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Chapter 12: Problem 94

Indicate whether this statement is true or false: If you want a semiconductor that emits blue light, you could either use a material that has a band gap corresponding to the energy of a blue photon or you could use a material that has a smaller band gap but make an appropriately sized nanoparticle of the same material.

Short Answer

Expert verified
The statement is true. To have a semiconductor emit blue light, one can either use a material with a band gap corresponding to the energy of a blue photon (approximately 2.5-2.8 eV) or use a material with a smaller band gap and form a nanoparticle of appropriate size. The quantum confinement effect in nanoparticles can increase the band gap, potentially enabling blue light emission.

Step by step solution

01

Understand the band gap in semiconductors and its relation to light emission

A semiconductor is a material with a band gap between the valence and conduction bands. The band gap represents the energy difference between the highest energy level of electrons in the valence band and the lowest energy level of the conduction band. When a photon (light) is absorbed, an electron gets excited from the valence band to the conduction band, which leaves a hole in the valence band. When an electron in the conduction band recombines with the hole in the valence band, energy in the form of light is emitted. This emitted light's energy corresponds to the band gap energy, which determines the color of the emitted light.
02

Determine the band gap energy for blue light

To emit blue light, the energy of the band gap should be equal to the energy of a blue photon. The wavelength of blue light is approximately in the range of 450-490 nm. We can calculate the energy of a blue photon using the following formula: \( E = \frac{hc}{\lambda} \), where \(h\) is Planck's constant (\(6.626 \times 10^{-34} Js\)), \(c\) is the speed of light (\(3 \times 10^8 m/s\)), and \(\lambda\) is the wavelength of the light. For blue light, the band gap energy should be approximately 2.5-2.8 eV.
03

Understand the effect of using nanoparticles and how it changes the band gap

When the size of a material is reduced to the nanoscale, its properties change due to quantum confinement effects. In the case of semiconductors, as the size decreases to dimensions smaller than the Exciton Bohr radius, the energy levels become discrete, and the band gap increases. This means that by using a smaller nanoparticle, it is possible to adjust the band gap to a higher energy, which might correspond to the energy of a blue photon, even if the bulk material has a smaller band gap.
04

Conclusion

It is true that to achieve a semiconductor emitting blue light, one can either use a material with a band gap corresponding to the energy of a blue photon or use a material with a smaller band gap and create an appropriately sized nanoparticle from it. The nanoparticle's quantum confinement effect will increase its band gap, potentially allowing it to emit blue light.

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