Physics Question A satellite circles the Earth in a uniform circular motion with radius of 7,185...
A satellite travels around Earth in uniform circular motion, at a height of 35,800 km above Earth's atoms. The satellite has a mass of 580 kg. a) what is the gravitational force exerted on the satellite by Earth? b) How fast must the satellite be moving to retain this orbit (relative to the center of Earth)
Find the speed of a satellite in a circular orbit around the Earth with a radius 2.77 times the mean radius of the Earth. (Radius of Earth -6.37x103 km, mass of Earth 5.98x1024 kg, G - 6.67x10 11 Nm2/kg2.)
A satellite travels around Earth in uniform circular motion at an altitude of 35,850 km above Earth’s surface. The satellite is in geosynchronous orbit. In the below figure, the satellite moves counterclockwise (ABCDA). (State directions in terms of the x- and y-axes.) The radius of Earth is 6371 km. What is the direction of the satellite’s average velocity for one quarter of an orbit, starting at A and ending at B? Enter the answer in degrees where negative indicates an...
A satellite in a circular orbit around the earth with a radius 1.015 times the mean radius of the earth is hit by an incoming meteorite. A large fragment (m = 89.0 kg) is ejected in the backwards direction so that it is stationary with respect to the earth and falls directly to the ground. Its speed just before it hits the ground is 359.0 m/s. Find the total work done by gravity on the satellite fragment. RE 6.37·103 km;...
A satellite of Earth is moving in a circular orbit with Earth at its center, at a constant speed of 2.00 km/s. a.) How high is the satellite above the surface of the Earth? b.) How long does it take for the satellite to complete one revolution? Helpful info (but not all of it is relevant!): universal gravitational constant G is = 6.674 x 10^-11 m^3/kg s^2 (units may also be expressed as N m^2/kg^2) Mass of Sun = 1.989...
A satellite circles the earth in an orbit whose radius is five times the earth's radius. The earth's mass is 5.98 1024 kg, and its radius is 6.38 106 m. What is the period of the satellite?
An artificial satellite circles the Earth in a circular orbit at a location where the acceleration due to gravity is 9.00 m/s^2. Determine the orbital period of the satellite. I_o, a satellite of Jupiter, has an orbital period of 1.77 days and an orbital radius of 4.22 times 10^5 km. From these data, determine the mass of Jupiter. A minimum-energy transfer orbit to an outer planet consists of putting a spacecraft on an elliptical trajectory with the departure planet corresponding...
A satellite circles the earth in an orbit whose radius is 2.84 times the earth's radius. The earth's mass is 5.98 x 1024 kg, and its radius is 6.38 x 10m. What is the period of the satellite? Number 187.01 Units 5
6. [2pt] A satellite is in a circular orbit around the Earth. The period of the satellite is 20.9 hr. Calculate the radius of the satellite's orbit. Data: My = 5.98 x 10kg, -6.67 x 10 Nm²/kg? Answer: Not yet correct, tries 1/20 S t Al Answers Last Answer: 4.8x10^21 m Hint: Uniform circular motion means that the satellite is accelerated towards the center. The acceleration can be obtained from the law of gravity and the second law combined.
A satellite circles the earth in an orbit whose radius is 4.67 times the earth's radius. The earth's mass is 5.98 times 10^24 kg, and its radius is 6.38 times 10^6 m. What is the period of the satellite? Number Units the tolerance is +/-2%