Advertisements
Advertisements
Question
Find the value of x for which (8x + 4), (6x − 2) and (2x + 7) are in A.P.
Solution
Here, we are given three terms,
First-term `(a_1) = 8x + 4`
Second term `(a_2) = 6x - 2`
Third term `(a_3) = 2x + 7`
We need to find the value of x for which these terms are in A.P. So, in as A.P. the difference of two adjacent terms is always constant. So we get
`d = a_2 - a_1`
d = (6x - 2) - (8x + 4)
d = 6x - 8x -2 - 4
d = -2x - 6 ......(1)
Also
`d = a_3 - a_2`
d = (2x + 7) - (6x - 2)
`d = 2x - 6x + 7 + 2`
d = -4x + 9 ....(2)
Now on equating 1and 2 we get
`-2x - 6 = -4x + 9`
4x - 2x = 9 + 6
2x = 15
`x = 15/2`
Therefore for `x = 15/2` these three terms will form an A.P
APPEARS IN
RELATED QUESTIONS
If the nth term of a progression be a linear expression in n, then prove that this progression is an AP
Determine the general term of an A.P. whose 7th term is –1 and 16th term 17
Determine the 10th term from the end of the A.P. 4, 9, 14, …….., 254
Find n if the given value of x is the nth term of the given A.P.
`1, 21/11, 31/11, 41/11,......, x = 171/11`
Find the arithmetic progression whose third term is 16 and the seventh term exceeds its fifth term by 12.
Find the number of all three digit natural numbers which are divisible by 9.
The first term of an arithmetic progression is unity and the common difference is 4. Which of the following will be a term of this A.P.
Choose the correct alternative answer for the following sub-question
Find t3 = ? in an A.P. 9, 15, 21, 27, ...
For an A.P., t4 = 12 and its common difference d = – 10, then find tn
Verify that the following is an AP, and then write its next three terms.
a, 2a + 1, 3a + 2, 4a + 3,...
