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A 67.3-kg climber is scaling the vertical wall of a mountain. His safety rope is made of a material that, when stretched, behaves like a spring with a spring constant of 1.23 x 103 N/m. He accidentally slips and falls freely for 0.921 m before the rope runs out of slack. How much is the rope stretched when it breaks his fall and momentarily brings him to rest

User Ladineko
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1 Answer

9 votes
9 votes

Answer:


d=0.59m

Step-by-step explanation:

From the question we are told that:

Mass
m=67.3 kg

Spring constant
\mu=1.23 * 10^3 N/m

Fall Height
h=0.921m

Generally the Energy theorem equation for momentum is mathematically given by

Change in KE=Work done by gravity + work done by spring


0=mg*(h + d) - (\mu d^2)/(2)


0=(67.3 * 9.81 (0.921 + d)) -((1.23 * 10^3 * d^2)/( 2)


0=608.1-660.213d-615d^2

Solving Quadratic equation


d=0.59m

User Don Wool
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2.5k points