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प्रश्न
Find the value of x for which (8x + 4), (6x − 2) and (2x + 7) are in A.P.
उत्तर
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
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