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An astronaut is standing on the surface of a planet that has a mass of 6.42×1023 kg and a radius of 3397 km. The astronaut fires a 2.6-g bullet straight up into the air with an initial velocity of 406 m/s. What is the greatest height the bullet will reach? The planet has no atmosphere

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Answer:

Height = 11.975 km

Explanation:

As we know… g = Gm/[tex]r^{2}[/tex] so, by substituting the values requires

g = Gm/r2 = 6.673 x 10^-11 x 6.42 x 10^23 / (3397000 m)2 = 3.71 ms-1

P.E = K.E so, mgh = 1/2m [tex]v^{2}[/tex]

h = [tex]v^{2}[/tex]/2g = (406)2 / 2(3.71) = 11976 m or 11.975 km

The bullet will travel a maximum height of 11.975 km vertically upward applying assumption of no atmosphere on the planet…

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