Advertisements
Advertisements
प्रश्न
The first and last terms of an AP are a and l respectively. Show that the sum of the nth term from the beginning and the nth term form the end is ( a + l ).
Advertisements
उत्तर
In the given AP, first term = a and last term = l.
Let the common difference be d.
Then, nth term from the beginning is given by
Tn = { l- (n-1) d} ................(1)
Similarly, nth term from the end is given by
Tn ={ l -(n-1) d} ................(2)
Adding (1) and (2), we get
a+(n-1) d + { l-(n-1) d}
= a+ (n-1) d+l (n-1) d
= a+1
Hence, the sum of the nth term from the beginning and the nth term from the end (a +1).
APPEARS IN
संबंधित प्रश्न
How many terms of the A.P. 18, 16, 14, .... be taken so that their sum is zero?
If Sn1 denotes the sum of first n terms of an A.P., prove that S12 = 3(S8 − S4).
Find the sum of the following arithmetic progressions:
3, 9/2, 6, 15/2, ... to 25 terms
Find the sum of the following arithmetic progressions:
a + b, a − b, a − 3b, ... to 22 terms
Find the sum of the first 13 terms of the A.P: -6, 0, 6, 12,....
Find the sum of the first 40 positive integers divisible by 3
Find the sum of all multiples of 7 lying between 300 and 700.
The 7th term of the an AP is -4 and its 13th term is -16. Find the AP.
The 9th term of an AP is -32 and the sum of its 11th and 13th terms is -94. Find the common difference of the AP.
How many two-digit number are divisible by 6?
Find the sum of all multiples of 9 lying between 300 and 700.
In an A.P. sum of three consecutive terms is 27 and their product is 504, find the terms.
(Assume that three consecutive terms in A.P. are a – d, a, a + d).
Find where 0 (zero) is a term of the A.P. 40, 37, 34, 31, ..... .
A man is employed to count Rs 10710. He counts at the rate of Rs 180 per minute for half an hour. After this he counts at the rate of Rs 3 less every minute than the preceding minute. Find the time taken by him to count the entire amount.
Write the expression of the common difference of an A.P. whose first term is a and nth term is b.
Q.12
In an A.P. sum of three consecutive terms is 27 and their products is 504. Find the terms. (Assume that three consecutive terms in an A.P. are a – d, a, a + d.)
Find the sum of three-digit natural numbers, which are divisible by 4.
In a ‘Mahila Bachat Gat’, Sharvari invested ₹ 2 on first day, ₹ 4 on second day and ₹ 6 on third day. If she saves like this, then what would be her total savings in the month of February 2010?
If the sum of the first m terms of an AP is n and the sum of its n terms is m, then the sum of its (m + n) terms will be ______.
