283441 In a double slit experiment, the two slits are 1 \(\mathrm{mm}\) apart and the screen is placed \(1 \mathrm{~m}\) away, \(A\) monochromatic light of wavelength \(500 \mathrm{~nm}\) is used. What will be the width of each slit for obtaining ten maxima of double slit within the central maxima of single slit pattern?

283442 Two slits in Young's experiment have widths in the ratio \(1: 25\). The ratio of intensity at the maxima and minima in the interference pattern \(\frac{I_{\max }}{I_{\min }}\) is

283443 In Young's double slit experiment, the slits are \(2 \mathrm{~mm}\), apart and are illuminated by photons of two wavelength \(\lambda_1=12000 \AA\) and \(\lambda_2=10000 \AA\). At what minimum distance from the common central bright fringe on the common central bright fringe on the screen \(2 \mathrm{~m}\) from the slit will a bright fringe from one interference pattern coincide with a bright fringe from the other?

283444 The intensity at the maximum in a Young's double slit experiment is \(I_0\). Distance between two slits is \(\mathrm{d}=\mathbf{5} \lambda\), where \(\lambda\) is the wavelength of light used in the experiment. What will be the intensity infront of one of the slits on the screen placed at a distance \(D=10 \mathrm{~d}\) ?

283441 In a double slit experiment, the two slits are 1 \(\mathrm{mm}\) apart and the screen is placed \(1 \mathrm{~m}\) away, \(A\) monochromatic light of wavelength \(500 \mathrm{~nm}\) is used. What will be the width of each slit for obtaining ten maxima of double slit within the central maxima of single slit pattern?

283442 Two slits in Young's experiment have widths in the ratio \(1: 25\). The ratio of intensity at the maxima and minima in the interference pattern \(\frac{I_{\max }}{I_{\min }}\) is

283443 In Young's double slit experiment, the slits are \(2 \mathrm{~mm}\), apart and are illuminated by photons of two wavelength \(\lambda_1=12000 \AA\) and \(\lambda_2=10000 \AA\). At what minimum distance from the common central bright fringe on the common central bright fringe on the screen \(2 \mathrm{~m}\) from the slit will a bright fringe from one interference pattern coincide with a bright fringe from the other?

283444 The intensity at the maximum in a Young's double slit experiment is \(I_0\). Distance between two slits is \(\mathrm{d}=\mathbf{5} \lambda\), where \(\lambda\) is the wavelength of light used in the experiment. What will be the intensity infront of one of the slits on the screen placed at a distance \(D=10 \mathrm{~d}\) ?

283441 In a double slit experiment, the two slits are 1 \(\mathrm{mm}\) apart and the screen is placed \(1 \mathrm{~m}\) away, \(A\) monochromatic light of wavelength \(500 \mathrm{~nm}\) is used. What will be the width of each slit for obtaining ten maxima of double slit within the central maxima of single slit pattern?

283442 Two slits in Young's experiment have widths in the ratio \(1: 25\). The ratio of intensity at the maxima and minima in the interference pattern \(\frac{I_{\max }}{I_{\min }}\) is

283443 In Young's double slit experiment, the slits are \(2 \mathrm{~mm}\), apart and are illuminated by photons of two wavelength \(\lambda_1=12000 \AA\) and \(\lambda_2=10000 \AA\). At what minimum distance from the common central bright fringe on the common central bright fringe on the screen \(2 \mathrm{~m}\) from the slit will a bright fringe from one interference pattern coincide with a bright fringe from the other?

283444 The intensity at the maximum in a Young's double slit experiment is \(I_0\). Distance between two slits is \(\mathrm{d}=\mathbf{5} \lambda\), where \(\lambda\) is the wavelength of light used in the experiment. What will be the intensity infront of one of the slits on the screen placed at a distance \(D=10 \mathrm{~d}\) ?

283441 In a double slit experiment, the two slits are 1 \(\mathrm{mm}\) apart and the screen is placed \(1 \mathrm{~m}\) away, \(A\) monochromatic light of wavelength \(500 \mathrm{~nm}\) is used. What will be the width of each slit for obtaining ten maxima of double slit within the central maxima of single slit pattern?

283442 Two slits in Young's experiment have widths in the ratio \(1: 25\). The ratio of intensity at the maxima and minima in the interference pattern \(\frac{I_{\max }}{I_{\min }}\) is

283443 In Young's double slit experiment, the slits are \(2 \mathrm{~mm}\), apart and are illuminated by photons of two wavelength \(\lambda_1=12000 \AA\) and \(\lambda_2=10000 \AA\). At what minimum distance from the common central bright fringe on the common central bright fringe on the screen \(2 \mathrm{~m}\) from the slit will a bright fringe from one interference pattern coincide with a bright fringe from the other?

283444 The intensity at the maximum in a Young's double slit experiment is \(I_0\). Distance between two slits is \(\mathrm{d}=\mathbf{5} \lambda\), where \(\lambda\) is the wavelength of light used in the experiment. What will be the intensity infront of one of the slits on the screen placed at a distance \(D=10 \mathrm{~d}\) ?