I read that because of the class A amplifier nonlinearities, it is necessary to connect a parallel LC circuit with resonant frequency equal to the operating frequency to suppress any possible harmonic components.
Could someone explain please how it supresses harmonic components?
Without seeing more of the circuit, the parallel LC works by presenting a relatively high impedance to the output for frequencies near the resonant frequency, and by presenting a relatively low impedance for other frequencies. In this way the unwanted frequencies are dissipated while the good frequency passes. The drawback would be it would need tuning if you change the output frequency.
As drawn I dont think that it would do anything for harmonic supression.
The inductor (Lch) provides a high impedance at the operating frequency and a low resistance for the collector supply.
The capacitor (Cb) couples the output from the collector into the load (R).
The maximum output power from this circuit will be W = (R x Vcc/4).
To suppress the harmonics, depending on the application, you could use a proper parallel tuned circuit, or a low-pass filter. As per the attachments.
I assumed that the circuit was not drawn correctly and that the question body was more accurate or R was not the load. If that's not the case however, then we would have to look at this again.
The inductor would shunt lower frequencies and allow higher frequencies to pass through, and same with the cap, so if R is the load then we have a slightly different story here. It starts to look more like a high pass filter.
It's not a 'circuit' it's a crude representation out of a text book, and the entire question misses out the important point about it, in that it's a tuned RF amplifier, not a general amplifier.
The inductor would shunt lower frequencies and allow higher frequencies to pass through, and same with the cap, so if R is the load then we have a slightly different story here. It starts to look more like a high pass filter.
Using one or the other you get a first order response, using both you get a second order response (if done right of course), so that would mean a sharper response.
It also helps to look at the application, what they are trying to do here. It could be an outright mistake.
No, because it's not a high pass filter, it's a tuned circuit RF amplifier - well it's not actually, it's only a crude partial representation of one in the 'intended to confuse' text book style.
Since the values of the components were not given i was free to choose what values i wanted. Choosing several different values, i got a simulation that showed low amplitude for low frequencies, higher amplitude for higher frequencies, which of course equates to a high pass.
If the values are chosen appropriately i suppose it would be possible to chose an inductor that resonated with the transistor capacitance, but then i would expect to see some kind of tuning adjustment present too.
Alternately, if in the application the transistor limits the high frequency response then we can say we have a sort of bandpass response.
That's why i suggested that we know what the application is and what the values were.
Inductors are also used in collector circuits to help decouple the AC from the power supply. They allow the DC bias but dont allow the AC to get through too much.
I'm continuing reading the book that discuess power amplifier.
if you're interested, it is called Switchmode RF Power Amplifiers (Andrei Grebennikov & Nathan O. Sokal).
I encountered the circuit below and have a question.
The parallel LC resonator tuned to 3fo, passes only frequency 3fo?
That circuit is a rough diagram of what it might take to reduce the square wave harmonics to get a more pure sine fundamental output. It roughly gets rid of the 3rd and 5th harmonics, which are the most important harmonics in the square wave to get rid of if you want a more perfect pure sine output at the fundamental frequency. So in the square wave we have a bunch of added harmonics, and in that filter we subtract some amount of both the 3rd and 5th harmonics in an attempt to get rid of them and get a better pure sine wave.
The last filter shown knocks down more harmonics because it's resonant at the fundamental frequency f0 but this filter unlike the other two is in parallel which means it lets the fundamental pass and shunts part of the other frequencies. The two in series block those respective frequencies and let some of the other ones pass, like the fundamental.