How many terms of the AP 
,... must be taken so that their sum is 300? Explain the double answer.
Here, first term = a =20
Common difference = d = 58/3 - 20 = - 2/3
Let first n terms of the AP sums to 300.
∴ Sn = 300
To find: n
Now, Sn = (n/2) × [2a + (n - 1)d]
Since, Sn = 300
∴ (n/2) × [2a + (n - 1)d] = 300
⇒ (n/2) × [2(20) + (n - 1)(-2/3)] = 300
⇒ (n/2) × [40 - (2/3)n + (2/3)] = 300
⇒ (n/2) × [(120 - 2n + 2)/3] = 300
⇒ n[122 - 2n] = 1800
⇒ 122n - 2n2 = 1800
⇒ 2n2 - 122n + 1800 = 0
⇒ n2 - 61n + 900 = 0
⇒ (n - 36)( n - 25)= 0
⇒ n = 36 or n = 25
∴ n= 36 or n = 25
Now, S36 = (36/2)[2a + 35d]
= 18(40 + 35(-2/3))
= 18(120 - 70)/3
= 6(50)
= 300
Also, S25 = (25/2)[2a + 24d]
= (25/2)(40 + 24(-2/3))
= (25/2)(40 - 16)
= (24 × 25)/2
= 12 × 25
= 300
Now, sum of 11 terms from 26th term to 36th term = S36 - S25 = 0
∴ Both the first 25 terms and 36 terms give the sum 300 because the sum of last 11 terms is 0. So, the sum doesn’t get affected.