A satellite is in a circular orbit about the earth (ME = 5.98 × 10 24 5.98 × 10 24 kg). The period of the satellite is 1.00 × 10 4 1.00 × 10 4 s. What is the speed at which the satellite travels?(G = 6.67 × 10 − 11 6.67 × 10 − 11 N.m2/kg2)
A satellite is in a circular orbit about the earth (ME = 5.98 × 10 24...
A satellite is in a circular orbit about the earth (ME = 5.98 x 1024 kg). The period of the satellite is 1.27 x 104 s. What is the speed at which the satellite travels?
A satellite is in a circular orbit about the earth (ME = 5.98 x 1024 kg). The period of the satellite is 1.07 x 104 s. What is the speed at which the satellite travels?
Answer in m/s A satellite is in a circular orbit about the earth (M_E = 5.98 times 10^24 kg). The period of the satellite is 2.38 times 10^4 s. What is the speed at which the satellite travels?
A satellite is in a circular orbit about the Earth at a distance of four (4) Earth radii above the surface of the Earth. What is the velocity of the satellite? (Earth's mass: ME = 5.98 x 1024 kg; the radius of the Earth: 6.4 x 106m ; G = 6.67 x 10-11 Nm2/kg2 ). A) 4,072.5 m/s B)3,530.5 m/s C)5,582.2 m/s D)7,465.9 m/s
6. [2pt] A satellite is in a circular orbit around the Earth. The period of the satellite is 26.7 hr. Calculate the radius of the satellite's orbit. Data: ME=5.98 x 1024 kg, G = 6.67 x 10-11 Nm²/kg2. Answer: Submit Al Answers 7. [2pt] What is the speed of the satellite in the previous problem? Answer: (Submit All Answers)
A spacecraft of mass m = 1900 kg is moving on a circular orbit about the earth at a constant speed v = 5.12 km/s. [Given: Mass of the earth M = 5.98 times 10^24 kg, radius of the earth R = 6.37 times10^6 m, gravitational constant G = 6.67 times 10^-11 N.m^2/kg^2.] a. Determine the radius r of the circular orbit. b. What is the period T of the orbit? c. The satellite, by firing its engines, moves to...
10-3. A 639-kg satellite is in a circular orbit about Earth at a height h = 1.16 x 10^7 m above the Earth’s surface. Find (a) the gravitational force (N) acting on the satellite, (b) the satellite’s speed (m/s) (magnitude of its velocity, not its angular velocity), and (c) the period (h) of its revolution. Caution: The radius of the satellite’s orbit is not just its height above the Earth’s surface. It also includes the radius of the Earth. The...
A particular satellite was placed in a circular orbit about 163 mi above Earth. (a) Determine the orbital speed of the satellite. m/s (b) Determine the time required for one complete revolution. min 1024 kg.) An artificial satellite circling the Earth completes each orbit in 119 minutes. (The radius of the Earth is 6.38 x 106 m. The mass of the Earth is 5.98 (a) Find the altitude of the satellite. m (b) What is the value of g at...
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.
Q12-2 Gravitation 1. Find the speed of a satellite in a circular orbit around the Earth with a radius 2.71 times the mean radius of the Earth. (Radius of Earth = 6.37 x 10 km, mass of Earth = 5.98 x 1024 kg, -6.67 x 10" Nm /kg.) (in m/s) 2 V- 5.67 XII VA