In Exercises 43–54, express each sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation. 1/2+2/3+3/4+⋯+ 14/(14+1)

Summation notation is a mathematical shorthand used to represent the sum of a sequence of terms. It typically uses the Greek letter sigma (Σ) to denote the sum, with an index of summation that indicates the starting and ending values. For example, Σ from i=1 to n of a_i represents the sum of the terms a_1, a_2, ..., a_n.

The index of summation is a variable that represents the position of each term in the sequence being summed. In this case, 'i' is used as the index, starting from 1 and increasing by 1 for each subsequent term. It allows for the systematic representation of each term in the sum, making it easier to express complex series succinctly.

A sequence is an ordered list of numbers, while a series is the sum of the terms of a sequence. In the given problem, the sequence consists of fractions where the numerator is the index 'i' and the denominator is 'i+1'. Understanding how to identify the pattern in the sequence is crucial for correctly expressing the series in summation notation.