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13 Nov 2019
1. Find the mass m of a sphere of uniform density and radius b = 5 using a triple integral and spherical coordinates. Find the center of m ass of a hemi-sphere uniform density Find the moment of inertia I about an axis through the center of a sphere of 2. and radius b = 5. 3. uniform density and radius b = 5. mb 4.Verify that 1-5 (m is the mass you found in part 1) Now repeat problems 1, 3, and 4, but this time for a cylinder of length L-10 and radius b-5; for problem 3 use an axis through the center of the end of the cylinder, parallel to the length of the cylinder. Use cylindrical coordinates. The formula to verify becomes Mass 6.Moment of inertia- Verification of formula:
1. Find the mass m of a sphere of uniform density and radius b = 5 using a triple integral and spherical coordinates. Find the center of m ass of a hemi-sphere uniform density Find the moment of inertia I about an axis through the center of a sphere of 2. and radius b = 5. 3. uniform density and radius b = 5. mb 4.Verify that 1-5 (m is the mass you found in part 1) Now repeat problems 1, 3, and 4, but this time for a cylinder of length L-10 and radius b-5; for problem 3 use an axis through the center of the end of the cylinder, parallel to the length of the cylinder. Use cylindrical coordinates. The formula to verify becomes Mass 6.Moment of inertia- Verification of formula:
Sixta KovacekLv2
23 Jun 2019