In Exercises 25–34, use mathematical induction to prove that each statement is true for every positive integer n. n Σ (i = 1) 5 · 6^i = 6(6^n - 1)

Mathematical induction is a proof technique used to establish the truth of an infinite sequence of statements, typically involving positive integers. It consists of two main steps: the base case, where the statement is verified for the initial value (usually n=1), and the inductive step, where one assumes the statement holds for n=k and then proves it for n=k+1. This method is essential for proving formulas or properties that are asserted to be true for all integers in a specified range.

Summation notation, represented by the sigma symbol (Σ), is a concise way to express the sum of a sequence of terms. In the context of the given question, it indicates the sum of the terms 5 · 6^i from i=1 to n. Understanding how to manipulate and evaluate summations is crucial for applying mathematical induction effectively, as it often involves simplifying or transforming the summation into a more manageable form.

A geometric series is a series of terms where each term after the first is found by multiplying the previous term by a constant called the common ratio. In the expression 6(6^n - 1), the series represents a geometric progression with a common ratio of 6. Recognizing the properties of geometric series, such as their sum formula, is vital for deriving and proving statements involving powers and sums in mathematical induction.