Respuesta :
Answer:
Step-by-step explanation:
The formula for determining the nth term of an arithmetic sequence is expressed as
Sn = n/2(a + l)
Confirming the rule of 78, the last term is 12 and the first term is 1. Therefore
78 = 12/2(1 + 12)
78 = 6(1 + 12)
78 = 6 + 72
For a 10 month period, the last term is 10, the sum of the series, S10 is
S10 = 10/2(1 + 10)
S10 = 5 × 11 = 55
For a 15 month period, the last term is 15, the sum of the series, S15 is
S15 = 15/2(1 + 15)
S15 = 7.5 × 16 = 120
For a 20 month period, the last term is 20, the sum of the series, S20 is
S20 = 20/2(1 + 20)
S20 = 10 × 21 = 210
Answer:
For a 10 month period, the last term is 10 and the series sum is 55
For a 15 month period, the last term is 15 and the series sum is 120
For a 20 month period, the last term is 20 and the series sum is 210
Step-by-step explanation:
i got the answer right
