A sensor is exposed for time t to a lamp of power P placed at a distance l. The sensor has an opening that is 4d in diameter. Assuming all energy of the lamp is given off as light, the number of photons entering the sensor if the wavelength of light is `lamda` isA. `N=(Plamdad^2t)/(hcl^2)`B. `N=(4lamdad^2t)/(hcl^2)`C. `N=(Plamdad^2t)/(4hcl^2)`D. `N=(Plamdad^2t)/(16hcl^2)`

A sensor is exposed for time t to a lamp of power P placed at a distan

1.	A sensor is exposed for time t to a lamp of power P placed at a distance l. The sensor has an opening that is 4d in diameter. Assuming all energy of the lamp is given off as light, the number of photons entering the sensor if the wavelength of light is `lamda` isA. `N=(Plamdad^2t)/(hcl^2)`B. `N=(4lamdad^2t)/(hcl^2)`C. `N=(Plamdad^2t)/(4hcl^2)`D. `N=(Plamdad^2t)/(16hcl^2)`
Answer» Correct Answer - A `E=(hc)/(lamda)` Number of photons emitted is `(Pt)/(((hc)/(lamda)))=n_0` `n_0(Plamdat)/(hc)` Since the radiation is spherically symmetric, so total number of photons entering the sensor is `n_0` times the ratio of aperture area to the area of a sphere of radius l. `N=n_0(pi(2d)^2)/(4pil^2)=(Plamdat)/(hc)(d^2)/(l^2)`

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