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Question
If the sum of the first n terms of an A.P. is `1/2`(3n2 +7n), then find its nth term. Hence write its 20th term.
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Solution
We have,
Sn = `1/2`[3n2 + 7n]
Replacing n by (n - 1), we get
Sn - 1 = `1/2`[3(n - 1)2 + 7(n - 1)]
⇒ Sn - 1 = `1/2`[3(n2 + 1 - 2n) + 7n - 7]
⇒ Sn - 1 = `1/2`[3n2 + 3 - 6n + 7n - 7]
⇒ Sn - 1 = `1/2`[3n2 + n - 4]
Now, nth term = Sn - Sn - 1
⇒ an = `1/2[3n^2 + 7n] - 1/2[3n^2 + n - 4]`
⇒ an = `1/2`[3n2 + 7n - 3n2 - n + 4]
⇒ an = `1/2[6n + 4]`
⇒ an = 3n + 2
Now,
a20 = 3 × 20 + 2 = 60 + 2 = 62.
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