1 Answer

P Fuster · Answer 1 · 2021-10-28T05:39:30+0000

Step-by-step explanation:

It is known that formula for momentum per photon is as follows.

p =
$(h)/(\lambda)$

where,
$\lambda$ is the photon's wavelength.

Putting the given values into the above formula as follows.

p =
$6.626 * 10^(-34) Joule seconds}{600 * 10^(-9)}m$

=
1.10 * 10^(-27) kg ms^(-1)

Therefore, the value of linear momentum is
.

Now, energy per photon is calculated as follows.

E =
$(hc)/(\lambda)$

where, h = Planck's constant (
6.626 * 10^(-34) Joule seconds),

c = the velocity of light (
3 * 10^(8) m/s).

Hence, calculate the energy as follows.

E =
$(hc)/(\lambda)$

=
$6.626 * 10^(-34) Joule seconds * 3 * 10^(8) m/s}{600 * 10^(-9) m$

=
3.3 * 10^(-19) J

Hence, the value of energy per photon is
3.3 * 10^(-19) J.

Now, we will calculate the energy per mole of photons as follows.

E =
$(Nhc)/(\lambda)$

where, E = the energy in a mole of photons,

N = Avogadro's number (
6.02 * 10^(23) photons per mole),

h = Planck's constant (
6.626 * 10^(-34) Joule seconds),

c = the velocity of light (
3 * 10^(8) m/s)

Putting these given values into the above formula and calculate the energy per mole of photons as follows.

E =
$(Nhc)/(\lambda)$

=
(6.02 * 10^(23) * 6.626 * 10^(-34) * 3 * 10^(8))/(600 * 10^(-9))

= 199 kJ/mol

Therefore, energy per mole of photons for radiation of wavelength for 600 nm (red) is 199 kJ/mol.

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