Question

How do you write a rule for the nth term of the geometric sequence, then find a6 given 2, 4/3, 8/9, 16/27,...?

Answer 1

`T_6 = 64/243`

Explanation:

The first term is given as 2, so `a = 2`

The common ration, `r` is found by dividing 2 consecutive terms..
`r = (T_n)/(T_(n-1))` In other words, a term divided by the one before it.

`r = 4/3 ÷2/1 = 4/3 xx 1/2 = 2/3`

Check: `r = 8/9 ÷ 4/3 = 8/9 xx 3/4 =2/3`

Now, knowing the values for `a and r`, we can substitute into the general form for a term of a GP

`T_n = ar^(n-1) rArr 2 xx (2/3)^(n-1)`

Simplifying gives: `T_n =(2^n)/(3^(n-1)`

In the same way we can find `a_6 = ar^5`

But we have already found the general form, so let's use that for `n = 6`

`T_6 = (2^6)/(3^5)`

`T_6 = 64/243`