MHT CET · Physics · Wave Optics
distance between slit and eyepiece. When the distance between two virtual
sources is changed from \(\mathrm{d}_{\mathrm{A}}\) to \(\mathrm{d}_{\mathrm{B}}\), then the fringe width is changed from \(\mathrm{Z}_{\mathrm{A}}\) to
\(\mathrm{Z}_{\mathrm{B}}\). The ratio \(\mathrm{Z}_{\mathrm{A}}\) to \(\mathrm{Z}_{\mathrm{B}}\) is
- A \(\left(\frac{\mathrm{d}_{\mathrm{A}}}{\mathrm{d}_{\mathrm{B}}}\right)^{2}\)
- B \(\left(\frac{\mathrm{d}_{\mathrm{A}}}{\mathrm{d}_{\mathrm{B}}}\right)\)
- C \(\left(\frac{\mathrm{d}_{\mathrm{B}}}{\mathrm{d}_{\mathrm{A}}}\right)\)
- D \(\sqrt{\frac{\mathrm{d}_{\mathrm{B}}}{\mathrm{d}_{\mathrm{A}}}}\)
Answer & Solution
Correct Answer
(C) \(\left(\frac{\mathrm{d}_{\mathrm{B}}}{\mathrm{d}_{\mathrm{A}}}\right)\)
Step-by-step Solution
Detailed explanation
Fringe width is given by \(z=\frac{\lambda D}{d}\)
\(\therefore \frac{\mathrm{z}_{\mathrm{A}}}{\mathrm{Z}_{\mathrm{B}}}=\frac{\mathrm{d}_{\mathrm{B}}}{\mathrm{d}_{\mathrm{A}}}\)
\(\therefore \frac{\mathrm{z}_{\mathrm{A}}}{\mathrm{Z}_{\mathrm{B}}}=\frac{\mathrm{d}_{\mathrm{B}}}{\mathrm{d}_{\mathrm{A}}}\)
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