93,309 views
45 votes
45 votes
Consider the sequence 60, 53, 46, 39, 32, 25, ...The common difference of this sequence isSelect oneformula for the sequence isThe tenth term for this sequence isSelect one

User Apoorv Verma
by
2.9k points

1 Answer

23 votes
23 votes

We have here an arithmetic progression.

We have that the common difference is:

53- 60 = - 7

46 - 53 = - 7

39 - 46 = - 7

And so on.

Therefore, the common difference of this sequence is d = -7. The progression is decreasing.

We can find the formula for the sequence using the general formula for arithmetic progressions:


a+(n-1)d

Where

a is the first term of the arithmetic progression.

n is the n term of the sequence.

d is the common difference ( d = -7 in this case).

Then, we have that the formula for this sequence is:


60+(n-1)(-7)=60-7(n-1)=67-7n

We can check that the second, and six terms are:


60-7(2-1)=60-7=53,60-7(6-1)=60-7(5)=60-35=25

We have:

60 (1), 53 (2), 46 (3), 39 (4), 32 (5), 25 (6), ...

Therefore, the tenth term for this sequence is:


60-7(10-1)=60-7(9)=60-63=-3

Hence, the tenth term is -3.

User BMoon
by
3.0k points