Wave Optics MCQs With Answers – Part 2 (Class 12 Physics)
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Wave Optics MCQs with Answers – Part 2 (Class 12 Physics)

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111. The superposition principle for light waves states that when two waves overlap at a point, the resultant disturbance is
ⓐ. always the larger disturbance alone
ⓑ. always zero at the overlap point
ⓒ. the vector sum of individual disturbances
ⓓ. independent of phase at the overlap point
112. Two light waves reach the same point with equal amplitudes and the same phase. The resultant amplitude at that point is
ⓐ. half of one amplitude
ⓑ. twice one amplitude
ⓒ. zero
ⓓ. equal to one amplitude
113. Two equal-amplitude light waves arrive at a point exactly out of phase. The resultant disturbance is zero at that point because
ⓐ. the waves have different frequencies
ⓑ. the two waves arrive with the same displacement sign
ⓒ. light-wave amplitudes cannot be added
ⓓ. equal opposite displacements cancel
114. A record of overlapping waves is shown below.
RowCondition at a pointResult by superposition
PEqual amplitudes, same phaseResultant amplitude \(2a\)
QEqual amplitudes, opposite phaseResultant amplitude \(0\)
RUnequal amplitudes, opposite phaseResultant amplitude equals difference of amplitudes
SSame phaseResultant amplitude is always zero
The row that needs correction is
ⓐ. Row S
ⓑ. Row P
ⓒ. Row R
ⓓ. Row Q
115. Two coherent light waves have displacements \(y_1=3a\) and \(y_2=2a\) at the same point and same instant. If the displacements are along the same direction, the resultant displacement is
ⓐ. \(6a\)
ⓑ. \(5a\)
ⓒ. \(a\)
ⓓ. \(2a\)
116. Two overlapping waves at a point have displacements \(4a\) and \(-a\) at the same instant. The resultant displacement is
ⓐ. \(5a\)
ⓑ. \(4a\)
ⓒ. \(3a\)
ⓓ. \(-5a\)
117. Intensity in wave optics is connected more directly with
ⓐ. the resultant amplitude squared
ⓑ. the square of path difference only
ⓒ. the reciprocal of wave frequency
ⓓ. the sum of the two wavelengths
118. A graph description is given below.
At a fixed point, the resultant amplitude \(A\) of two equal light waves is varied by changing their relative phase. The vertical axis represents intensity \(I\), and the horizontal axis represents resultant amplitude \(A\).
The graph should show that
ⓐ. \(I\propto A^2\)
ⓑ. \(I\propto A\)
ⓒ. \(I\) is independent of \(A\)
ⓓ. \(I\propto \frac{1}{A}\)
119. Consider the following statements about superposition of light waves. Statement I: The waves must be considered at the same point and the same instant. Statement II: Resultant displacement is found before resultant intensity is inferred. Statement III: Two waves always produce a brighter region wherever they overlap.
ⓐ. I, II and III
ⓑ. I and II only
ⓒ. II and III only
ⓓ. I and III only
120. A claim says, “If two light waves overlap, energy is created at bright regions and destroyed at dark regions.” The better interpretation is that
ⓐ. energy is destroyed wherever amplitudes cancel
ⓑ. energy is created only at the central bright region
ⓒ. superposition violates conservation of energy
ⓓ. energy is redistributed in the interference pattern
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