Let's start by paying close attention to the terms of the given sequence.
cccc
a_1 & a_2 & a_3 & a_4
1 & 3 & 9 & 27
To write the next three terms, we first have to find the common ratio. To do so, we will calculate the quotient between any two consecutive terms. For simplicity, we will find the quotient between the second and the first terms.
a_2/a_1=3/1= 3
We have a geometric sequence with a common ratio of 3. To find the next three terms, we will multiply the value of the last term by 3 and repeat it twice.
rrrrr
a_5&=& 27 ( 3) &=& 81
a_6&=& 81 ( 3) &=& 243
a_7&=& 243 ( 3) &=& 729
To graph the first eight terms, we will let the horizontal axis represent the position of the term within the sequence — this is the domain — and the vertical axis will represent the value of the terms — the range.
