Advertisements
Advertisements
Question
If the 10th term of an A.P. is 52 and the 17th term is 20 more than the 13th term, find the A.P.
Solution
In the given AP, let the first term be a and the common difference be d.
Then, Tn = a + (n − 1)d
Now, we have:
T10 = a + (10 − 1)d
⇒ a + 9d = 52 ...(1)
T13 = a + (13 − 1)d = a + 12d ...(2)
T17 = a + (17 − 1)d = a + 16d ...(3)
But, it is given that T17 = 20 + T13
i.e., a + 16d = 20 + a + 12d
⇒ 4d = 20
⇒ d = 5
On substituting d = 5 in (1), we get:
a + 9 ⨯ 5 = 52
⇒ a = 7
Thus, a = 7 and d = 5
∴ The terms of the AP are 7, 12, 17, 22,...
APPEARS IN
RELATED QUESTIONS
Determine the 10th term from the end of the A.P. 4, 9, 14, …….., 254
Find next two terms of an A.P.
4, 9, 14, ......
Write the sequence with nth term an = 5 + 2n
Write the sequence with nth term an = 6 − n
Which of the following sequences are arithmetic progressions? For those which are arithmetic progressions, find out the common difference.
3, 3, 3, 3, .....
Find 11th term of the A.P. 10.0, 10.5, 11.0, 11.5, ...
Find the common difference of the A.P. and write the next two terms 51, 59, 67, 75, ..
Write the 25th term of an A.P. 12,16,20,24, .......
Choose the correct alternative answer for the following sub-question
Find t3 = ? in an A.P. 9, 15, 21, 27, ...
In an A.P. t10 = 57 and t15 = 87, then find t21
