________________ 148 Station Indivisible-corresponding sections in a vector. Basic vectors in a vector. Vectors in a tensor. Tensors in a geometric-regression Tensors in a volition station. 24. 6th 9 10 11 12 13 14 15 16 100 Cf. Ne, G.J.K, Todaramala's Artha Samdristi, p. 232. For example, in the first geometric regression, each of the basic vectors of the first vector of the first tensor contains eight indivisible corresponding-sections. The complete picture of the above in algebraic and numerical notation is as follows: Name 25. 5th 18 20 22 24 26 28 30 32 200 4th 36 40 44 48 52 56 60 Jain Education International 64 400 3rd 72 80 88 96 104 112 120 128 Mahavira and His Relevance Algebraic Notation Numerical Notation 800 = a Cf. No, G.J.K, Todaramala Artha Samdristi, p. 231 () In case of a Karmic bond of matter at an instant, say an instanteffective-bond, the matrix for Karmic ultimate particles with impartation intensties are depicted as follows in numerical symbolism : a Gunahanis (Geometrte Regressions) - ā प a a 1 . 2nd 144 160 176 192 208 224 240 256 1600 a a 1st 288 320 352 384 416 448 480 512 3200 8 256 4 9 5 For Private & Personal Use Only 1 Grand Total: 6300 Such progressions have been given simple rules for manipulating the sum, number of terms, common differences or multiples there of and so on. Cf. G.J.K., p. 252, p. 519 et seq. Total Karmic ultimateparticles-intensities. Cf. He, Heisenberg, W., the Physical Principles of the Quantum Theory, Dover, 1930, 109 et seq. www.jainelibrary.org