How many terms of the AP 63, 60, 57, 54, ... must be taken so that their sum is 693? Explain the double answer.
Here, first term = a =63
Common difference = d = 60 - 63 = - 3
Let first n terms of the AP sums to 693.
∴ Sn = 693
To find: n
Now, Sn = (n/2) × [2a + (n - 1)d]
Since, Sn = 693
∴ (n/2) × [2a + (n - 1)d] = 693
⇒ (n/2) × [2(63) + (n - 1)(-3)] = 693
⇒ (n/2) × [126 - 3n + 3)] = 693
⇒ (n/2) × [129 - 3n] = 693
⇒ n[129 - 3n] = 1386
⇒ 129n - 3n2 = 1386
⇒ 3n2 - 129n + 1386 = 0
⇒ (n - 22)( n - 21)= 0
⇒ n = 22 or n = 21
∴ n= 22 or n = 21
Since, a22 = a + 21d
= 63 + 21(-3)
= 0
∴ Both the first 21 terms and 22 terms give the sum 693 because the 22nd term is 0. So, the sum doesn’t get affected.