# Introduction to semiconductors  (Page 2/2)

Firstly, unlike the case for free electrons, in a periodic solid, electrons are not free to take on any energy value they wish.They are forced into specific energy levels called allowed states, which are represented by the cups in [link] . The allowed states are not distributed uniformly in energy either. They are grouped into specific configurationscalled energy bands. There are no allowed levels at zero energy and for some distance above that. Moving up fromzero energy, we then encounter the first energy band. At thebottom of the band there are very few allowed states, but as we move up in energy, the number of allowed states first increases,and then falls off again. We then come to a region with no allowed states, called an energy band gap. Above the band gap,another band of allowed states exists. This goes on and on, with any given material having many such bands and band gaps.This situation is shown schematically in [link] , where the small cups represent allowed energy levels, and the vertical axis represents electron energy.

It turns out that each band has exactly 2 N allowed states in it, where N is the total number of atoms in the particular crystal sample we are talking about. (Since there are 10 cups in eachband in the figure, it must represent a crystal with just 5 atoms in it. Not a very big crystal at all!) Into these bandswe must now distribute all of the valence electrons associated with the atoms, with the restriction that we can onlyput one electron into each allowed state. This is the result of something called the Pauli exclusionprinciple. Since in the case of silicon there are 4 valence electrons per atom, we would justfill up the first two bands, and the next would be empty. If we make the logical assumption that the electrons will fill inthe levels with the lowest energy first, and only go into higher lying levels if the ones below are already filled. Thissituation is shown in [link] , in which we have represented electrons as small black balls with a "-" sign on them. Indeed, the first two bands are completelyfull, and the next is empty. What will happen if we apply an electric field to the sample of silicon? Remember the diagramwe have at hand right now is an energy based one, we are showing how the electrons are distributed inenergy, not how they are arranged spatially. On this diagram we can not show how they will move about, but only how they willchange their energy as a result of the applied field. The electric field will exert a force on the electrons and attemptto accelerate them. If the electrons are accelerated, then they must increase their kinetic energy. Unfortunately, there are noempty allowed states in either of the filled bands. An electron would have to jump all the way up into the next (empty) band inorder to take on more energy. In silicon, the gap between the top of the highest most occupied band and the lowest unoccupiedband is 1.1 eV. (One eV is the potential energy gained by an electron movingacross an electrical potential of one volt.) The mean free path or distanceover which an electron would normally move before it suffers a collision is only a few hundred angstroms ( ca . 300 x 10 -8 cm) and so you would need a very large electric field (several hundred thousand V/cm) in order for the electron to pick up enough energy to"jump the gap". This makes it appear that silicon would be a very bad conductor of electricity, and in fact, very puresilicon is very poor electrical conductor.

A metal is an element with an odd number ofvalence electrons so that a metal ends up with an upper band which is just half full of electrons. This is illustrated in [link] . Here we see that one band is full, and the next is just half full. This would be the situation for theGroup 13(III) element aluminum for instance. If we apply an electric field to these carriers, those near the top of thedistribution can indeed move into higher energy levels by acquiring some kinetic energy of motion, and easily move fromone place to the next. In reality, the whole situation is a bit more complex than we have shown here, but this is not too farfrom how it actually works.

So, back to our silicon sample. If there are no places for electrons to "move" into, then how does silicon work as a"semiconductor"? Well, in the first place, it turns out that not all of the electrons are in the bottom two bands. Insilicon, unlike say quartz or diamond, the band gap between the top-most full band, the next empty one is not so large. As wementioned above it is only about 1.1 eV. So long as the silicon is not at absolute zero temperature, some electrons near the topof the full band can acquire enough thermal energy that they can "hop" the gap, and end up in the upper band, called theconduction band. This situation is shown in [link] .

