It takes 5.06 J of work to stretch a Hooke's-law spring 13.3 cm from its unstressed length. How much the extra work is required to stretch it an additional 13.4 cm? Answer in units of J. It takes 5.06 J of work to stretch a Hooke's-law spring 13.3 cm from its unstressed length. How much the extra work is required to stretch it an additional 13.4 cm? Answer in units of J.

Question

Physics

Zion Alexander

1 November, 03:16

It takes 5.06 J of work to stretch a Hooke's-law spring 13.3 cm from its unstressed length. How much the extra work is required to stretch it an additional 13.4 cm? Answer in units of J. It takes 5.06 J of work to stretch a Hooke's-law spring 13.3 cm from its unstressed length. How much the extra work is required to stretch it an additional 13.4 cm? Answer in units of J.

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Answers (1)

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Alana Shannon · Answer 1

Answers:

extra work required = 0.038 J

Explanation:

let X = 13.3 cm and Y = 13.4 cm, W1 be the work done to stretch the spring 13.3 cm and W2 be the work done to stretch the spring 13.4cm. let F be the force stretching the spring.

from Work and Energy principles:

W1 = F*X*cos (Ф) = F*X, since the force is acting in the direction at which the spring is stretching, cos (Ф) = 1

then:

W1 = F*X

F = W1/X

= 5.06 / (13.3*10^-2)

= 38.05 J

and,

W2 = F*Y*cos (Ф) = F*Y, ince the force is acting in the direction at which the spring is stretching, cos (Ф) = 1

W2 = F*Y

= (38.5) * (13.4*10^*2)

= 5.098 J

therefore, the extra required is 5.098 - 5.06 = 0.038 J.