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Mathematics Notes

ARITHMETIC PROGRESSION (A. P)

CONTENT

  • Sequence
  • Definition of Arithmetic Progression
  • Denotations in Arithmetic progression
  • Deriving formulae for the term of A. P.
  • Sum of an arithmetic series

Find the next two terms in each of the following sets of number and in each case state the rule which gives the term.

(a)        1, 5, 9, 13, 17, 21, 25(any term +4 = next term)

(b)        2, 6, 18, 54, 162, 486, 1458 (any term x 3 = next term)

(c)        1, 9, 25, 49, 81, 121, 169, (sequence of consecutive odd no)

(d)        10, 9, 7, 4, 0, -5, -11, 18, -26, (starting from 10, subtract 1, 2, 3 from immediate no).

In each of the examples below, there is a rule which will give more terms in the list. A list like this is called a SEQUENCE in many cases; it can simply matter if a general term can be found for a sequence e.g.

1, 5, 9, 13, 17 can be expressed as

1, 5, 9, 13, 17 ……………. 4n – 3 where n = no of terms

Check: 5th term    = 4(5) -3

                          20 – 3 = 17

            10th term = 4(10) – 3

                             40 – 3 = 37

Example 2

Find the 6th and 9th terms of the sequence whose nth term is

(a)        (2n + 1)

(b)        3 – 5n.

Solution

(a)        2n + 1

            6th term            =   2(6) + 1   = 12 + 1 = 13

            9th term            =   2 (9) + 1  = 18 + 1 = 19

(b)        3 – 5n

            6th term            = 3 – 5 (6) = 3 – 30 = -27

            9th term            = 3 – 5 (9) = 3 – 45 = –42

Evaluation

For each of the following sequence, find the next two terms and the rules which give the term.

1.         1,   ,1/2 , 1/4   ,  1/8     , ____,  ____

2          100, 96, 92, 88, _____, ____

3.         2, 4, 6, 8, 10,   ____, _____

4.         1, 4, 9, 16, 25,   ____, _____

(i) Arrange the numbers in ascending order   (ii) Find the next two terms in the sequence

5.         19, 13, 16, 22, 10

ARITHMETIC PROGRESSION (A. P) CALCULATION:

EVALUATION

1. Find the sum of the arithmetic series with 16 and -117 as the first and 20th term respectively.

2. The salary scale for a clerical officer starts at N55, 200 per annum. A rise of N3, 600 is given at the end of each year; find the total amount of money earned in 12 years.

GENERAL EVALUATION /REVISION QUESTION

1. An A. P. has 15 terms and a common difference of -3, find its first and last term if its sum is 120.

2. On the 1st of January, a student puts N10 in a box, on the 2nd she puts N20 in the box, on the 3rd she puts N30 and so on putting on the same no. of N10 notes as the day of the month. How much will be in the box if she keeps doing this till 16th January?

3. The salary scale for a clerical officer starts at N55, 200 per annum. A rise of N3, 600 is given at the end of each year, find the total amount of money earned in 12 years.

4. Find  the  7th  term  and  the  nth  term  of  the  progression  27,9,3,…

5. If 8, x, y, – 4 are in A.P, find x and y.

WEEKEND ASSIGNMENT

1.         Find the 4th term of an A. P. whose first term is 2 and the common difference is 0.5   (a) 4   (b) 4.5    (c) 3.5     (d) 2.5

2.         In an A. P. the difference between the 8th and 4th term is 20 and the 8th term is 11/2 times the 4th term, find the common difference         (a) 5    (b) 7     (c) 3    (d) 10

3.         Find the first term of the sequence in no. 2        (a) 70     (b) 45    (c) 25     (d) 5

4.         The next term of the sequence 18, 12, 60 is       (a) 12     (b) 6    (c) -6    (d) -12

5.         Find the no. of terms of the sequence 1/2 , ¾, 1, ……………….. 51/2     (a) 21    (b) 43/4      (c) 1     (d) 22

THEORY

1.         Eight wooden poles are to be used for pillars and the length of the poles form an arc Arithmetic Progression (A. P.) if the second pole is 2m and the 6th pole is 5m, give the lengths of the poles in order and sum up the lengths of the poles.

2. An arithmetic progression (A. P.) has 3 as its term and 4 as the common difference.

a.          Write an expression in its simplest form for the nth term.

b.         Find   the 10th  term    and  the  sum   of  the  first 

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