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प्रश्न
Sum of n terms of the series \[\sqrt{2} + \sqrt{8} + \sqrt{18} + \sqrt{32} +\] ....... is
विकल्प
\[\frac{n (n + 1)}{2}\]
2n (n + 1)
\[\frac{n (n + 1)}{\sqrt{2}}\]
1
उत्तर
\[\frac{n (n + 1)}{\sqrt{2}}\]
Let \[T_n\] be the nth term of the given series.
Thus, we have
\[T_n = \sqrt{2 \times n^2} = n\sqrt{2}\]
Now, let
\[S_n\] be the sum of n terms of the given series.
Thus, we have:
\[S_n = \sqrt{2} \sum^n_{k = 1} \left( k \right)\]
\[ \Rightarrow S_n = \sqrt{2}\left[ \frac{n\left( n + 1 \right)}{2} \right]\]
\[ \Rightarrow S_n = \frac{n\left( n + 1 \right)}{\sqrt{2}}\]
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