User:VectorGraphics/Diatonic major third: Difference between revisions

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{{Infobox|Title=Diatonic major third|Data 5=400c|Data 8=[[Diminished 2-pentstep]]|Header 9=Daughter intervals|Header 8=Parent interval|Data 7=[[Minor 2-pelstep]], [[Minor 4-oneirostep]]|Data 6=[[Diatonic minor third]]|Header 7=Adjacent tunings|Header 6=Chromatically adjacent interval|Data 4=343c - 480c|Header 1=MOS|Data 3=+4 generators|Data 2=Major 2-diastep|Header 5=Basic tuning|Header 4=Tuning range|Header 3=Generator span|Header 2=Other names|Data 1=[[5L 2s]]|Data 9=[[M-chromatic minor 4-step]], [[P-chromatic major 4-step]]}}

{{Infobox|Title=Diatonic major third|Data 5=400c|Data 8=[[Diminished 2-pentstep]]|Header 9=Daughter intervals|Header 8=Parent interval|Data 7=[[Minor 2-pelstep]], [[Minor 4-oneirostep]]|Data 6=[[Diatonic minor third]]|Header 7=Adjacent tunings|Header 6=Chromatically adjacent interval|Data 4=343c - 480c|Header 1=MOS|Data 3=+4 generators|Data 2=Major 2-diastep|Header 5=Basic tuning|Header 4=Tuning range|Header 3=Generator span|Header 2=Other names|Data 1=[[5L 2s]]|Data 9=[[M-chromatic minor 4-step]], [[P-chromatic major 4-step]]|Header 10=Associated just intervals|Data 10=[[5/4]], [[81/64]]}}

In the diatonic scale, the '''major third''' is the major variant of the 2-diastep, or ''third.'' It is generated by stacking 4 [[Diatonic perfect fifth|diatonic perfect fifths]] and octave-reducing. It can be stacked with a [[diatonic minor third]] to form a perfect fifth, and as such is often involved in chord structures in diatonic harmony.

Revision as of 02:48, 25 February 2025 view source VectorGraphics (talk \| contribs) 2,127 edits No edit summary Tag: Visual edit ← Older edit		Revision as of 02:49, 25 February 2025 view source VectorGraphics (talk \| contribs) 2,127 edits No edit summary Tag: Visual edit Newer edit →
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	{{Infobox\|Title=Diatonic major third\|Data 5=400c\|Data 8=[[Diminished 2-pentstep]]\|Header 9=Daughter intervals\|Header 8=Parent interval\|Data 7=[[Minor 2-pelstep]], [[Minor 4-oneirostep]]\|Data 6=[[Diatonic minor third]]\|Header 7=Adjacent tunings\|Header 6=Chromatically adjacent interval\|Data 4=343c - 480c\|Header 1=MOS\|Data 3=+4 generators\|Data 2=Major 2-diastep\|Header 5=Basic tuning\|Header 4=Tuning range\|Header 3=Generator span\|Header 2=Other names\|Data 1=[[5L 2s]]\|Data 9=[[M-chromatic minor 4-step]], [[P-chromatic major 4-step]]}}		{{Infobox\|Title=Diatonic major third\|Data 5=400c\|Data 8=[[Diminished 2-pentstep]]\|Header 9=Daughter intervals\|Header 8=Parent interval\|Data 7=[[Minor 2-pelstep]], [[Minor 4-oneirostep]]\|Data 6=[[Diatonic minor third]]\|Header 7=Adjacent tunings\|Header 6=Chromatically adjacent interval\|Data 4=343c - 480c\|Header 1=MOS\|Data 3=+4 generators\|Data 2=Major 2-diastep\|Header 5=Basic tuning\|Header 4=Tuning range\|Header 3=Generator span\|Header 2=Other names\|Data 1=[[5L 2s]]\|Data 9=[[M-chromatic minor 4-step]], [[P-chromatic major 4-step]]\|Header 10=Associated just intervals\|Data 10=[[5/4]], [[81/64]]}}

	In the diatonic scale, the '''major third''' is the major variant of the 2-diastep, or ''third.'' It is generated by stacking 4 [[Diatonic perfect fifth\|diatonic perfect fifths]] and octave-reducing. It can be stacked with a [[diatonic minor third]] to form a perfect fifth, and as such is often involved in chord structures in diatonic harmony.		In the diatonic scale, the '''major third''' is the major variant of the 2-diastep, or ''third.'' It is generated by stacking 4 [[Diatonic perfect fifth\|diatonic perfect fifths]] and octave-reducing. It can be stacked with a [[diatonic minor third]] to form a perfect fifth, and as such is often involved in chord structures in diatonic harmony.