Universal Gravitation Problem?
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Hey Buddy Here is ur Answer !!
★ Verify the inverse square rule for gravitation with the following chain of calculations.
→ Determine the centripetal acceleration of the moon. (Assuming the moon is held in it's orbit by the gravitational force of the Earth, you are then also calculating the acceleration due to gravity of the Earth at the moon's orbit.)
→ Determine the ratio of the radius of the moon's orbit to the radius of the Earth.
→ Use the results of a. and b. to calculate the acceleration due to gravity on the surface of the Earth.
How does this value compare to the generally accepted value of g?
→ Are the results of your calculations in close enough agreement with experimental observations to verify the inverse square rule for gravitation? Discuss briefly.
★ Estimate the value of the universal gravitational constant from the following approximate measurements taken during the original Cavendish experiment (and converted into SI units for us).
→ one hundred kilogram fixed and one kilogram rotating masses
ten centimeter separation between fixed and rotating masses
→ one million th newton of force on each of the rotating masses
Check it out.
→ Determine the acceleration due to gravity (g) on the surface of the Earth from Newton's law of universal gravitation.
→ How does this value compare to the standard acceleration due to gravity (g)?
→ Are the results of your calculation close enough to the standard value to verify the distance-dependent portion of Newton's law of universal gravitation? Discuss briefly.
→ Jupiter is about eleven times larger in diameter and three hundred times more massive than the Earth. How does the gravitational field on Jupiter compare to that on earth?
HOPE IT WILL HELP U !!
》》 BE BRAINLY 《《
★ Verify the inverse square rule for gravitation with the following chain of calculations.
→ Determine the centripetal acceleration of the moon. (Assuming the moon is held in it's orbit by the gravitational force of the Earth, you are then also calculating the acceleration due to gravity of the Earth at the moon's orbit.)
→ Determine the ratio of the radius of the moon's orbit to the radius of the Earth.
→ Use the results of a. and b. to calculate the acceleration due to gravity on the surface of the Earth.
How does this value compare to the generally accepted value of g?
→ Are the results of your calculations in close enough agreement with experimental observations to verify the inverse square rule for gravitation? Discuss briefly.
★ Estimate the value of the universal gravitational constant from the following approximate measurements taken during the original Cavendish experiment (and converted into SI units for us).
→ one hundred kilogram fixed and one kilogram rotating masses
ten centimeter separation between fixed and rotating masses
→ one million th newton of force on each of the rotating masses
Check it out.
→ Determine the acceleration due to gravity (g) on the surface of the Earth from Newton's law of universal gravitation.
→ How does this value compare to the standard acceleration due to gravity (g)?
→ Are the results of your calculation close enough to the standard value to verify the distance-dependent portion of Newton's law of universal gravitation? Discuss briefly.
→ Jupiter is about eleven times larger in diameter and three hundred times more massive than the Earth. How does the gravitational field on Jupiter compare to that on earth?
HOPE IT WILL HELP U !!
》》 BE BRAINLY 《《
Answered by
2
- Newton's law of universal gravitation states that every particle attracts every other particle in the universe with a force which is directly proportional to the product of their masses and inversely proportional to the square of the distance between their centers.
BE BRAINLY
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