23. The sums of n terms of two arithmetic progressions are in the ratio 5n + 4 : 9n + 6. Find the ratio of their 18th terms.

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Payal Gupta | Contributor-Level 10

9 months ago

23. Let a1, a2 be the first terms and d1, d2 be the common difference of the first term A.P.S

So, $\frac{Sum ofntermofIst^{} A P}{Sum of n terms of 2nd AP} = \frac{5 n + 4}{9 n + 6}$

$\frac{\frac{n}{2} [2 a_{1} + (n - 1) d_{1}]}{\frac{n}{2} [2 a_{2} + (n - 1) d_{2}]} = \frac{5 n + 4}{9 n + 6}$

$\frac{2 a_{1} + (n - 1) d}{2 a_{2} + (n - 1) d} = \frac{5 n + 4}{9 n + 6}$ ---------------(1)

The ratio of their 18thterms.

$\frac{a_{1 8offirstA.P}}{a_{1 8ofsecondA.P}} = \frac{a_{1} + (18 - 1) d_{1}}{a_{2} + (18 - 1) d_{2}}$

= $\frac{a_{1} + 17 d_{1}}{a_{2} + 17 d_{2}}$

= $\frac{a_{1} + 17 d_{1}}{a_{2} + 17 d_{2}} * \frac{2}{2}$

= $\frac{2 a_{1} + 34 d_{1}}{2 a_{2} + 35 d_{2}}$ --------(2)

Comparing eqn (1) and (2),

$\frac{2 a_{1} + 34 d_{1}}{2 a_{2} + 35 d_{2}} = \frac{2 a_{1} + (35 - 1) d_{1}}{2 a_{2} + (35 - 1) d_{1}} = \frac{5 * 35 + 4}{9 * 35 + 6}$ = $\frac{179}{321}$

So, ratio of their 18th terms = $\frac{179}{321}$

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