Answer:
1.64 x 10⁻¹⁹ per sec
Explanation:
P = Power of the bulb = 80 W
t = time
λ = wavelength of the light = 510 nm = 510 x 10⁻⁹ m
c = speed of light = 3 x 10⁸ m/s
n = number of photons
E = energy produced by the bulb as light
Energy produced by the bulb as light is given as
E = (0.08) Pt
[tex]\frac{nhc}{\lambda } = (0.08) Pt[/tex]
[tex]\left ( \frac{n}{t} \right ) \frac{hc}{\lambda } = (0.08) P[/tex]
[tex]\left ( \frac{n}{t} \right ) \frac{(6.63\times 10^{-34})(3\times 10^{8})}{510\times 10^{-9} } = (0.08) (80)[/tex]
[tex]\frac{n}{t}[/tex] = 1.64 x 10⁻¹⁹ per sec
Answer:
there are 1.64×10¹⁹ photons being emitted every second.
Explanation:
The 80W light bulb gives off 80 Joules a second. 8% of 80 J = 6.4 Joules.
So every second 6.4 joules of light energy is given off.
h = 6.626068*10^-34
.....................(planck's constant )
c = 2.99792458*10^8....................(the speed of light)
L=510nm= 5.1*10^-7 metres.
............(wavelength)
Now calculate the energy of a single photon with wave length 5.1*10^-7 metres.
E = hc / L
E = (6.626068*10^-34)*(2.99792458*10^8) / (5.1*10^-7)
E = 3.8949906*10^-19 J
So each photon has 3.8949906*10^-19 J of energy
.
As total energy is 6.4 J.
So the number of photons is =6.4 / (3.8949906*10^-19) = 1.64×10¹⁹
So there are 1.64×10¹⁹ photons being emitted every second.
