integral or the formula for the volume of a cylinder, and use either cylindrical or spherical coordinates.
Find the average distance from the origin of all the points of the solid cylinder {(x,y,z) | x2+y...
Consider the solid inside the hemispherez- 4-x2-y2, outside the cylinder x2+y2 -1 and y* , outside the cylinder x' +y 1 an above the plane z 1. Express the volume of this solid as a triple integral using the specified coordinate systerm Include a sketch of the solid. a. cylindrical coordinates. b. spherical coordinates.
For the described solid S, write the triple integral f(x,y, z)dV as an iterated integral in (i) rectangular coordinates (x,y, z); (ii) cylindrical coordinates (r, 0, 2); (iii) spherical coordinates (p, φ,0). a. Inside the sphere 2 +3+224 and above the conezV b. Inside the sphere x2 + y2 + 22-12 and above the paraboloid z 2 2 + y2. c. Inside the sphere 2,2 + y2 + z2-2 and above the surface z-(z2 + y2)1/4 d. Inside the sphere...
Consider the triple integral SISE g(x,y,z)d), where E is the solid bounded above by the sphere x2 + y2 + z2 = 18 and below by the cone z? = x2 + y2. a) Set up the triple integral in rectangular coordinates (x,y,z). b) Set up the triple integral in cylindrical coordinates (r, 0,z). c) Set up the triple integral in spherical coordinates (2,0,0).
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...
5. (2 points) Let S be the solid inside both x2+y2 = 16 and x2+y2 + z2 = 32. Consider (a) Write an iterated integral for the triple integral in rectangular coordinates. (b) Write an iterated integral for the triple integral in cylindrical coordinates. (c) Write an iterated integral for the triple integral in spherical coordinates. (d) Evaluate one of the above iterated integrals. 5. (2 points) Let S be the solid inside both x2+y2 = 16 and x2+y2 +...
Please explain steps 3. Consider the triple integral , g(x, y, z)dV, where E is the solid bounded above by the sphere x2 + y2 + z2 = 18 and below by the cone z= x2 + y2. a) Set up the triple integral in rectangular coordinates (x,y,z). b) Set up the triple integral in cylindrical coordinates (r,0,z). c) Set up the triple integral in spherical coordinates (0,0,0).
Consider the solid inside the hemispherez- 4-x2-y2, outside the cylinder x2+y2 -1 and above the plane z 1.Express the volume of this solid as a triple integral using the specified coordinate system Include a sketch of the solid. ib. spherical coordinates Consider the solid inside the hemispherez- 4-x2-y2, outside the cylinder x2+y2 -1 and above the plane z 1.Express the volume of this solid as a triple integral using the specified coordinate system Include a sketch of the solid. ib....
(5 pts each) Sketch the solid that is inside both z-x2+y 2. and x2 +y-4 with 1s z s 3. Then, given f(x.y,z) = x2 +y2+z2, use the specified coordinate system to set up the integral f(x.y,z)dV over the solid. using cylindrical coordinates а. b. using spherical coordinates
/ 3. (18 points) Consider the solid bounded above by x2 + y2 +ク= 15 and below by χ =-+ Set up the limits of integration for a triple integral of a function f(x, y, z) over this solid using (a) rectangular, (b) cylindrical, and (c) spherical coordinates. / 3. (18 points) Consider the solid bounded above by x2 + y2 +ク= 15 and below by χ =-+ Set up the limits of integration for a triple integral of a...
Question 8.6. The solid inside the sphere x? + y2 + 2? 3 4 and outside the cylinder I TY has density f(x, y, z) = typ • Write a triple integral (including the limits of integration) in cylindrical coordinates that gives the mass of this solid. • Write a triple integral (including the limits of integration) in spherical coordinates that gives the mass of this solid • Compute the mass of the solid using the integral that seems easier...