Analyzing Complex Waveforms: Finding Amplitude, Frequency, and Time Period

  • Thread starter Thread starter mammal
  • Start date Start date
  • Tags Tags
    Complex Waveforms
AI Thread Summary
The discussion revolves around analyzing a complex waveform represented by V_A = 20 sin(50πt) + 10 sin(100πt). Participants clarify that Fourier analysis is unnecessary since the waveform consists of two sinusoidal signals. The amplitude and frequency can be derived directly from the standard sinusoidal expression, with the first term representing the fundamental frequency and the second term as the second harmonic. The time period can be calculated using the relationship T = 1/f or T = 2π/ω. Ultimately, the participants successfully determine the amplitude, frequency, and time period for the components of the waveform.
mammal
Messages
5
Reaction score
0

Homework Statement



A complex waveform is given by the equation:

VA=20 sin (50∏t) + 10 sin (100∏t)

Determine the amplitude, frequency and time period of the fundamental and harmonic components.

Homework Equations



The sinusoidal voltage formula is v = V sin(2∏ft). In this formula f is the fundamental frequency.

The Attempt at a Solution



I have no idea how to approach this as there are two parts to the complex waveform.
 
Physics news on Phys.org
Do the Fourier series of each term separately, then see what terms can be combined.
Hint: one signal frequency is harmonically related to the other so you know ahead of time that such combinations can be effected.
 
I have worked out the frequency using ω=2πf on both terms and combining them, any ideas on the amplitude and time period?
I'm not sure waht the Fourier series is to be honest!
 
mammal said:
I have worked out the frequency using ω=2πf on both terms and combining them, any ideas on the amplitude and time period?
I'm not sure waht the Fourier series is to be honest!

I should have looked at the waveform more carefully. You don't need Fourier analysis at all.

You just have two sinusoidal signals added. So take the first, being 20sin(50πt), and compare it to the standard expression for a time-varying sinusoid, which is A sin(ωt). That gives you amplitude A and radian frequency ω immediately (you already got ω = 2πf correctly).

OK, now you know that T = 1/f, right? (Which can also be written T = 2π/ω). That gives you the period T.

There are no harmonics of either expression since both are sine waves. So go on to the second expression 10 sin(100πt) and do exactly the same thing. It too has no harmonics of course. So then you're done.
 
Apparently the "20 sin (50∏t)" is the fundamental part, and the "10 sin (100∏t)" is the second harmonic. There is also a further "+10 sin (150∏t)" added for a later stage of the question.
Thanks for the help I've been able to figure out the answers now!
 

Similar threads

Generating a rising staircase waveform using an integrator?
Replies
29
Views
4K
Engineering Sketching output waveforms while considering slew rate
Replies
3
Views
2K
Comp Sci Harmonic Amplitudes - 3rd & 101st
Replies
13
Views
2K
Engineering AC Circuit Voltage Waveform Analysis
Replies
7
Views
2K
Harmonics and Integer Multiples
Replies
4
Views
2K
Harmonic waves - Fundamental voltages
Replies
8
Views
3K
Power Electronics: Choppers RLE Load
Replies
11
Views
2K
How Do You Calculate AC Waveform Components and Errors?
2
Replies
74
Views
37K
Fundamental frequencies of square wave and sine wave
Replies
4
Views
11K
Harmonic Distortion in a current waveform
Replies
4
Views
3K

Hot Threads

Recent Insights

Back
Top