back to list

12-tone scale based on 41 to 64 degrees of cahins of 3/2

🔗Mohajeri Shahin <shahinm@kayson-ir.com>

11/24/2006 9:23:35 PM

Hi all

This 12-tone scale is based on chains of 3/2 from degrees 41 to 64 :

0: 0.000

1: 93.840

2: 207.525

3: 297.750

4: 411.435

5: 501.660

6: 615.345

7: 705.570

8: 795.795

9: 909.480

10: 999.705

11: 1089.930

12: 1200.000

Shaahin Mohajeri

Tombak Player & Researcher , Microtonal Composer

My web siteوب سايت شاهين مهاجري <http://240edo.tripod.com/>

My farsi page in Harmonytalkصفحه اختصاصي در هارموني تاك <http://www.harmonytalk.com/mohajeri>

Shaahin Mohajeri in Wikipedia شاهين مهاجري دردائره المعارف ويكي پديا <http://en.wikipedia.org/wiki/Shaahin_mohajeri> <http://www.harmonytalk.com/id/908>

🔗yahya_melb <yahya@melbpc.org.au>

11/25/2006 5:13:18 AM

--- In tuning@yahoogroups.com, "Mohajeri Shahin" wrote:
>
> Hi all
>
> This 12-tone scale is based on chains of 3/2 from degrees 41 to 64 :
>
> 0: 0.000
> 1: 93.840
> 2: 207.525
> 3: 297.750
> 4: 411.435
> 5: 501.660
> 6: 615.345
> 7: 705.570
> 8: 795.795
> 9: 909.480
> 10: 999.705
> 11: 1089.930
> 12: 1200.000
>

Hi Shaahin,

I'm just about totally confused by this!

In what way is it based on them? And how do the 41st to 64th degrees
differ from the 1st to 24th degrees? And if it's absed on 24
degrees, how come we only get 12 tones?

Regards,
Yahya