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Question
The sum of first n terms of two APs are in the ratio (3n + 8) : (7n + 15). Find the ratio of their 12th terms.
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Solution
Given: Let the two APs have first terms a1, a2 and common differences d1, d2.
The sums of first n terms satisfy `(S1_n)/(S2_n) = (3n + 8) : (7n + 15)`, with `S_n = n/2 [2a + (n - 1)d]`.
Step-wise calculation:
1. Write ratio of sums using Sn formula:
`(n/2 (2a_1 + (n - 1)d_1))/(n/2 (2a_2 + (n - 1)d_2)) = (3n + 8)/(7n + 15)`
⇒ `(2a_1 + (n - 1)d_1)/(2a_2 + (n - 1)d_2) = (3n + 8)/(7n + 15)`
2. To get the ratio of the mth terms, Tm = a + (m – 1)d.
Substitute n = 2m – 1 so that 2a + (n – 1)d = 2a + (2m – 2)d = 2[a + (m – 1)d].
Thus, `(a_1 + (m - 1)d_1)/(a_2 + (m - 1)d_2)`
= `(3(2m - 1) + 8)/(7(2m - 1) + 15)`
= `(6m + 5)/(14m + 8)`
3. For the 12th terms (m = 12):
Ratio = (6 × 12 + 5) : (14 × 12 + 8) = 77 : 176.
Simplify by gcd 11 → 7 : 16.
The ratio of their 12th terms is 7 : 16.
