Відео

Are there no options to modify the lfo? Is it always on like a square wave?

the semisine wave sounds like a trumpet

I always wondered, how did you add the nelinda sound to musescore?

Sine wave: y = sin(2πx) Semisine (Curved Parabolic) wave: y = 8/π • Fourier series (n = 1, → ∞) sin(2π(nx+0.75))/(4n²-1) + (4-π)/π Squatonic Semisine (Curved Triangular) wave: y = 8/π • Fourier series (n = 1, → ∞) sin(2π((2n-1)x+0.75))/(4(2n-1)² -1) Squatobolic (Squared Parabolic) (Smoothed Triangular) wave: y = 8/π² • Fourier series (n = 1, → ∞) sin(2π(2n-1)x)/(2n-1)³ Parabolic (Smoothed Sawtooth) wave y = 8/π² • Fourier series (n = 1, → ∞) sin(2π(nx+0.75))/n² + 1/3 Triangular (Squared Sawtooth) (Smoothed Meanderic) wave: y = 8/π² • Fourier series (n = 1, → ∞) sin(2π((2n-1)x+0.75))/(2n-1)² Sawtooth (Ramp) (Brighter Parabolic) wave: y = 2/π • Fourier series (n = 1, → ∞) sin(2πnx)/n Meanderic (Square) (Brighter Triangular) wave: y = 4/π • Fourier series (n = 1, → ∞) sin(2π(2n-1)x)/(2n-1)

I know this isn't related to the video but I tried to contact you via email and you haven't responded. Could you please get in touch with me?

Very interesting waveform videos! Looking forward to see more.. planning to do some sound tests of some sort as well?

The author of this wonderful video, tell me, what is the Fourier series of all those waves that you demonstrated in this video?

0:45 we have technical difficulties 0:48 POV: You're in a hospital getting plastic surgery 0:51 you put a stylus down on a synthesized piano 0:54 we have technical difficulties again. 0:57 welcome back to the hospital.

Sine wave - ∞ Smooth pointy sawtonic wave - n³ Smooth pointy squatonic wave - (2n+1)³ Smooth pointy triotonic wave - (3n+1)³ Smooth pointy trioditonic wave - (3n+2)³ Smooth pointy tetratonic wave - (4n+1)³ Smooth pointy tetratritonic wave - (4n+3)³ Parabolic wave - n² Triangle wave - (2n+1)² Pointy triotonic wave - (3n+1)² Pointy trioditonic wave - (3n+2)² Pointy tetratonic wave - (4n+1)² Pointy tetratritonic wave - (4n+3)² Sawtooth wave - n Square (Meander) wave - 2n+1 Sharp triotonic wave -3n+1 Sharp triotonic wave - 3n+2 Sharp tetratonic wave - 4n+1 Sharp tetratritonic wave - 4n+3 Sawtonic click-wave - 1 Squatonic click-wave - 1 Triotonic click-wave - 1 Trioditonic click-wave - 1 Tetratonic click-wave - 1 Tetratritonic click-wave - 1

Pointy waves: Parabolic wave {n} Triangle wave {2n+1} or {2n-1} or {≠2n} Tritriangle wave {≠3n} Tetriangle wave {≠4n} Pentriagle wave {≠5n} Hextriangle wave {≠6n} Septriangle wave {≠7n} Enntriangle wave {≠8n} Nontriangle wave {≠9n} M-triangle wave {≠Mn} Parabolic wave {n} Triangle wave {2n+1} (Odd) Triodd wave 1 {3n+1} (1 Triodd) Triodd wave 2 {3n+2} (2 Triodd} Quodd wave 1 {4n+1} (1 Quod) Quodd wave 2 {4n+2} (2 Quod) Quodd wave 3 {4n+3} (3 Quod) ... M-odd wave {Mn+{ from 1 to (M-1)} (M-odd)

These old videos

I really like this video. I do wish that musescore would give us alto and contra alto and bass clairnets and some more brass.

That is, a semisine wave will be slightly brighter than a parabolic wave

It'd be interesting to see an analysis of the average number of intersections and the shortness of route between two random points.

Cool

What software is this?

This playlist has me captured. Don't know why. I'm not even an audiophile.

11:09 | halfway / clicks 10:22 | try / clicks 2:49 | last quarter / $=@:*£"(]# / sharp sawtooth 3:23 | halfway / $=@:*£"(]# / pointy parabola 0:37 | try / sharp 2:13 | try / pointy 5:01 | try / sines 4:15 | try / cosines 5:37 | last quarter / $=@:*£"(]# 6:24 | try / ??? 6:59 | rounded try / round 8:16 | extra rounded try / round+ 8:55 | halfway / $=@:*£"(]# 9:35 | believable / $=@:*£"(]#

First level: Click wave(Thin Sharp) - 0 dB/oct Second level: Linear wave(Sharp) (Sawtooth, Square, etc...) - 6 dB/oct Third level: Parabolic wave(Pointy) (Semisine, Triangle, etc...) - 12 dB/oct Fourth level: Cubic wave(Smooth Pointy) - 18 dB/oct Fifth level: Sine wave - ∞ dB/oct

The author of this video could have said what Fourier series formula can be used to create a graph of such a wave...

