Answer:
h = 17 10⁶ m from surface of mars
Explanation:
For this exercise we will use Newton's second law where force is the force of universal gravitation
F = m a
The acceleration is centripetal
a = v² / r
G m M / r² = m v² / r
The speed module is constant, so we use the uniform motion ratio
v = d / t
Where the distance is the length of the circumference and the time is the period of the orbit
d = 2π r
v = 2π r / T
We replace
G M / r² = (4π² r² / T) / r
r³ = G M T² / 4π²
Let's reduce time to SI units
T = 24.66 h (3600 s / 1 h) = 88776 s
Let's calculate
r = ∛ 6.67 10⁻¹¹ 6.42 10²³ 88776² / 4π²
r = ∛ 8.5485 10²¹ m
r = 2,045 10⁶ m
This is the distance from the center of the planet, The height, which is the distance from the surface is
r = [tex]R_{m}[/tex] + h
h = r - [tex]R_{m}[/tex]
h = 20.45 10 6 - 3.39 106
h = 17 10⁶ m
