91Ó°ÊÓ

The alternating bright and the dark band formed due to interferenceis called fringe. When two light waves superimpose it forms constructive interference and destructive interference. The bright band is due to constructive interference and the dark band is due to destructive interference.

From the graph when $n=1$ intensity is maximum and at $n=1.4$ the intensity is minimum.

Therefore difference in the index of refraction for successive maximum intensity and minimum intensity is $\mathrm{Δ}n=0.4$

So the next maximum intensity at $n=1.4+0.4=1.8$

Therefore, the next maxima are 1.8.

Next minimum will occur at

$n=1.8+0.4=2.2$

Here,$n_1=n=2$ and $n_2=1$

$\begin{array}{rcl}\mathrm{Δ}n& =& n_1-n_2\\ & =& 2-1\\ & =& 1\end{array}$

But $\mathrm{Δ}n=0.4$ gives minimum interference $\mathrm{Δ}n=0.4$

Corresponds to a phase difference of $\frac{\mathrm{λ}}{2}$

Therefore $\mathrm{Δ}n=1$

When $n=2$

Here,

$\begin{array}{rcl}\mathrm{Δ}n& =& 2-1\\ & =& 1\end{array}$

$\begin{array}{rcl}\text{phase} \text{difference}& =& \frac{\left(\frac{\mathrm{λ}}{2}\right)}{4}\\ & =& \frac{\mathrm{λ}}{0.8}\\ & =& 1.25\mathrm{λ}\end{array}$

At point p when $n=2$ the phase difference between the two rays will $1.25\mathrm{λ}$

Therefore, the phase difference between the two raysis $1.25\mathrm{λ}$