I love looking up a concept and finding exactly the right video

1n+2 880hz 1n+1 440hz 2n+1 220hz 3n+1 146(6)hz 4n+1 110hz 5n+1 88hz 6n+1 73(3)hz

0:59 1/1 () 1 0:12 1/2 (inverse) 1/h 1:47 1/4 (inverse square) 1/h² 2:35 1/8 (inverse cube) 1/h³

I have watched your video about the frustum (2:1) formed pipe and flapping on the other end of it. If opened frustum makes for example: Db3 with all harmonics, in my image, flapping on the other end would have made some of these two sounds: Gb2 with 1,5n+1 harmonics _(if smaller end is flapped)_ Gb1 with 3n+1 harmonics _(if bigger end is flapped)_ . However, it made Db2 with odd harmonics like cylinder formed one. About the harmonic series, the generic wasp sound in Finland is E3 with all harmonics. Would the wasp sound be possible to be modified like this?: E3 with all harmonics C#3 with 1,2n+1 harmonics A2 with 1,5n+1 harmonics E2 with odd harmonics A1 with 3n+1 harmonics A0 with 6n+1 harmonics I do not like wasps at all, and hearing the original wasp sound (E3 with all harmonics), i think that the sound of wasp is terrible. _(The sound of danger.)_ I guess that the wasp sound modified from the original to C#3 with 1,2n+1 harmonics would sound like even more terrible.

My favorites: 1:25 2:11 2:21 2:53 3:03

How to recreate all these waveforms? What formula of the Fourier series (based on sinusoids) can be used to recreate these waves?

Tell me what formula can be used to create all the basic waveforms by Fourier series or by sinusoids. Regarding the sawtooth and semisine waves, I know that they have all the harmonics of the natural number series. But the meander and triangular waves contain only harmonics of a number of odd numbers. How to recreate a pulsating or rectangular wave using a Fourier series (based on sinusoids)? Just how to recreate the wave shape of a distorted triangle(that is, a displaced triangle, sounds like a pulsating wave) using Fourier series?

7:17 And naturally: Pan flute is the base for your future versions of the pan flutes? Like reversed frustum pan flute et cetera? I guess that those pan flutes are the easiest of your future instruments to make.

I didn't exist when this video was made

Woah. I haven't seen this channel in a WHILE.. Are you still working on the reverse conical bore instrument?

Are you still working on nelindas? I would be very interested in them.

Are you still working on nelindas? I would be very interested in them.

ur awesome

Would nelophones have 24 frets?

If these do get invented, I will try one out in my ensemble.

Nice

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2:32 sawtooth 2:34 square 2:36 trisquare 2:38 double trisquare 2:40 sharp 3n+1 2:42 sharp 6n+1

the c subcontrabassoon sounds like its growling at low a

Actually, the same issue happens when trying to produce truly fair results of 1 v 1 with exactly 6 people; the workload is impossible, and reality just doesn't know what to do.

Roundabouts 🫣

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Obviously this is a keyboard just playing the notes in the right octave. Soprillo is very hard to play that clear. E-flat Sopranino is very very very rear, i really doubt you have one. The Contra bass & Sub Contra bass are very expensive & very hard to find anymore, if you did find a Sub you would have to have giving 2-3 of your kids for it.

Wow, That’s a strange instrument 🎸

There will be consorts for every single keyboard (Piano, Harpsichord, Harpsichorddion, Clavinet, Clavichord, Virginal, Rhodes Piano, Wurlitzer Piano, Accordion, Terpodion, Keyboard Glass Harmonica, Keyboard Glockenspiel, Keytar, Claviharp, Celesta, Clavicytherium, Viola Organista, Pipe Organ, Reed Organ, Hammond Organ, Harmonichord, Synthesizer etc), every single keyboard percussion (Crotales, Xylophone, Xylorimba, Carillon, Marimba, Vibraphone, Glockenspiel, Tubular Bells, Aiuspiel Tubular Glockenspiel etc), and harp etc, such as 2' Piccolo/Soprillo, 2 2/3' Sopranino, 4' Soprano, 5 1/3' Alto, 8' Tenor (Regular), 10 2/3' Baritone, 16' Bass, 21 1/3' Greatbass, 32' Contrabass etc!!!!! All will have 128 keys and eventually more!!!

I hope Musesounds gets updated