A satellite orbits the earth at a distance of 1.50 * 10^{7} m above the planetʹs surface and takes 8.65 hours for each revolution about the earth. The earthʹs radius is 6.38 * 10^{6} m. The acceleration of this satellite is closest to

a = 0.43 m/s²

Explanation:

First, we need to find the velocity of the satellite:

Velocity = V = Distance Covered/Time Taken

here,

Distance = 1 revolution = 2π (1.5 x 10⁷ m) = 9.43 x 10⁷ m

Time = (8.65 hours) (3600 s/1 hour) = 31140 s

Therefore,

V = (9.43 x 10⁷ m) / (31140 s)

V = 3028.26 m/s

Now, the acceleration of the satellite will be equal to the centripetal acceleration, with the center of circular motion as the center of earth:

a = V²/R

where,

R = 1.5 x 10⁷ m + 0.638 x 10⁷ m

R = 2.138 x 10⁷ m

Therefore,

a = (3028.26 m/s) ² / (2.138 x 10⁷ m)

a = 0.43 m/s²