Earth's motion around the Sun was neglected; that requires using Earth's "sidereal" period (about four minutes shorter). Notice that Earth's mass could be found by substituting the Moon's distance and period into this form of Kepler's third law. QUESTION If the satellite was placed in an orbit three times farther away, about how long would it take to orbit the Earth once

Question

contestada

Respuesta :

ACCESS MORE EDU ACCESS Universidad de Mexico

moya1316 moya1316 · Answer 1 · 2019-11-28T13:17:59+01:00

Answer:

T = 5.196 T₀

Explanation:

For this exercise let's use Kepler's readings, the third law is

T² = (4π² / G M) a³

They tell us that

The distance is three times greater

a₂ = 3a

As the satellite orbits the earth we use the mass of the earth

M = 5.98 10²⁴ kg

T² = 4 pi2 / (66.7 10⁻¹¹ 5.98 10²⁴) a₂³

T² = 9,898 10¹⁴ a₂³

T² = 9,898 1014 (3 a)³

T2 = 9.89 1014 a³ 27

T₀² = 9.89 10¹⁴ a³

T² = T₀² 27

T = T₀ √27

T = 5.196 T₀

The period increases by 5 times