How do you find the next three terms in 2,5,10,17,26,....?
2 Answers
Examine the sequence of differences of this sequence and its sequence of differences to find the next three terms,
Explanation:
To find a pattern in this sequence, first write out the original sequence:
(i)
#color(blue)(2),5,10,17,26#
Then write out the sequence of differences between successive terms of that sequence:
(ii)
#color(blue)(3),5,7,9#
Then write out the sequence of differences of that sequence:
(iii)
#color(blue)(2),2,2#
Having reached a constant sequence, there are a couple of things we can do:
(1) We can find the next three elements of the original sequence as requested.
To do this, add three more
#color(blue)(2),2,2,color(red)(2),color(red)(2),color(red)(2)#
Then add three more terms to the previous sequence using the three new elements of this sequence as differences:
#color(blue)(3),5,7,9,color(red)(11),color(red)(13),color(red)(15)#
Then add three more terms to the original sequence using the three new elements of this sequences as differences:
#color(blue)(2),5,10,17,26,color(red)(37),color(red)(50),color(red)(65)#
(2) We can find a general formula for then
#a_n = color(blue)(2)/(0!) + color(blue)(3)/(1!) (n-1) + color(blue)(2)/(2!) (n-1)(n-2)#
#=2+3n-3+n^2-3n+2 = n^2+1#
Explanation:
Looking at the sequence it should be clear that it is neither arithmetic nor geometric.
Look at the differences:
,
This pattern is a clue that squares are involved.
Look at the pattern of the differences:
Comparing the square numbers with the given sequence, we can see that:
and so on to get the next terms as
