Question

A laser used to read CDs emits red light of wavelength 700 nanometers. How many photons does it emit each second if its power is 0.1 w.

Answer 1

We have to use the following formula to calculate the energy of one photon.
E = h$v$
Here E = Energy of one photon
h = Planck’s constant
$v$ = frequency of the photon.

Complete answer:
- In the question it is asked to calculate how many photons are going to be released per second if the emitted light has a wavelength of 700 nm if the power is 0.1 w.
- The formula used to calculate the energy of the photon is as follows.

& E\text{ }=\text{ }h~v \\\ & E=h\times \dfrac{c}{\lambda } \\\ \end{aligned}$$ Here E = Energy of one photon h = Planck’s constant = $6.6023\times {{10}^{-34}}J/\sec $ c = velocity of the photon $3\times {{10}^{8}}m/s$ $\lambda $ = wavelength of the light = 72 nm = $700\times {{10}^{-9}}m$ \- By substituting all the known values in the above to get the energy of the photon whose wavelength is 720 nm. $$\begin{aligned} & E=h\times \dfrac{c}{\lambda } \\\ & E=\dfrac{6.6023\times {{10}^{-34}}\times 3.0\times {{10}^{8}}}{700\times {{10}^{-9}}} \\\ & E=2.81\times {{10}^{-19}}J \\\ \end{aligned}$$ \- We know that 1 watt is nothing but 1 joule of work is done. \- That means 0.1 joule of work is done in one second. \- So $2.81\times {{10}^{-19}}J$ work done by one photon. \- Therefore one joule is going to produce $\dfrac{1}{2.81\times {{10}^{-19}}J}$ photons. \- Then we have to calculate 0.1 joule is going to be produced by how many photons. $$\dfrac{1}{2.81\times {{10}^{-19}}J}\times 0.1=3.5\times {{10}^{17}}photons$$ \- Means $3.5\times {{10}^{17}}photons$ are going to release in one second. **Note:** First we have to calculate the energy of the photons which are going to release from 720 nm of wavelength. Later we have to convert the energy into a number of protons with a power of 0.1 watt.