Given the formula $\sum_1^n{i} = \frac{n ( n - 1)}{2} $, does there exist a function $F$ such that $F(n) = i$?
If so, what is it? If not, why not?
Given the formula $\sum_1^n{i} = \frac{n ( n - 1)}{2} $, does there exist a function $F$ such that $F(n) = i$?
If so, what is it? If not, why not?
Maybe you are asking, given $X$, how can I find $n$ such that $\sum_1^ni=X$? or maybe not, it's very hard to tell what you are asking. But if that is what you are asking, here's the answer: multiply $X$ by $8$, add $1$, take the square root, subtract $1$, and divide by $2$.
For example, if $X=45$, you go $45\to360\to361\to19\to18\to9$, and indeed $1+2+\cdots+9=45$.
But your $n(n-1)/2$ should be $n(n+1)/2$.