Ord's composition called 1ba1234.mid. I used the decimal digits of 1 divided by 1234 to arrive at the notes.
The digits I used are the decimal digits of this division:
+.000810372771474878444084278768233387358184764991896272285251215559157212317666126418152350081037277
14748784440842787682333873581847649918962722852512155591572123176661264181523500810372771474878444
08427876823338735818476499189627228525121555915721231766612641815235008103727714748784440842787682
33387358184764991896272285251215559157212317666126418152350081037277147487844408427876823338735818
47649918962722852512155591572123176661264181523500810372771474878444084278768233387358184764991896
27228525121555915721231766612641815235008103727714748784440842787682333873581847649918962722852512
15559157212317666126418152350081037277147487844408427876823338735818476499189627228525121555915721
23176661264181523500810372771474878444084278768233387358184764991896272285251215559157212317666126
4181523500810372
You will notice even though the digits do repeat every 86 digits the
music is never quite the same.
I used my Enormous numbers.exe program to calculate these digits -- to download
click on the program
as listed in:
http://users.uniserve.com/~omjhooge/welcome4.html
