A cylinder is fitted with a piston, beneath which is a spring, as in the drawing. The cylinder is open to the air at the top. Friction is absent. The spring constant of the spring is 3300 N/m. The piston has a negligible mass and a radius of 0.029 m. (a) When the air beneath the piston is completely pumped out, how much does the atmospheric pressure cause the spring to compress

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whitneytr12 whitneytr12 · Answer 1 · 2020-06-30T03:29:42+02:00

Answer:

x = 0.081 m.

Explanation:

a) To find how much does the atmospheric pressure cause the spring to compress we need to use the following equation:

[tex] F = k*x [/tex] (1)

Where:

F: is the force

k: is the spring constant = 3300 N/m

x: is the distance of compression =?

The force can be found as follows:

[tex] F = P*A [/tex]

Where:

P: is the atmospheric pressure = 101325 Pa

A: is the area of the piston = πr²

r: is the radius = 0.029 m

[tex] F = 101325 Pa*\pi*(0.029 m)^{2} = 267.7 N [/tex]

Now, from equation (1) we can find x:

[tex] x = \frac{F}{k} = \frac{267.7 N}{3300 N/m} = 0.081 m [/tex]

Therefore, the atmospheric pressure causes the spring to compress 0.081 m.

I hope it helps you!