Thermal Properties Of Matter MCQs | 100 Questions | Class 11
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Thermal Properties of Matter MCQs with Answers – Part 2 (Class 11 Physics)

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101. A rod of length \(2.5\,\text{m}\) has \(\alpha=1.6\times10^{-5}\,\text{K}^{-1}\). It is heated from \(30^\circ\text{C}\) to \(130^\circ\text{C}\). What is its final length?
ⓐ. \(2.5004\,\text{m}\)
ⓑ. \(2.5400\,\text{m}\)
ⓒ. \(2.5040\,\text{m}\)
ⓓ. \(2.4960\,\text{m}\)
102. Linear expansion formulas are usually written for small temperature changes. The main reason is that:
ⓐ. \(\alpha\) is nearly constant over the range
ⓑ. heat has no unit for large temperature changes
ⓒ. all solids stop expanding at low temperature
ⓓ. length cannot be measured at high temperature
103. An arrangement uses two rods of equal original length joined end to end. Rod \(P\) has coefficient \(\alpha\), and rod \(Q\) has coefficient \(2\alpha\). Both experience the same temperature rise \(\Delta T\). If rod \(P\) expands by \(x\), the total increase in length of the joined arrangement is:
ⓐ. \(4x\)
ⓑ. \(2x\)
ⓒ. \(x\)
ⓓ. \(3x\)
104. Area expansion of a thin isotropic metal sheet is described by:
ⓐ. \(\Delta A=\frac{\beta\Delta T}{A}\)
ⓑ. \(\Delta A=A+\beta+\Delta T\)
ⓒ. \(\Delta A=\beta A\Delta T\)
ⓓ. \(\Delta A=\alpha L\Delta T\)
105. For an isotropic solid, the coefficient of area expansion \(\beta\) is approximately:
ⓐ. \(2\alpha\)
ⓑ. \(3\alpha\)
ⓒ. \(\alpha\)
ⓓ. \(\frac{\alpha}{2}\)
106. A square metal plate is heated uniformly. What happens to a circular hole at the centre of the plate?
ⓐ. The hole expands as if it were made of the same metal
ⓑ. The hole disappears because metal fills it during heating
ⓒ. The hole contracts because surrounding metal expands inward
ⓓ. The hole remains exactly unchanged while the outer boundary expands
107. The coefficient of area expansion \(\beta\) is best interpreted as:
ⓐ. total final area after heating
ⓑ. decrease in mass per unit rise in temperature
ⓒ. fractional area change per unit temperature rise
ⓓ. increase in area per unit heat supplied to the sheet
108. A metal sheet has original area \(A\) and coefficient of area expansion \(\beta\). After a small temperature rise \(\Delta T\), its final area is:
ⓐ. \(A'=A(1+\beta\Delta T)\)
ⓑ. \(A'=\frac{A}{1+\beta\Delta T}\)
ⓒ. \(A'=\beta A\Delta T\)
ⓓ. \(A'=A(1-\beta\Delta T)\)
109. A thin metal plate of area \(0.50\,\text{m}^2\) is heated through \(50\,\text{K}\). If \(\beta=4.0\times10^{-5}\,\text{K}^{-1}\), what is the increase in area?
ⓐ. \(2.0\times10^{-3}\,\text{m}^2\)
ⓑ. \(1.0\times10^{-2}\,\text{m}^2\)
ⓒ. \(4.0\times10^{-3}\,\text{m}^2\)
ⓓ. \(1.0\times10^{-3}\,\text{m}^2\)
110. A square metal plate is heated uniformly. Its side length increases by a small fraction \(x\). The approximate fractional increase in its area is:
ⓐ. \(3x\)
ⓑ. \(\frac{x}{2}\)
ⓒ. \(2x\)
ⓓ. \(x\)
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