If you need assistance, please send an email to forum at 4hv dot org. To ensure your email is not marked as spam, please include the phrase "4hv help" in the subject line. You can also find assistance via IRC, at irc.shadowworld.net, room #hvcomm.
Support 4hv.org!
Donate:
4hv.org is hosted on a dedicated server. Unfortunately, this server costs and we rely on the help of site members to keep 4hv.org running. Please consider donating. We will place your name on the thanks list and you'll be helping to keep 4hv.org alive and free for everyone. Members whose names appear in red bold have donated recently. Green bold denotes those who have recently donated to keep the server carbon neutral.
Special Thanks To:
Aaron Holmes
Aaron Wheeler
Adam Horden
Alan Scrimgeour
Andre
Andrew Haynes
Anonymous000
asabase
Austin Weil
barney
Barry
Bert Hickman
Bill Kukowski
Blitzorn
Brandon Paradelas
Bruce Bowling
BubeeMike
Byong Park
Cesiumsponge
Chris F.
Chris Hooper
Corey Worthington
Derek Woodroffe
Dalus
Dan Strother
Daniel Davis
Daniel Uhrenholt
datasheetarchive
Dave Billington
Dave Marshall
David F.
Dennis Rogers
drelectrix
Dr. John Gudenas
Dr. Spark
E.TexasTesla
eastvoltresearch
Eirik Taylor
Erik Dyakov
Erlend^SE
Finn Hammer
Firebug24k
GalliumMan
Gary Peterson
George Slade
GhostNull
Gordon Mcknight
Graham Armitage
Grant
GreySoul
Henry H
IamSmooth
In memory of Leo Powning
Jacob Cash
James Howells
James Pawson
Jeff Greenfield
Jeff Thomas
Jesse Frost
Jim Mitchell
jlr134
Joe Mastroianni
John Forcina
John Oberg
John Willcutt
Jon Newcomb
klugesmith
Leslie Wright
Lutz Hoffman
Mads Barnkob
Martin King
Mats Karlsson
Matt Gibson
Matthew Guidry
mbd
Michael D'Angelo
Mikkel
mileswaldron
mister_rf
Neil Foster
Nick de Smith
Nick Soroka
nicklenorp
Nik
Norman Stanley
Patrick Coleman
Paul Brodie
Paul Jordan
Paul Montgomery
Ped
Peter Krogen
Peter Terren
PhilGood
Richard Feldman
Robert Bush
Royce Bailey
Scott Fusare
Scott Newman
smiffy
Stella
Steven Busic
Steve Conner
Steve Jones
Steve Ward
Sulaiman
Thomas Coyle
Thomas A. Wallace
Thomas W
Timo
Torch
Ulf Jonsson
vasil
Vaxian
vladi mazzilli
wastehl
Weston
William Kim
William N.
William Stehl
Wesley Venis
The aforementioned have contributed financially to the continuing triumph of 4hv.org. They are deserving of my most heartfelt thanks.
Registered Member #1951
Joined: Sun Feb 01 2009, 01:59PM
Location:
Posts: 105
hello everyone i don't know if i placed it in the right section, but i have a problem, that is math. frequency in Hz is how Manny times something happens in a second, lets take sound, Hz is two times a second, frequency is 2 Hz. now i have something that can't happen past 220 ns (nanoseconds) how can i visualize this in terms of frequency can i say not beyond 220MHz? or am i just thinking plane wrong here? cause i have the feeling i am just thinking wrong here.
lets take a switch that can switch, (lol) but can't make smaller passes then 220 ns means it can switch at 220 MHz?
Registered Member #2727
Joined: Tue Mar 09 2010, 02:39PM
Location: Montevideo - Uruguay
Posts: 33
I don't know if i understand all, but when you speak about frequency you are considering periodical phenomena, and numerically f = 1/T, where T is the period of repetition of the signal in seconds, and f is the freq in Hz. something with a T= 220 ns has a main associated freq of 45.5 MHz. See You
Registered Member #2099
Joined: Wed Apr 29 2009, 12:22AM
Location: Los Altos, California
Posts: 1716
AleSeg wrote ...
