Calculate the strength of the trampoline

What is the force required to decelerate the friends?

a) 500N

b) 6261N

c) 5000N

Do the friends succeed in breaking their trampoline?

a) Yes

b) No

Force Required to Decelerate the Friends

The force required to decelerate the friends is calculated by multiplying the total mass of the friends by the deceleration.

Force = Mass x Deceleration

Force = 500kg x 12.52m/s² = 6261N

Do the Friends Succeed in Breaking Their Trampoline?

Based on the calculation, the force required to decelerate the friends is 6261N, which is above the threshold of the trampoline at 5000N. Therefore, the friends succeed in breaking their trampoline.

In this scenario, the force required to decelerate the friends is 6261N, which is greater than the threshold of the trampoline at 5000N. This means that the trampoline can withstand the force of the friends landing on it, and they succeed in breaking their trampoline.

It is important to understand the concept of force, mass, and deceleration in determining whether an object can withstand certain impacts. The calculations performed in this scenario help demonstrate the physics behind the strength of the trampoline and its ability to handle the force applied to it.

By considering the mass of the friends, their velocity, and the deceleration rate, we can determine if the trampoline will break under the force exerted on it. In this case, the trampoline successfully withstands the impact, showcasing its strength and durability.