46. A certain planet is in circular orbit about a star. The radius of the orbit...
A planet orbits a star once every 2.90 x 10's in a nearly circular orbit of radius 1.43 x 1011 m. (a) With respect to the star, determine the angular speed of the planet. rad/s (b) With respect to the star, determine the tangential speed of the planet. m/s (C) With respect to the star, determine the magnitude and direction of the planet's centripetal acceleration. magnitude direction ---Select--- m/s2
points A newly discovered planet is in a circular orbit around a distant star with an orbital period of 400 Earth days. The planet also rotates on its axis, making one full rotation every 4.00 Earth days. The radius of the planet is rp = 7.00 × 106 m and the radius of the planet's orbit about the star is r 7.00×1011 m. My Notes Ask Your Tea Determine the ratio of the radial acceleration, due to the rotation of...
A planet orbits a star, in a year of length 4.39 x 107 s, in a nearly circular orbit of radius 1.77 x 1011 m. With respect to the star, determine (a) the angular speed of the planet, (b) the tangential speed of the planet, and (c) the magnitude of the planet's centripetal acceleration.
A planet orbits a star, in a year of length 2.88 x 107 s, in a nearly circular orbit of radius 3.80 x 1011 m. With respect to the star, determine (a) the angular speed of the planet, (b) the tangential speed of the planet, and (c) the magnitude of the planet's centripetal acceleration.
A planet orbits a star, in a year of length 4.22 x 107 s, in a nearly circular orbit of radius 2.69 x 1011 m. With respect to the star, determine (a) the angular speed of the planet, (b) the tangential speed of the planet, and (c) the magnitude of the planet's centripetal acceleration.
A planet orbits a star, in a year of length 2.23 x 107 s, in a nearly circular orbit of radius 2.89 x 1011 m. With respect to the star, determine (a) the angular speed of the planet, (b) the tangential speed of the planet, and (c) the magnitude of the planet's centripetal acceleration.
XYZ The planet XYZ travels about the star ABC in an orbit that is almost circular. Assume that the orbit is a circle with radius 95,000,000 mi. Assume there are 24 hours in one day on planet XYZ. (a) Assume that XYZ planet year is 322 days, and find the angle formed by XYZ's movement in one day. (b) Give the angular speed in radians per hour. (c) Find the linear speed of XYZ in miles per hour. ABC Not...
A satellite of mass m is in a circular orbit of radius r about a planet of mass M. The period of the satellite's orbit is T. A second satellite of mass 2m is in a circular orbit of radius 2r around the same planet. The period of orbit for the second satellite is 2T 8T O2T OT O 4T
Chapter 08, Problem 47 A planet orbits a star, in a year of length 4.83 x 10^7 s, in a nearly circular orbit of radius 2.25 x 10^11 m. With respect to the star, determine (a) the angular speed of the planet, (b) the tangential speed of the planet, and (c) the magnitude of the planet's centripetal acceleration.
The spaceship Asimov is in circular orbit (radius 6.02x107 m) about the planet Terminus. If it takes 5,004 seconds to orbit the planet, find the mass of the planet, in kg. Express your answer inscientific notation (using E for exponent).