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प्रश्न
Find the sum of the following arithmetic series:
5 + (–41) + 9 + (–39) + 13 + (–37) + 17 + ... + (–5) + 81 + (–3)
HINT: Given sum = (5 + 9 + 13 + 17 + ... + 81) + {(–41) + (–39) + ... + (–3)}.
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उत्तर
Given: 5 + (–41) + 9 + (–39) + 13 + (–37) + 17 + ... + (–5) + 81 + (–3).
Step-wise calculation:
1. Split into two APs:
Positive terms: 5, 9, 13, ..., 81.
Here a = 5, d = 4, last = 81.
`n_p = ((81 - 5)/4) + 1`
= 19 + 1
= 20
`S_p = n_p/2 xx ("first" + "last")`
= `20/2 xx (5 + 81)`
= 10 × 86
= 860
2. Negative terms: –41, –39, –37, ..., –3.
Here a = –41, d = 2, last = –3.
`n_n = ((-3 - (-41))/2) + 1`
= `(38/2) + 1`
= 19 + 1
= 20
`S_n = n_n/2 xx ("first" + "last")`
= `20/2 xx (-41 + (-3))`
= 10 × (–44)
= –440
3. Total sum = Sp + Sn
= 860 + (–440)
= 420
Check: pairing terms gives pairs –36, –30, –24, ..., 78;
20 pairs sum = `20/2 xx (-36 + 78)`
= 10 × 42
= 420
The sum of the series is 420.
