Current Electricity MCQs With Answers – Part 2 (Class 12 Physics)
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Current Electricity MCQs with Answers – Part 2 (Class 12 Physics)

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101. A device has \(V=2\,\text{V}\) when \(I=0.20\,\text{A}\), but \(V=8\,\text{V}\) when \(I=0.40\,\text{A}\). What conclusion follows from these two readings?
ⓐ. The ratio \(\frac{V}{I}\) changes, so it is non-ohmic in this range
ⓑ. The resistance remains constant at \(10\,\Omega\) for both readings
ⓒ. The device follows direct proportionality \(V\propto I\) in this range
ⓓ. The current unit changes between the two readings
102. A graph of \(V\) versus \(I\) for an ohmic resistor is a straight line through the origin. If the slope of the line is \(8\,\text{V A}^{-1}\), the resistance is
ⓐ. \(0.125\,\Omega\)
ⓑ. \(4\,\Omega\)
ⓒ. \(8\,\Omega\)
ⓓ. \(16\,\Omega\)
103. Compare the two resistor graphs described below.
Two ohmic resistors \(P\) and \(Q\) have straight \(V\)-versus-\(I\) graphs through the origin. The line for \(P\) is steeper than the line for \(Q\).
The comparison of their resistances is
ⓐ. \(R_P\gt R_Q\)
ⓑ. \(R_P\lt R_Q\)
ⓒ. \(R_P=R_Q=0\)
ⓓ. \(R_P=\frac{1}{R_Q}\)
104. Compare the two current-voltage graphs described below.
Two ohmic resistors \(P\) and \(Q\) have straight \(I\)-versus-\(V\) graphs through the origin. The line for \(P\) is steeper than the line for \(Q\).
The comparison of their resistances is
ⓐ. \(R_P\gt R_Q\)
ⓑ. \(R_P=R_Q\)
ⓒ. \(R_P+R_Q=0\)
ⓓ. \(R_P\lt R_Q\)
105. The same resistor is represented on two different graphs. One graph plots \(V\) against \(I\), and the other plots \(I\) against \(V\). If the resistor has resistance \(5\,\Omega\), the slopes of the two graphs respectively are
ⓐ. \(5\,\Omega\) and \(0.20\,\Omega^{-1}\)
ⓑ. \(5\,\Omega\) and \(5\,\Omega\)
ⓒ. \(0.20\,\Omega^{-1}\) and \(5\,\Omega\)
ⓓ. \(0.20\,\Omega^{-1}\) and \(0.20\,\Omega^{-1}\)
106. A graph of \(I\) on the vertical axis and \(V\) on the horizontal axis passes through the origin and the point \((V,I)=(12\,\text{V},3\,\text{A})\). The resistance of the conductor is
ⓐ. \(0.25\,\Omega\)
ⓑ. \(4\,\Omega\)
ⓒ. \(3\,\Omega\)
ⓓ. \(36\,\Omega\)
107. Consider the following statements about ohmic graph slopes. I. Slope of a \(V\)-versus-\(I\) graph gives \(R\). II. Slope of an \(I\)-versus-\(V\) graph gives \(\frac{1}{R}\). III. A steeper \(I\)-versus-\(V\) line represents larger \(R\).
ⓐ. II and III only
ⓑ. I and III only
ⓒ. I and II only
ⓓ. I, II, and III
108. A resistor is tested at constant temperature. Its \(V\)-\(I\) graph passes through \((0.5\,\text{A},2\,\text{V})\) and \((2.0\,\text{A},8\,\text{V})\). The slope and resistance are
ⓐ. \(2\,\text{V A}^{-1}\) and \(2\,\Omega\)
ⓑ. \(6\,\text{V A}^{-1}\) and \(6\,\Omega\)
ⓒ. \(4\,\text{V A}^{-1}\) and \(4\,\Omega\)
ⓓ. \(8\,\text{V A}^{-1}\) and \(8\,\Omega\)
109. A straight \(V\)-\(I\) graph for a conductor does not pass through the origin. The most careful conclusion is that
ⓐ. it always represents an ideal ohmic resistor
ⓑ. it is not the standard ohmic-resistor graph through the origin
ⓒ. the ratio \(\frac{V}{I}\) is automatically constant for all readings
ⓓ. its slope must be zero
110. The unit of slope of a \(V\)-versus-\(I\) graph is
ⓐ. \(\text{A V}^{-1}\)
ⓑ. \(\text{V A}^{-1}\)
ⓒ. \(\text{C s}^{-1}\)
ⓓ. \(\text{J C}^{-1}\)
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