A satellite has a mass of 6366 kg and is in a circular orbit 4.28 × 105 m above the surface of a planet. The period of the orbit is 1.9 hours. The radius of the planet is 4.27 × 106 m. What would be the true weight of the satellite if it were at rest on the planet’s surface?
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A satellite has a mass of 6366 kg and is in a circular orbit 4.28 ×...
A satellite has a mass of 6392 kg and is in a circular orbit 4.88 × 105 m above the surface of a planet. The period of the orbit is 1.7 hours. The radius of the planet is 4.89 × 106 m. What would be the true weight of the satellite if it were at rest on the planet’s surface?
A satellite has a mass of 6425 kg and is in a circular orbit 3.80 105 m above the surface of a planet. The period of the orbit is 2.10 hours. The radius of the planet is 4.09 106 m. What would be the true weight of the satellite if it were at rest on the planet's surface?
A satellite has a mass of 3410 kg and is in a circular orbit 5.51 x 106 m above the surface of a planet. The period of the orbit is 7.06 hours. The radius of the planet is 4.04 x 106 m. What is the true weight of the satellite when it is at rest on the planet's surface?
show work/explanation Question 4 A satellite has a mass of 6171 kg and is in a circular orbit 4.76 x 105 m above the surface of a planet. The period of the orbit is 2.5 hours. The radius of the planet is 4.61 x 10 m. what would be the true weight of the satellite if it were at rest on the planet's surface? the tolerance is +/-296
A 18.0 kg satellite has a circular orbit with a period of 3.40 h and a radius of 8.60 × 106 m around a planet of unknown mass. If the magnitude of the gravitational acceleration on the surface of the planet is 4.00 m/s2, what is the radius of the planet?
A 507 kg satellite is in a circular orbit at an altitude of 754 km above a planet’s surface. This planet is similar to our Earth. Because of air friction, the satellite eventually is brought to the Earth’s surface, and it hits the Earth with a speed of 3 km/s. The radius of the planet is 7 × 106 m and its mass is 8 × 1024 kg. The gravitational constant is 6.67259 × 10−11 N m2 /kg2. How much...
A 16 kg satellite has a circular orbit with a period of 2.6 h and a radius of 9.4 × 106 m around a planet of unknown mass. If the magnitude of the gravitational acceleration on the surface of the planet is 7.7 m/s2, what is the radius of the planet?
A planet has a mass of 7.24 × 1024 kg and a radius of 7240 km. (a) Find the orbital radius of a satellite that is to complete 1 orbit every 3.4 hours. (b) Find the tangential velocity of a satellite that is to orbit 560 km above this planet’s surface. (c) Find the time period of a satellite that has an orbital radius of 9.35 × 107 m around this planet.
Question 4 of 10 > An artificial satellite is in a circular orbit d = 380.0 km above the surface of a planet of radius r = 5.55 x 10 km. The period of revolution of the satellite around the planet is T = 3.15 hours. What is the average density of the planet? density = kg/m
The planet shown has a mass of M, and the satellite is in a circular orbit of radius r. a) In terms of M, r, and the universal gravitational constant G, what is the period Tof the satellite? Derive the formula. b) By what factor would the period change if the mass of the planet doubled? c) By what factor would the period change if the radius of the orbit doubled?