The wavelengths of incident light are

$$\begin{gathered} {\lambda }_1=500 nm \\ {\lambda }_2=600 nm \end{gathered}$$

The angular distance $\mathit{\theta }$  of the ${\mathit{m}}_{\mathbf{t}\mathbf{h}}$  order diffraction pattern produced from a grating having line separation  $\mathit{d}$ is

 $\mathit{d}\mathit{s}\mathit{i}\mathit{n}\mathit{\theta }\mathbf{=}\mathit{m}\mathit{\lambda }$              .....(1)

Here, $\mathit{\lambda }$ is the wavelength of the incident light.

The angular distance $\mathit{\theta }$  of the the first order interference minima for slit width $\mathit{a}$  is

   $\mathit{a}\mathit{s}\mathit{i}\mathit{n}\mathit{\theta }\mathbf{=}\mathit{\lambda }$ .....(2)

For maximum dispersion the second maxima of  ${\lambda }_2$ should be at ${30}^{°}$ . Thus from equation (1)

 $$\begin{gathered} d\sin 30°=2\times 600 nm \\ d=\frac{2\times 600 nm}{\sin {30}^{°}} \\ =2400nm \\ =2.4\times {10}^{-6} m \end{gathered}$$

Thus, the slit separation is$2.4\times {10}^{-6} m$  .

The third order for ${\lambda }_2$  is a missing order. This is because it coincides with the first interference minima. Thus from equations (1) and (2)

  $$\begin{gathered} \frac{3{\lambda }_2}{d}=\frac{{\lambda }_2}{a} \\ a=\frac{d}{3} \\ =\frac{2.4\times {10}^{-6}m}{3} \\ =8\times {10}^{-7}m \end{gathered}$$

The slit width is $8\times {10}^{-7}m$$8\times {10}^{-7 }m$  .

For the largest diffraction order $\sin \theta =1$. Hence from equation (I)

 $$\begin{gathered} d=m_{max}{\lambda }_2 \\ {m}_{max}=\frac{d}{\lambda } \\ =\frac{2.4\times {10}^{-6}m}{600\times {10}^{-9}m} \\ =4 \end{gathered}$$

Thus, the maximum order of diffraction is $4$  .