Sequences and series84P1^
3
18 As part of a fund-raising campaign, I have
been given some books of raffle tickets to sell.
Each book has the same number of tickets
and all the tickets I have been given are
numbered in sequence. The number of the
ticket on the front of the 5th book is 205 and
that on the front of the 19th book is 373.
(i) By writing the number of the ticket on the front of the first book as a
and the number of tickets in each book as d, write down two equations
involving a and d.
(ii) From these two equations find how many tickets are in each book and
the number on the front of the first book I have been given.
(iii) The last ticket I have been given is numbered 492.
How many books have I been given?
[MEI]Geometric progressions
A human being begins life as one cell, which divides into two, then four....
The terms of a geometric sequence are formed by multiplying one term by a fixed
number, the common ratio, to obtain the next. This can be written inductively as:
uk+1 = ruk with first term u 1.
The sum of the terms of a geometric sequence is called a geometric progression,
shortened to G.P. An alternative name is a geometric series.Notation
When describing geometric sequences in this book, the following conventions
are used:
●●first term u 1 = a
●●common ratio = r(^206207)
Geometric progressions
Figure 3.2