GLITCH THERAPY by iroto published on 2020-12-29T20:35:21Z SO excited to finally give you guys this glitchy banger! I hope you all enjoy Glitch Therapy! Happy Holidays, Stay safe and where a mask! Cover Art Made By Cadofox: https://linktr.ee/cadofox Follow IROTO: Soundcloud: @irotomusic | | | Spotify: open.spotify.com/artist/2iYT9YO2mZE1bRgp9aHzD7 | | | Instagram: www.instagram.com/irotomusic/ | | | Twitter: twitter.com/irotomusic | | | Genre Electronic Comment by alex mclaughlin Yoo loved your last stream your sound design is really well put together 2022-11-05T22:45:16Z Comment by zeff STILL LISTENING AAAAAA 2022-02-10T14:07:10Z Comment by zeff HOW U MADE THIS WTF 2021-10-18T13:47:42Z Comment by Siroch Yoooooooo excuse me wtfff 2021-06-13T14:48:39Z Comment by FEAR UNKNWN good stuff 2021-05-27T20:42:46Z Comment by iroto @kuatari y e s 2021-05-20T06:43:57Z Comment by ATL fire!!! 2021-04-26T23:23:50Z Comment by KNODE This has me spinninggggg, amazing production work and musicality <3 2021-04-23T21:26:05Z Comment by Hellkitty mad 🔥🔥 2021-04-05T06:55:54Z Comment by S0MBRA oooo, this is nice and sharp 2021-02-09T00:00:31Z Comment by S0MBRA this intro is beautiful. the piano, guitar, pads, all of it 2021-02-09T00:00:13Z Comment by VENAL SOOO DOPE 2021-02-03T09:43:44Z Comment by eksau Amazing! I love it 2021-02-02T04:12:00Z Comment by eksau gooddd 2021-02-02T04:10:18Z Comment by Lavient this is so fire dude wow 2021-01-29T10:27:29Z Comment by Lavient YO WAIT 2021-01-29T10:26:16Z Comment by gulhrm this is so sick 2021-01-13T00:58:28Z Comment by IN-Shinku HOLY 2021-01-10T20:50:31Z Comment by IN-Shinku Beautiful bro!! 2021-01-10T20:50:15Z Comment by IRE Disrespectful 2021-01-07T18:35:01Z Comment by IRE Youve come so far man 2021-01-07T18:33:26Z Comment by AO darned good lasers boi 2021-01-07T03:33:42Z Comment by SNAX0nHand crazy good 2021-01-06T01:24:31Z Comment by Tyzel Sooooo good 2021-01-04T21:16:41Z Comment by hollimon WHAT THE FUCKKK' 2021-01-04T18:47:03Z Comment by B I N A P god thissss 2021-01-03T05:18:00Z Comment by T.C.O.E Dope 2021-01-01T17:22:42Z Comment by ⠀ damnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnnn 2021-01-01T08:16:29Z Comment by STYKS this is actually insane 2020-12-31T20:57:53Z Comment by DELTVA Listening to this track like ∣N2 ​cos(\alp−4π​)∣=N2 ​cos(2\alp∈[0;4π​]∪[43π​;π] 1) \alp∈[0 ; π4] \alp \in [0\: ;\: \frac{\pi}{4}]\alp∈[0;4π​] cos(\alp−π4)=cos(2\cos(\alp -\frac{\pi}{4})=cos(2\alp )(\alp−4π​)=cos(2\alp)… 2. \alp∈[3π4 ; π]\d\-x+sqrt1−x2\-=sqrt2(2x2−1 2020-12-31T19:15:51Z