Sum of Geometric Sequence/Examples/Common Ratio 1

Theorem
Consider the Sum of Geometric Sequence defined on the standard number fields for all $x \ne 1$.


 * $\ds \sum_{j \mathop = 0}^n a x^j = a \paren {\frac {1 - x^{n + 1} } {1 - x} }$

When $x = 1$, the formula reduces to:


 * $\ds \sum_{j \mathop = 0}^n a 1^j = a \paren {n + 1}$

Proof
When $x = 1$, the is undefined:
 * $a \paren {\dfrac {1 - 1^{n + 1} } {1 - 1} } = a \dfrac 0 0$

However, the degenerates to: