Does anyone remember the notation to indicate a sequential set?
As in A, B, C... -- successive values being integers, ad infinitum ??
j-
You mean something like Z, N, N (superscript +) type sequential sets?
ie: N^+ = {Set of Natural Numbers} = 1, 2, 3, 4, ...
ie: Z = {Set of Integers} = ... -1, 0, 1, ...
You mean something like Z, N, N (superscript +) type sequential sets?
ie: N^+ = {Set of Natural Numbers} = 1, 2, 3, 4, ...
ie: Z = {Set of Integers} = ... -1, 0, 1, ...
Something along those lines?
WG
Sorta, but no. Superscript expresses a progressive function (which, of course, N+1 IS), but I'm looking for a simple way to represent (in a formula) that the same operations may be applied to the same variables as in the present formula, with identical empirical results, so long as (and whenever) all present values are advanced by one integer unit.
It's a goddmaned symbol of some sort, I just can't see it in my head.
Sorta, but no. Superscript expresses a progressive function (which, of course, N+1 IS), but I'm looking for a simple way to represent (in a formula) that the same operations may be applied to the same variables as in the present formula, with identical empirical results, so long as (and whenever) all present values are advanced by one integer unit.
It's a goddmaned symbol of some sort, I just can't see it in my head.
j-
I think a summation or product function can do what you're looking for.
Their greek symbols representing these functions are pi and sigma (product and summation respectively).
I think a summation or product function can do what you're looking for.
Their greek symbols representing these functions are pi and sigma (product and summation respectively).
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