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of nine
= 42 X (16)2 X (2 x 9) X (10)31 2.5 Numbers Without Denomination
In this method each of the digits of the number is expressed without its denomination. The digits may be tabulated by grouping also. At that time group has its denomination. Instances from Nemicandra's works are as follows - LWM दुगचउरट्ठडसगइगि (928 TLS)
= Two Four Eight Eight Seven One = 178842 quicti quiet HT TICIS (571 KK) = Five - thirty Four - ninety Sixty Four - forty
= 44609435
qUURTAGIRI UTT B UURTJUULUTO 16*(313 TLS) = Fifty One - forty Nine Six - fifty Zero Nine - seventy
= 7905694150 RWM तिछणवणवदुग (572 KK)
= Three Six Nine Nine Two
= 36992 एकट्ट च च य छस्सत्तयं च च य सुण्णसत्ततियसत्ता - सुण्णं पण पण पंच य एक्कं c on y quita (354 JK)
= One Eight Four Four Six Seven Four Four Zero Seven Three Seven
Zero Nine Five Five One Six One Five
= 18446744073709551615
The true fascination of this method is to save us from denominations which sometimes become hurdles while operating or expressing numbers. 2.6 Number of Repeated Mid-Digits
It is very possible that this method is of the Jaina School. The use of this method has been found in the Dhavalā (816 A.D.). Nemicandra used it in the GJK for the following -
liệt giai 9UUTH GHI (633 JK)
Arhat Vacana, July 99
