If the fifth term of an AP is 25 and the ninth term is 37, then the common difference of the AP is .

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Solution

The correct option is A 3
If the first term is a, the common difference is d and the $n^{t h}$ term is $a_{n}$ , then,
$a_{n} = a + (n - 1) d$
$\Rightarrow a_{5} = a + 4 d$ and
$a_{9} = a + 8 d$

Given,
$a + 4 d = 25$ and $a + 8 d = 37$
$a + 4 d = 25$ ...(i)
$a + 8 d = 37$ ...(ii)
Subtracting (i) from (ii), we get
$a + 8 d - a - 4 d = 37 - 25$
$⟹ 4 d = 12$
$⟹ d = 3$

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