A spring $40 \,mm$ long is stretched by the application of a force. If $10 \,N$ force required to stretch the spring through $1 \,mm$ , then work done in stretching the spring through $40\, mm$ , is

Force applied $F=10\, N$ Stretching in the spring $x=1\, mm =0.001\, m$ $\therefore$ spring constant $k=\frac{F}{x}=\frac{10}{0.001}=10^{4}$ Now the spring is stratched through a distance $x _{1}=40\, mm$ $=0.04\, m$ The force required to stretch it through $x_{1}$ is $F_{1}=k x_{1}$ $\therefore$ The work done by this force $W=\frac{1}{2} k x_{1}^{2}$ $=\frac{1}{2} \times 10^{4} \times 0.04 \times 0.04$ $\frac{1}{2} \times 16=8\, J$

A spring $40 \,mm$ long is stretched by the applic

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Concepts Used:

Work

Work is the product of the component of the force in the direction of the displacement and the magnitude of this displacement.

Work Formula:

W = Force × Distance

Where,

Work (W) is equal to the force (f) time the distance.

Work Equations:

W = F d Cos θ

Where,

W = Amount of work, F = Vector of force, D = Magnitude of displacement, and θ = Angle between the vector of force and vector of displacement.

Unit of Work:

The SI unit for the work is the joule (J), and it is defined as the work done by a force of 1 Newton in moving an object for a distance of one unit meter in the direction of the force.

Work formula is used to measure the amount of work done, force, or displacement in any maths or real-life problem. It is written as in Newton meter or Nm.

A spring $40 \,mm$ long is stretched by the application of a force. If $10 \,N$ force required to stretch the spring through $1 \,mm$, then work done in stretching the spring through $40\, mm$, is

The Correct Option is D

Solution and Explanation

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