[Add Maths Form 5] d For Difference

An arithmetic progression/sequence is a sequence of numbers in which the difference between two successive number is a constant, d.



Thus, the form of an arithmetic sequence is a , a + d , a + 2d , a + 3d , …



Eg:

2, 5, 8, 11, 14, … is an arithmetic progression/sequence with common difference 3.



To find the n-th term in an arithmetic sequence, use Tn = a + (n - 1)d



Example:



1) Find the value of x, in which lg x, lg(x + 2) and lg(x + 16) are three consecutive terms of an arithmetic progression.



Solution:

The difference between two consecutive term in arithmetic progression is the same.

So, T2 - T1 = T3 - T2

lg(x + 2) - lg x = lg(x + 16) - lg(x + 2)

lg( (x + 2) / x ) = lg( (x + 16) / (x + 2) )

(x + 2) / x = (x + 16) / (x + 2)

(x + 2) 2 = x2 + 16x

x2 + 4x + 4 = x2 + 16x

4 = 12x

x = 1/3





2) An arithmetic progression whose first term is 2 includes three consecutive terms that have a sum of 51. The last of these terms is 6 less than the 9th term of the progression. Find the value of each of the three terms.



Solution:

Let a = 2 be the first term

Then, write the arithmetic progression as: 2, ….x, x + d, x + 2d

Since the last of these terms, x + 2d, is 6 less than T9, so

T9 – (x + 2d) = 6

a + 8dx – 2d = 6

2 + 8dx – 2d = 6

6dx = 4 ………………… ( i )



Also, since x + x + d + x + 2d = 51

3x + 3d = 51

x + d = 17 ………………… ( ii )



( i ) + ( ii )



7d = 21

d = 3, x = 14



Hence, the three terms are 14, 17 and 20 respectively

 

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