Class 11 Physics MCQs | 100 Questions | Work, Energy & Power
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Class 11 Physics | Work, Energy, and Power MCQs with Answers – Part 1

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11. The dimensions of work and energy are obtained from force multiplied by displacement. The dimensional formula is
ⓐ. \([MLT^{-2}]\)
ⓑ. \([ML^2T^{-1}]\)
ⓒ. \([M^2LT^{-2}]\)
ⓓ. \([ML^2T^{-2}]\)
12. Study the table and identify the row that gives a mismatched SI unit.
RowQuantitySI unit
PWork\(\text{J}\)
QEnergy\(\text{J}\)
RPower\(\text{W}\)
SForce\(\text{J}\)
ⓐ. Row P
ⓑ. Row Q
ⓒ. Row S
ⓓ. Row R
13. Work and energy are treated as scalar quantities in elementary mechanics. This means that their values
ⓐ. do not require a direction in space
ⓑ. must always be positive
ⓒ. must always be zero for circular motion
ⓓ. are measured only in \( \text{W} \)
14. A motor does \(120\,\text{J}\) of work in \(6\,\text{s}\). What is its average power?
ⓐ. \(12\,\text{W}\)
ⓑ. \(60\,\text{W}\)
ⓒ. \(720\,\text{W}\)
ⓓ. \(20\,\text{W}\)
15. From the relation \(P_{\text{avg}}=\frac{W}{t}\), the dimensional formula of power is
ⓐ. \([ML^2T^{-2}]\)
ⓑ. \([MLT^{-3}]\)
ⓒ. \([M^2L^2T^{-3}]\)
ⓓ. \([ML^2T^{-3}]\)
16. A unit statement is written as \(1\,\text{W}=1\,\text{J s}^{-1}\). The meaning of this statement is that
ⓐ. one watt is one joule of energy stored
ⓑ. joule and watt name the same physical unit
ⓒ. one watt transfers one joule each second
ⓓ. one watt is one newton acting through one metre
17. Mechanical work by a constant force is best described by the relation
ⓐ. \(W=Ft\)
ⓑ. \(W=Fv\)
ⓒ. \(W=Fs\sin\theta\)
ⓓ. \(W=Fs\cos\theta\)
18. A force of \(10\,\text{N}\) acts on a body and the body is displaced by \(4\,\text{m}\). The force makes an angle of \(60^\circ\) with the displacement. What is the work done by the force?
ⓐ. \(20\,\text{J}\)
ⓑ. \(40\,\text{J}\)
ⓒ. \(10\,\text{J}\)
ⓓ. \(80\,\text{J}\)
19. A horizontal displacement is produced while a force acts obliquely upward on a block. For calculating work by this force, the useful part of the force is
ⓐ. only the vertical component
ⓑ. the full force magnitude without considering direction
ⓒ. the component perpendicular to the displacement
ⓓ. only the component along the horizontal displacement
20. The expression \(W=\vec{F}\cdot\vec{s}\) shows that work is a
ⓐ. vector quantity in the direction of \(\vec{F}\)
ⓑ. vector quantity in the direction of \(\vec{s}\)
ⓒ. scalar quantity from a scalar product
ⓓ. scalar quantity that is always positive

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