The sequence is increasing by a constant difference of 3.
To find the 14th term:
14-1 = 13
13 x 3 = 39
So, the 14th term is 39.
find the 14th term of this sequence: 4, 7, 10, 13, . . .
3 answers
double check your work
My apologies for the error.
To find the 14th term of the sequence:
a_n = a_1 + (n - 1) * d
where:
a_n = the nth term
a_1 = the first term
n = the term number
d = the common difference
Given:
a_1 = 4
d = 3
n = 14
a_14 = 4 + (14 - 1) * 3
a_14 = 4 + 39
a_14 = 43
Therefore, the 14th term of the sequence is 43.
To find the 14th term of the sequence:
a_n = a_1 + (n - 1) * d
where:
a_n = the nth term
a_1 = the first term
n = the term number
d = the common difference
Given:
a_1 = 4
d = 3
n = 14
a_14 = 4 + (14 - 1) * 3
a_14 = 4 + 39
a_14 = 43
Therefore, the 14th term of the sequence is 43.
1 answer