Mechanical Properties Of Solids MCQs | 100 Questions
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Class 11 Physics | Mechanical Properties of Solids MCQs with Answers – Part 2

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111. A liquid-like pressure is applied equally on all faces of a small solid cube. The cube’s volume decreases slightly but its shape remains almost similar. This situation is the most suitable setup for measuring
ⓐ. bulk modulus
ⓑ. Young’s modulus only
ⓒ. shear modulus only
ⓓ. Poisson’s ratio only
112. A material has a large bulk modulus. Under the same pressure increase, compared with a material of smaller bulk modulus, it will show
ⓐ. larger fractional volume change
ⓑ. zero stress in every case
ⓒ. larger strain because it is stiffer
ⓓ. smaller fractional volume change
113. In a compression test, pressure on a solid is increased by \(2.0\times10^7\,\text{Pa}\). The fractional decrease in volume is \(4.0\times10^{-5}\). The bulk modulus is
ⓐ. \(5.0\times10^{11}\,\text{Pa}\)
ⓑ. \(8.0\times10^2\,\text{Pa}\)
ⓒ. \(5.0\times10^{-12}\,\text{Pa}\)
ⓓ. \(2.0\times10^7\,\text{Pa}\)
114. A report gives \(\Delta P=+6.0\times10^6\,\text{Pa}\), \(V=3.0\times10^{-3}\,\text{m}^3\), and \(\Delta V=-1.5\times10^{-8}\,\text{m}^3\). The bulk modulus is
ⓐ. \(-1.2\times10^{12}\,\text{Pa}\)
ⓑ. \(3.0\times10^{-15}\,\text{Pa}\)
ⓒ. \(1.2\times10^{12}\,\text{Pa}\)
ⓓ. \(4.0\times10^6\,\text{Pa}\)
115. Consider the following statements about bulk modulus. I. It relates pressure change to volumetric strain. II. Its SI unit is \( \text{Pa} \). III. A larger value usually means the material is less compressible. IV. It is dimensionless because volumetric strain is dimensionless. The suitable set is
ⓐ. I, II, and III only
ⓑ. I, II, and IV only
ⓒ. I, III, and IV only
ⓓ. II, III, and IV only
116. Compressibility \(K_c\) is related to bulk modulus \(B\) by
ⓐ. \(K_c=\frac{1}{B}\)
ⓑ. \(K_c=B^2\)
ⓒ. \(K_c=2B\)
ⓓ. \(K_c=\frac{B}{2}\)
117. The unit of compressibility is
ⓐ. \( \text{Pa} \)
ⓑ. \( \text{N} \)
ⓒ. \( \text{J m}^{-3} \)
ⓓ. \( \text{Pa}^{-1} \)
118. Material \(P\) has bulk modulus \(8.0\times10^{10}\,\text{Pa}\), while material \(Q\) has bulk modulus \(2.0\times10^{10}\,\text{Pa}\). The compressibility of \(Q\), compared with that of \(P\), is
ⓐ. four times as large
ⓑ. one-fourth as large
ⓒ. twice as large
ⓓ. the same
119. A solid has bulk modulus \(1.5\times10^{11}\,\text{Pa}\). Its compressibility is closest to
ⓐ. \(1.5\times10^{11}\,\text{Pa}^{-1}\)
ⓑ. \(3.0\times10^{11}\,\text{Pa}^{-1}\)
ⓒ. \(7.5\times10^{10}\,\text{Pa}^{-1}\)
ⓓ. \(6.7\times10^{-12}\,\text{Pa}^{-1}\)
120. For many ordinary comparisons, gases are more compressible than liquids and solids. In terms of bulk modulus, this means gases usually have
ⓐ. larger bulk modulus
ⓑ. smaller bulk modulus
ⓒ. infinite shear modulus
ⓓ. zero volumetric strain under pressure
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