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

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111. In a pure resistor connected to a sinusoidal \(\text{AC}\) source, voltage and current are
ⓐ. in phase
ⓑ. out of phase by \(\frac{\pi}{2}\), with current lagging
ⓒ. out of phase by \(\frac{\pi}{2}\), with current leading
ⓓ. always opposite in phase by \(\pi\)
112. A pure resistor of resistance \(20\,\Omega\) is connected to an \(\text{AC}\) source with \(V_0=100\,\text{V}\). The peak current is
ⓐ. \(2\,\text{A}\)
ⓑ. \(20\,\text{A}\)
ⓒ. \(5\,\text{A}\)
ⓓ. \(2000\,\text{A}\)
113. A resistor is supplied with \(V_{\text{rms}}=220\,\text{V}\) and carries \(I_{\text{rms}}=2\,\text{A}\). Its resistance is
ⓐ. \(55\,\Omega\)
ⓑ. \(110\,\Omega\)
ⓒ. \(220\,\Omega\)
ⓓ. \(440\,\Omega\)
114. Use the graph description below.
A voltage-time graph and a current-time graph for a circuit cross zero together, reach positive maxima together, and reach negative maxima together.
The circuit behaviour most directly shown by these two graphs is
ⓐ. pure resistive behaviour
ⓑ. pure inductive behaviour
ⓒ. pure capacitive behaviour
ⓓ. transformer action
115. A phasor diagram for a pure resistor is drawn using current as the reference phasor. The voltage phasor should be drawn
ⓐ. \(90^\circ\) ahead of the current phasor
ⓑ. \(90^\circ\) behind the current phasor
ⓒ. opposite to the current phasor
ⓓ. along the current phasor
116. A pure resistor has \(R=40\,\Omega\) and is connected to \(v=120\sin\omega t\,\text{V}\). The current equation is
ⓐ. \(i=3\sin\omega t\,\text{A}\)
ⓑ. \(i=40\sin\omega t\,\text{A}\)
ⓒ. \(i=120\sin(\omega t-\frac{\pi}{2})\,\text{A}\)
ⓓ. \(i=4800\sin\omega t\,\text{A}\)
117. In an \(\text{AC}\) circuit, the instantaneous voltage and current at a certain instant are \(v=12\,\text{V}\) and \(i=-3\,\text{A}\). The instantaneous power at that instant is
ⓐ. \(-36\,\text{W}\)
ⓑ. \(+36\,\text{W}\)
ⓒ. \(-4\,\Omega\)
ⓓ. \(15\,\text{W}\)
118. In a pure resistor carrying sinusoidal \(\text{AC}\), the instantaneous power is never negative because
ⓐ. voltage and current always have opposite signs
ⓑ. current is zero throughout the cycle
ⓒ. voltage and current are in phase
ⓓ. resistance changes sign every half cycle
119. If \(v=V_0\sin\omega t\) and \(i=I_0\sin\omega t\) in a pure resistor, the instantaneous power is
ⓐ. \(p=V_0I_0\sin\omega t\)
ⓑ. \(p=\frac{V_0}{I_0}\sin^2\omega t\)
ⓒ. \(p=V_0I_0\cos\omega t\)
ⓓ. \(p=V_0I_0\sin^2\omega t\)
120. A pure resistor has \(V_{\text{rms}}=120\,\text{V}\) and \(I_{\text{rms}}=2.5\,\text{A}\). The average power consumed is
ⓐ. \(48\,\text{W}\)
ⓑ. \(300\,\text{W}\)
ⓒ. \(120\,\text{W}\)
ⓓ. \(600\,\text{W}\)
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