Respuesta :
[tex]E = \frac{hc}{wavelength}
[/tex]
given E = 9.4145E-25
h = 6.626E-34
c = 2.998E8
sub values into the equation above, and solve for wavelength.
You will get 0.211m
given E = 9.4145E-25
h = 6.626E-34
c = 2.998E8
sub values into the equation above, and solve for wavelength.
You will get 0.211m
Answer:
The wavelength of the radiation emitted as a result of this transition is 211 mm.
Explanation:
Energy loose by the atom = [tex]E=9.4145\times 10^{-25} Joules[/tex]
Relationship between wavelength and energy is given by photoelectric equation:
[tex]E=\frac{hc}{\lambda }[/tex]
[tex]\lambda [/tex] = wavelength of the radiation
h = Planck's constant
c = speed of light
[tex]\lambda =\frac{hc}{E}=\frac{6.626 x 10-34 Joule seconds\times 2.998\times 10^8 m/s}{9.4145\times 10^{-25} Joules}=0.211=211 mm[/tex]
The wavelength of the radiation emitted as a result of this transition is 211 mm.
