For what value of $n$ , are the $n^{t h}$ terms of two APs $63, 65, 67$ , and $3, 10, 17, \dots$ equal?

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Solution

Step 1: Equation for first AP
Considering the first AP,
$63, 65, 67, \dots$
First term, $a = 63$
Common difference,
$d = a_{2} - a_{1}$
$= 65 - 63$
$= 2$
We know, $n^{t h}$ term of this A.P.
$a_{n} = a + (n - 1) d$
$= 63 + (n - 1) 2$
$= 63 + 2 n - 2$
$a_{n} = 61 + 2 n \dots \dots \dots \dots \dots \dots . (i)$
Step 2: Equation for second AP
Considering the second AP,
$3, 10, 17, \dots$
First term, $a = 3$
Common difference,
$d = a_{2} - a_{1}$
$= 10 - 3$
$= 7$
We know, $n^{t h}$ term of this A.P.
$a_{n} = a + (n - 1) d$
$= 3 + (n - 1) 7$
$= 3 + 7 n - 7$
$a_{n} = - 4 + 7 n \dots \dots \dots \dots \dots \dots . (i)$
Step 3: Calculate $n$
Given, $n^{t h}$ term of these A.P.s are equal to each other.
Equating both these equations, we get,
$61 + 2 n = 7 n - 4$
$\Rightarrow$ $61 + 4 = 5 n$
$\Rightarrow$ $5 n = 65$
$\Rightarrow$ $n = 13$
Hence, for $n = 13$ , the $n^{t h}$ terms of the two APs are equal.

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