G.P.E Calculation Challenge: Can You Solve It?

What is the gravitational potential energy (G.P.E) in joules of a 675-newton climber at the top of a 3,050-meter mountain in Colorado? Answer: The gravitational potential energy (G.P.E) in joules of a 675-newton climber at the top of a 3,050-meter mountain in Colorado is 2673 joules.

To calculate the gravitational potential energy (G.P.E), we can use the formula:

G.P.E = mass * gravity * height

Where:

mass = 675 newton

gravity = 9.8 m/s^2 (acceleration due to gravity)

height = 3,050 meters

Plugging in the values:

G.P.E = 675 * 9.8 * 3050

G.P.E = 2673 joules

Therefore, the gravitational potential energy (G.P.E) in joules of a 675-newton climber at the top of a 3,050-meter mountain in Colorado is 2673 joules.

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