Question

The third term of an arithmetic sequence is 9 and the seventh term is 31, how do you find the sum of the first twenty-two terms?

Answer 1

The sum of the first 22 terms is `color(red)(2453/2)`.

Explanation:

We know that `a_3 = 9` and `a_7 = 31`.

We also know that `a_n = a_1 + (n-1)d`.

`a_7 = a_1 + (7-1)d`

Equation (1): `31 = a_1 + 6d`

and

`a_3 = a_1 + (3-1)d`

Equation (2): `9 = a_1 + 2d`

Subtract Equation (2) from Equation (1).

`31-9 = 6d -2d`

`22 = 4d`

`d = 22/4`

Equation (3): `d= 11/2`

Substitute Equation (3) in Equation (1).

`31 = a_1 + 6d`

`31 = a_1 + 6×11/2 = a_1 + 33`

`a_1 = 31-33 = -2`

So `a_1 = -2` and `d = 11/2`.

`a_n = a_1 + (n-1)d`

So the 22nd term is given by

`a_22 = -2 + (22-1)×11/2 = -2 + 21×11/2 = -4/2 + 231/2`

`a_22 = 227/2`

The sum `S_n` of the first `n` terms of an arithmetic series is given by

`S_n = (n(a_1+a_n))/2`

So

`S_22 = (22(a_1+a_22))/2 = 22/2×(-2+227/2) = 11×(-4/2 + 227/2) = 11 × 223/2`

`S_22 = 2453/2`