In silicon at room temperature, roughly 10 10 electrons per cubic centimeter are thermally excited across the band-gap at any one time. It should be noted thatthe excitation process is a continuous one. Electrons are being excited across the band, but then they fall back down into emptyspots in the lower band. On average however, the 10 10 in each cm 3 of silicon is what you will find at any given instant. Now 10 billion electrons per cubic centimeterseems like a lot of electrons, but lets do a simple calculation. The mobility of electrons in silicon isabout 1000 cm 2 /V.s. Remember, mobility times electric field yields the average velocity of the carriers. Electric field has units of V/cm, so with these units we get velocity in cm/s as we should. The charge on an electron is 1.6 x 10 -19 coulombs. Thus from [link] :

If we have a sample of silicon 1 cm long by (1 mm x 1mm) square, it would have a resistance, [link] , which does not make it much of a "conductor". In fact, if this were all there was to the silicon story, we could pack up andmove on, because at any reasonable temperature, silicon would conduct electricity very poorly.

do you think it's worthwhile in the long term to study the effects and possibilities of nanotechnology on viral treatment?
absolutely yes
Daniel
how to know photocatalytic properties of tio2 nanoparticles...what to do now
it is a goid question and i want to know the answer as well
Maciej
Abigail
Do somebody tell me a best nano engineering book for beginners?
what is fullerene does it is used to make bukky balls
are you nano engineer ?
s.
fullerene is a bucky ball aka Carbon 60 molecule. It was name by the architect Fuller. He design the geodesic dome. it resembles a soccer ball.
Tarell
what is the actual application of fullerenes nowadays?
Damian
That is a great question Damian. best way to answer that question is to Google it. there are hundreds of applications for buck minister fullerenes, from medical to aerospace. you can also find plenty of research papers that will give you great detail on the potential applications of fullerenes.
Tarell
what is the Synthesis, properties,and applications of carbon nano chemistry
Mostly, they use nano carbon for electronics and for materials to be strengthened.
Virgil
is Bucky paper clear?
CYNTHIA
so some one know about replacing silicon atom with phosphorous in semiconductors device?
Yeah, it is a pain to say the least. You basically have to heat the substarte up to around 1000 degrees celcius then pass phosphene gas over top of it, which is explosive and toxic by the way, under very low pressure.
Harper
Do you know which machine is used to that process?
s.
how to fabricate graphene ink ?
for screen printed electrodes ?
SUYASH
What is lattice structure?
of graphene you mean?
Ebrahim
or in general
Ebrahim
in general
s.
Graphene has a hexagonal structure
tahir
On having this app for quite a bit time, Haven't realised there's a chat room in it.
Cied
what is biological synthesis of nanoparticles
what's the easiest and fastest way to the synthesize AgNP?
China
Cied
types of nano material
I start with an easy one. carbon nanotubes woven into a long filament like a string
Porter
many many of nanotubes
Porter
what is the k.e before it land
Yasmin
what is the function of carbon nanotubes?
Cesar
I'm interested in nanotube
Uday
what is nanomaterials​ and their applications of sensors.
what is nano technology
what is system testing?
preparation of nanomaterial
Yes, Nanotechnology has a very fast field of applications and their is always something new to do with it...
what is system testing
what is the application of nanotechnology?
Stotaw
In this morden time nanotechnology used in many field . 1-Electronics-manufacturad IC ,RAM,MRAM,solar panel etc 2-Helth and Medical-Nanomedicine,Drug Dilivery for cancer treatment etc 3- Atomobile -MEMS, Coating on car etc. and may other field for details you can check at Google
Azam
anybody can imagine what will be happen after 100 years from now in nano tech world
Prasenjit
after 100 year this will be not nanotechnology maybe this technology name will be change . maybe aftet 100 year . we work on electron lable practically about its properties and behaviour by the different instruments
Azam
name doesn't matter , whatever it will be change... I'm taking about effect on circumstances of the microscopic world
Prasenjit
how hard could it be to apply nanotechnology against viral infections such HIV or Ebola?
Damian
silver nanoparticles could handle the job?
Damian
not now but maybe in future only AgNP maybe any other nanomaterials
Azam
Hello
Uday
I'm interested in Nanotube
Uday
this technology will not going on for the long time , so I'm thinking about femtotechnology 10^-15
Prasenjit
how did you get the value of 2000N.What calculations are needed to arrive at it
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