The work function for caesium atom is 1.9 eV. Calculate (a) the threshold wavelength and (b) the threshold frequency of the radiation. If the caesium element is irradiated with a wavelength 500 nm, calculate the kinetic energy and the velocity of the ejected photoelectron.

Given:

Work Function for Caesium, W = 1.9 eV


To find threshold frequency:


W = hvo


Where


h = Planck’s constant


vo = threshold frequency


vo = h / w


vo = [1.9× 1.602× 10-19] / [6.626× 10-34]


= [3.0438× 10-19] / [6.626× 10-34]


= 4.5937× 1014 Hz


Therefore, the frequency is 4.59× 1014 Hz


To find wavelength:


Speed of Light = [Frequency] × [Wavelength]


We know speed of light = 3×108 m/s


Wavelength, λ = [3×108] / [4.5937× 1014]


= 6.5306× 10-7 m


Therefore, the wavelength is 6.53× 10-7 m


Finding Kinetic Energy:


K.E of ejected electron = h[v-vo] = hc[1/λ – 1/λ o]


= [6.626× 3× 10-26] [1/500× 10-9 – 1/654× 10-9]


= [6.626× 3× 10-26] × {109 × [154/327000]}


= [6.626× 3× 10-26] × [468747.1289]


= 9.3177× 10-20J


Finding Velocity of photoelectron:


We know the formula for kinetic energy which is given as follows:


1/2 mv2 = kinetic Energy


Where


m = mass of electron


v = velocity of electron


v2 = [2× 9.3177× 10-20] / [9.1× 10-31]


= [1.8654× 10–19] / [9.1× 10-31]


v2 = 2.0478× 1011


Therefore v = √ [2.0478× 1011]


v = 4.525× 105 m/s


Therefore, the velocity of photoelectron is 4.525× 105 m/s


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