283330 In Young's double slit experiment, the intensity of light at a point on the screen where the path difference is \(\lambda=I\). The intensity of light at a point where the path difference becomes \(\lambda / 3\) is

283331 In Young's double slit experiment, the two slits are illuminated by a light beam consisting of wavelengths \(4200 \AA\) and \(5040 \AA\). If the distance between the slits is \(2.4 \mathrm{~mm}\) and the distance between the slits and the screen is \(\mathbf{2 0 0}\) \(\mathrm{cm}\), the minimum distance from the central bright fringe to the point where the bright fringes due to both the wavelengths coincide is

283332 A Young's double slit experimental setup is immersed in water of refractive index 1.33. It has slit separation \(1 \mathrm{~mm}\) and the distance between slits and screen is \(1.33 \mathrm{~m}\). If the wavelength of incident light on slits is \(6300 \AA\), then the fringe width on the screen is

283333 In Young's double slit experiment, light of wavelength \(5900 \AA\) is used. When the slits are 2 \(\mathrm{mm}\) apart, the fringe width is \(1.2 \mathrm{~mm}\). If the slit separation is increased to one and half times the previous value, then the fringe width will be

283334 In Young's double slit experiment, the two slits are separated by \(0.5 \mathrm{~cm}\) and the screen is at \(0.5 \mathrm{~m}\) form the slits. If 20000 bright fringes are counted per meter on the screen, then the wavelength of light used is

283330 In Young's double slit experiment, the intensity of light at a point on the screen where the path difference is \(\lambda=I\). The intensity of light at a point where the path difference becomes \(\lambda / 3\) is

283331 In Young's double slit experiment, the two slits are illuminated by a light beam consisting of wavelengths \(4200 \AA\) and \(5040 \AA\). If the distance between the slits is \(2.4 \mathrm{~mm}\) and the distance between the slits and the screen is \(\mathbf{2 0 0}\) \(\mathrm{cm}\), the minimum distance from the central bright fringe to the point where the bright fringes due to both the wavelengths coincide is

283332 A Young's double slit experimental setup is immersed in water of refractive index 1.33. It has slit separation \(1 \mathrm{~mm}\) and the distance between slits and screen is \(1.33 \mathrm{~m}\). If the wavelength of incident light on slits is \(6300 \AA\), then the fringe width on the screen is

283333 In Young's double slit experiment, light of wavelength \(5900 \AA\) is used. When the slits are 2 \(\mathrm{mm}\) apart, the fringe width is \(1.2 \mathrm{~mm}\). If the slit separation is increased to one and half times the previous value, then the fringe width will be

283334 In Young's double slit experiment, the two slits are separated by \(0.5 \mathrm{~cm}\) and the screen is at \(0.5 \mathrm{~m}\) form the slits. If 20000 bright fringes are counted per meter on the screen, then the wavelength of light used is

283330 In Young's double slit experiment, the intensity of light at a point on the screen where the path difference is \(\lambda=I\). The intensity of light at a point where the path difference becomes \(\lambda / 3\) is

283331 In Young's double slit experiment, the two slits are illuminated by a light beam consisting of wavelengths \(4200 \AA\) and \(5040 \AA\). If the distance between the slits is \(2.4 \mathrm{~mm}\) and the distance between the slits and the screen is \(\mathbf{2 0 0}\) \(\mathrm{cm}\), the minimum distance from the central bright fringe to the point where the bright fringes due to both the wavelengths coincide is

283332 A Young's double slit experimental setup is immersed in water of refractive index 1.33. It has slit separation \(1 \mathrm{~mm}\) and the distance between slits and screen is \(1.33 \mathrm{~m}\). If the wavelength of incident light on slits is \(6300 \AA\), then the fringe width on the screen is

283333 In Young's double slit experiment, light of wavelength \(5900 \AA\) is used. When the slits are 2 \(\mathrm{mm}\) apart, the fringe width is \(1.2 \mathrm{~mm}\). If the slit separation is increased to one and half times the previous value, then the fringe width will be

283334 In Young's double slit experiment, the two slits are separated by \(0.5 \mathrm{~cm}\) and the screen is at \(0.5 \mathrm{~m}\) form the slits. If 20000 bright fringes are counted per meter on the screen, then the wavelength of light used is

283330 In Young's double slit experiment, the intensity of light at a point on the screen where the path difference is \(\lambda=I\). The intensity of light at a point where the path difference becomes \(\lambda / 3\) is

283331 In Young's double slit experiment, the two slits are illuminated by a light beam consisting of wavelengths \(4200 \AA\) and \(5040 \AA\). If the distance between the slits is \(2.4 \mathrm{~mm}\) and the distance between the slits and the screen is \(\mathbf{2 0 0}\) \(\mathrm{cm}\), the minimum distance from the central bright fringe to the point where the bright fringes due to both the wavelengths coincide is

283332 A Young's double slit experimental setup is immersed in water of refractive index 1.33. It has slit separation \(1 \mathrm{~mm}\) and the distance between slits and screen is \(1.33 \mathrm{~m}\). If the wavelength of incident light on slits is \(6300 \AA\), then the fringe width on the screen is

283333 In Young's double slit experiment, light of wavelength \(5900 \AA\) is used. When the slits are 2 \(\mathrm{mm}\) apart, the fringe width is \(1.2 \mathrm{~mm}\). If the slit separation is increased to one and half times the previous value, then the fringe width will be

283334 In Young's double slit experiment, the two slits are separated by \(0.5 \mathrm{~cm}\) and the screen is at \(0.5 \mathrm{~m}\) form the slits. If 20000 bright fringes are counted per meter on the screen, then the wavelength of light used is

283330 In Young's double slit experiment, the intensity of light at a point on the screen where the path difference is \(\lambda=I\). The intensity of light at a point where the path difference becomes \(\lambda / 3\) is

283331 In Young's double slit experiment, the two slits are illuminated by a light beam consisting of wavelengths \(4200 \AA\) and \(5040 \AA\). If the distance between the slits is \(2.4 \mathrm{~mm}\) and the distance between the slits and the screen is \(\mathbf{2 0 0}\) \(\mathrm{cm}\), the minimum distance from the central bright fringe to the point where the bright fringes due to both the wavelengths coincide is

283332 A Young's double slit experimental setup is immersed in water of refractive index 1.33. It has slit separation \(1 \mathrm{~mm}\) and the distance between slits and screen is \(1.33 \mathrm{~m}\). If the wavelength of incident light on slits is \(6300 \AA\), then the fringe width on the screen is

283333 In Young's double slit experiment, light of wavelength \(5900 \AA\) is used. When the slits are 2 \(\mathrm{mm}\) apart, the fringe width is \(1.2 \mathrm{~mm}\). If the slit separation is increased to one and half times the previous value, then the fringe width will be

283334 In Young's double slit experiment, the two slits are separated by \(0.5 \mathrm{~cm}\) and the screen is at \(0.5 \mathrm{~m}\) form the slits. If 20000 bright fringes are counted per meter on the screen, then the wavelength of light used is