I don't know if i understand all, but when you speak about frequency you are considering periodical phenomena, and numerically f = 1/T, where T is the period of repetition of the signal in seconds, and f is the freq in Hz. something with a T= 220 ns has a main associated freq of 45.5 MHz. See You
Bzzzt! Decimal point error!
1 / (220 ns) = 4.55 MHz.
Conversely, a frequency of 220 MHz has a period of 4.55 ns. Verstehen Sie?
Registered Member #1792
Joined: Fri Oct 31 2008, 08:12PM
Location: University of California
Posts: 527
R v.d. Tuuk wrote ...
lets take a switch that can switch, (lol) but can't make smaller passes then 220 ns means it can switch at 220 MHz?
Sort of, it depends on the shape of the waveform really. If a switch can switch on and off with a 220ns period then the "fundamental" frequency is indeed 4.5MHz as Klugesmith notes. But in order to have a nice square waveform at 4.5MHz, your switch needs to be working well at odd harmonics of the fundamental frequency: 13.5MHz, 22.5MHz, 31.5MHz, etc. That's because of the fourier series of a square wave. The series is infinite but because you need less amplitude in the higher harmonics, if they are attenuated it can still look pretty square. So if your waveform looks very square with a 220ns period then it could probably switch a sine wave at least at the 5th harmonic (22.5MHz) pretty well.
It's harder to make a square waveform because you need the higher frequency components as well as the fundamental tone. If your transistor is attenuating the higher frequency harmonics then your waveform will have a bigger rise/fall time and maybe some ripple and overshoot.
Look at which has this nice graphic: which shows a square wave vs. its fundamental tone, fundamental + 3rd harmonic, fund + 3rd + 5th, and fund + 3rd + 5th, + 7th.
Registered Member #1951
Joined: Sun Feb 01 2009, 01:59PM
Location:
Posts: 105
so a square wave is basicly a sine wave with harmonics in it's planes? (just to see if i understood it correct.) but i figured it out, i wanted to know the frequency if the wave had 220ns inter falls i was doing the math wrong i see, thanks all :) ow and why do these harmonics have odd numbers? or can harmonics be even numbers like second and forth, what's this phenomena called?
Registered Member #1792
Joined: Fri Oct 31 2008, 08:12PM
Location: University of California
Posts: 527
R v.d. Tuuk wrote ...
so a square wave is basicly a sine wave with harmonics in it's planes? (just to see if i understood it correct.) but i figured it out, i wanted to know the frequency if the wave had 220ns inter falls i was doing the math wrong i see, thanks all :) ow and why do these harmonics have odd numbers? or can harmonics be even numbers like second and forth, what's this phenomena called?
Yes, any periodic (repeating) waveform no matter what the shape can be represented as a combination of sinusoids at frequencies which are harmonics of the fundamental frequency of the original wave. This is part of Fourier analysis.
It just so happens to work out for square waves when you do the math that they have all odd harmonics. But that is only true for certain special cases like square waves, triangle waves also have only odd harmonics but in different amounts. Most typical waveforms will be composed of both odd and even harmonics.
Registered Member #2463
Joined: Wed Nov 11 2009, 03:49AM
Location:
Posts: 1546
Perhaps the word wave should be explored. A sin or square is the periodic alternation in polarity at the lowest frequency we are considering. 1/f is the time for 1 alternation. The problem with the square wave is it cannot be depicted on a time line. Time doesnt jump. 1/f - 3/↨ is the time for 1 alternation.
This site is powered by e107, which is released under the GNU GPL License. All work on this site, except where otherwise noted, is licensed under a Creative Commons Attribution-ShareAlike 2.5 License. By submitting any information to this site, you agree that anything submitted will be so licensed. Please read our Disclaimer and Policies page for information on your rights and responsibilities regarding this site.
basicly math based question, (ns)
