Question

24. If the ratio of the sum of first n terms of two AP's is (7n + 1): (4n + 27), then find the ratio
of their 9th terms.​

Answer 1

Answer: Let the two series' be T  

n

​

 and T  

n

′

​

 with first terms a and a  

′

 and common differences d and d  

′

 

The ratio of the sums of the series' S  

n

​

 and S  

n

′

​

 is given as,

S  

n

′

​

 

S  

n

​

 

​

=  

[n/2][2a  

′

+[n−1]d  

′

]

[n/2][2a+[n−1]d]

​

=  

4n+27

7n+1

​

 

Or,

a  

′

+[(n−1)/2]d  

′

 

a+[(n−1)/2]d

​

=  

4n+27

7n+1

​

 ...(1)

We have to find,  

T  

11

′

​

 

T  

11

​

 

​

=  

a  

′

+10d  

′

 

a+10d

​

 

Choosing (n−1)/2=10 or n=21 in (1) we get

T  

11

′

​

 

T  

11

​

 

​

=  

a  

′

+10d  

′

 

a+10d

​

=  

4(21)+27

7(21)+1

​

=  

111

148

​

=  

3

4

​

.

Hence, option A.

Step-by-step explanation:

Answer 2

Answer:

Option A is the correct answer!!!