Question 1: Summation Notation Property (ii) states that: A. The summation of a constant times a sequence is equal to the sequence times the summation of the constant. B. The summation of a constant times a sequence is equal to the constant times the summation of the sequence. C. The summation of a constant times a sequence is equal to the number of terms being added times the sequence. Question 2: Summation Notation Property (iii) states that: A. Any sum of n terms can be broken into two smaller sums, from 1 to n and from 1 to n B. The sum of the first n terms of a sequence can be split into two sums: the sum of the first m terms, plus the sum of the (m+1)th to nth terms. C. The sum of the first n terms of a sequence can be split into two sums: the sum of the first m terms, plus the sum of the mth to nth terms. Question 3: Summation Notation Property (iv) states that: A. you may adjust the indices of summation and get the same sum just by adding a constant c to both the lower and upper indices, as well as any index within the summation. B. you may adjust the indices of summation and get the same sum just by adding a constant c to both the lower and upper indices, as well as subtracting c from any index within the summation. C. you may adjust the indices of summation and get the same sum just by adding a constant c to both the lower and upper indices. Solution Summation Notation Property (ii) states that: B. The summation of a constant times a sequence is equal to the constant times the summation of the sequence. Summation Notation Property (iii) states that: B. The sum of the first n terms of a sequence can be split into two sums: the sum of the first m terms, plus the sum of the (m+1)th to nth terms. Summation Notation Property (iv) states that: A. you may adjust the indices of summation and get the same sum just by adding a constant c to both the lower and upper indices, as well as any index within the summation..