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A.) A gemstone of mass 1.8 kg compresses a scale's spring by 2.6 cm.

Determine the spring constant.

B.) How much would the spring in the previous question compress if a 5.2 kg mass was placed on the scale?

User Wrapperapps
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2 Answers

18 votes
18 votes

Final answer:

The spring constant is calculated using Hooke's Law by applying the force due to the gemstone's weight and the displacement of the spring. The calculated constant is 678.46 N/m. When a different mass of 5.2 kg is used, the spring compresses 7.5 cm.

Step-by-step explanation:

Solving for the Spring Constant:

To determine the spring constant (k), we use Hooke's Law, which states F = kx, where F is the force in newtons (N), k is the spring constant in newtons per meter (N/m), and x is the displacement of the spring in meters (m). When a gemstone with a mass of 1.8 kg compresses a spring by 2.6 cm (which is 0.026 m), the force applied is equivalent to the weight of the gemstone, which is the mass times the acceleration due to gravity (F = mg). In this case, F = 1.8 kg × 9.8 m/s^2 = 17.64 N.

Now, we can solve for k as follows:
17.64 N = k × 0.026 m
k = 17.64 N / 0.026 m
k = 678.46 N/m

The spring constant is therefore 678.46 N/m.

Compression with a Different Mass:

If a 5.2 kg mass is placed on the same spring, we find the new displacement (x) using Hooke's Law by rearranging it to x = F/k. We calculate the new force (F = 5.2 kg × 9.8 m/s^2 = 50.96 N) and divide by the previously found spring constant (k = 678.46 N/m):

x = 50.96 N / 678.46 N/m
x = 0.075 m or 7.5 cm

The spring would compress by 7.5 cm with a 5.2 kg mass.

User Dennie De Lange
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3.1k points
24 votes
24 votes

Step-by-step explanation:

Given that,

Mass, m = 1.8 kg

Compression, x = 2.6 cm

We know that,

Force on spring = weight

So,


image

Where

k is spring constant


image

(2) If m = 5.2 kg


image

Hence, this is the required solution.

User Guirgis
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2.5k points