Relate speed to period in a circular orbit and use the result of ( to derive...

Suppose a binary in an eccentric orbit with masses m1and m2. Derive the Kepler’s 3rd law...

Suppose a binary in an eccentric orbit with masses m1and m2. Derive the Kepler’s 3rd law for this eccentric orbit . Express the Kepler’s law in terms of the orbital period T and separation a between the two stars and eccentricity e.

Consider a satellite of mass m in a circular orbit of radius r around the Earth...

Consider a satellite of mass m in a circular orbit of radius r around the Earth of mass ME and radius RE. 1. What is the gravitational force (magnitude and direction) on the satellite from Earth? 2. If we define g(r) to be the force of gravity on a mass m at a radial distance r from the center of the Earth, divided by the mass m, then evaluate the ratio g(r)/g(RE)to see how g varies with radial distance. If...

2. Use Kepler’s third law and the information in the book about the moon’s orbit to...

2. Use Kepler’s third law and the information in the book about the moon’s orbit to calculate the orbital period of the many satellites in “low Earth orbit”. You need to know the semi- major axis for these satellites. You can assume that it is equal to the radius of the earth. Your answer is the length of the day/night cycle as seen by orbiting astronauts. ASTRONOMY

assume that the earth orbits the sun in a circular orbit with constant speed at a...

assume that the earth orbits the sun in a circular orbit with constant speed at a radius of 1.5 x 10^11 m with a period of T = 356 days. Calculate the speed of the earth in its orbit (in m/s)

A planet is in a circular orbit around the sun. Use Newton's law of gravity and...

A planet is in a circular orbit around the sun. Use Newton's law of gravity and his second law of motion to calculate the period of the planet (in day). Data: Mass of sun = 1.989 e+30 kg; Mass of planet = 6.0 e+24 kg; Orbit radius = 1.496 e+11 m.

A satellite is in a circular orbit around the Earth at an altitude of 3.32 106...

A satellite is in a circular orbit around the Earth at an altitude of 3.32 106 m. (a) Find the period of the orbit. (Hint: Modify Kepler's third law so it is suitable for objects orbiting the Earth rather than the Sun. The radius of the Earth is 6.38 106 m, and the mass of the Earth is 5.98 1024 kg.) h (b) Find the speed of the satellite. km/s (c) Find the acceleration of the satellite. m/s2 toward the...

A satellite is in a circular orbit around the Earth at an altitude of 3.84  106 m....

A satellite is in a circular orbit around the Earth at an altitude of 3.84  106 m. (a) Find the period of the orbit. (Hint: Modify Kepler's third law so it is suitable for objects orbiting the Earth rather than the Sun. The radius of the Earth is 6.38  106 m, and the mass of the Earth is 5.98  1024 kg.) h (b) Find the speed of the satellite. km/s (c) Find the acceleration of the satellite. m/s2 toward the center of the...

A satellite is in a circular orbit around the Earth at an altitude of 1.66 106...

A satellite is in a circular orbit around the Earth at an altitude of 1.66 106 m. (a) Find the period of the orbit (in hrs). (Hint: Modify Kepler's third law: T2 = (4π2/GMS)r3 so it is suitable for objects orbiting the Earth rather than the Sun. The radius of the Earth is 6.38 106 m, and the mass of the Earth is 5.98 1024 kg.) (b) Find the speed of the satellite (in km/s). (c) Find the acceleration of...

a) What linear speed must an Earth satellite have to be in a circular orbit at...

a) What linear speed must an Earth satellite have to be in a circular orbit at an altitude of 141 km above Earth's surface? (b) What is the period of revolution?

A GPS satellite moves around Earth in a circular orbit with period 11 h 58 min....

A GPS satellite moves around Earth in a circular orbit with period 11 h 58 min. Determine the radius of its orbit. Hint: use the Newton’s 2nd law of motion relating the gravitational force and the centripetal acceleration of the satellite. Assume the following is given: Earth’s mass MEarth = 6x10^24 kg, Earth’s radius REarth = 6.378x10^6 m, and the gravitational constant G = 6.67x10^-11 Nm2/kg2.