MHT CET · Physics · Wave Optics
In a biprism experiment, monochromatic light of wavelength ' \(\lambda\) ' is used. The distance between two coherent sources ' \(\mathrm{d}\) ' is kept constant. If the distance between slit and eyepiece ' \(D\) ' is varied as \(D_1, D_2, D_3 \& D_4\) and corresponding measured fringe widths are \(Z_1, Z_2, Z_3\) and \(Z_4\) then
- A \(\mathrm{Z}_1 \mathrm{D}_1=\mathrm{Z}_2 \mathrm{D}_2=\mathrm{Z}_3 \mathrm{D}_3=\mathrm{Z}_4 \mathrm{D}_4\)
- B \(\frac{Z_1}{D_1}=\frac{Z_2}{D_2}=\frac{Z_3}{D_3}=\frac{Z_4}{D_4}\)
- C \(\mathrm{D}_1 \sqrt{\mathrm{Z}_1}=\mathrm{D}_2 \sqrt{\mathrm{Z}_2}=\mathrm{D}_3 \sqrt{\mathrm{Z}_3}=\mathrm{D}_4 \sqrt{\mathrm{Z}_4}\)
- D \(Z_1 \sqrt{D_1}=Z_2 \sqrt{D_2}=Z_3 \sqrt{D_3}=Z_4 \sqrt{D_4}\)
Answer & Solution
Correct Answer
(B) \(\frac{Z_1}{D_1}=\frac{Z_2}{D_2}=\frac{Z_3}{D_3}=\frac{Z_4}{D_4}\)
Step-by-step Solution
Detailed explanation
Fringe width \(Z=\frac{\lambda D}{d}\)
\(\therefore \frac{Z}{D}=\frac{\lambda}{d}=\) constant, as \(\lambda\) and \(d\) are constant
\(
\therefore \frac{Z_1}{D_1}=\frac{Z_2}{D_2}=\frac{Z_3}{D_3}=\frac{Z_4}{D_4}
\)
\(\therefore \frac{Z}{D}=\frac{\lambda}{d}=\) constant, as \(\lambda\) and \(d\) are constant
\(
\therefore \frac{Z_1}{D_1}=\frac{Z_2}{D_2}=\frac{Z_3}{D_3}=\frac{Z_4}{D_4}
\)
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