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प्रश्न
Find the number of terms of the AP –12, –9, –6, ..., 21. If 1 is added to each term of this AP then find the sum of all terms of the AP thus obtained.
योग
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उत्तर
The given AP is –12, –9, –6,.....,21.
Here, a = –12, d = –9(–12) = –9 + 12 = 3 and l = 21
Suppose there are n terms in the AP.
∴ l = an = 21 ...[an = a + (n – 1)d]
⇒ –12 + (n – 1) × 3 = 21
⇒ 3n – 15 = 21
⇒ 3n = 21 + 15 = 36
⇒ n = 12
Thus, there are 12 terms in the AP.
If 1 is added to each term of the AP, then the new AP so obtained is –11, –8, –5,........,22.
Here, first term, A = –11; last term, L = 22 and n = 12
∴ Sum of the terms of this AP
= `12/2 (-11 + 22)` ...`[S_n = n/2 (a + l)]`
= 6 × 11
= 66
Hence, the required sum is 66.
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