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प्रश्न
The sum of first m terms of an AP is (4m2 – m). If its nth term is 107, find the value of n. Also, find the 21st term of this AP.
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उत्तर १
Let Sm denotes the sum of the first m terms of the AP. Then,
Sm = 4m2 – m
⇒ Sm–1 = 4(m – 1)2 – (m – 1)
= 4(m2 – 2m + 1) – (m – 1)
= 4m2 – 9m + 5
Suppose am denote the mth term of the AP.
∴ am = Sm – Sm–1
= (4m2 – m) – (4m2 – 9m + 5)
= 8m – 5 ...(1)
Now,
an = 107 ...(Given)
⇒ 8n – 5 = 107 ...[From (1)]
⇒ 8n = 107 + 5 = 112
⇒ n = 14
Thus, the value of n is 14.
Putting m = 21 in (1), we get
a21 = 8 × 21 – 5
= 168 – 5
= 163
Hence, the 21st term of the AP is 163.
उत्तर २
\[S_m = 4 m^2 - m\]
\[\text{We know} \]
\[a_m = S_m - S_{m - 1} \]
\[ \therefore a_m = 4 m^2 - m - 4 \left( m - 1 \right)^2 + \left( m - 1 \right)\]
\[a_m = 8m - 5\]
\[\text{Now},\]
\[a_n = 107\]
\[\Rightarrow 8n - 5 = 107\]
\[\Rightarrow 8n = 112\]
\[\Rightarrow n = 14\]
\[a_{21} = 8\left( 21 \right) - 5 = 163\]
