How do you find the sum of the series $k^{2} - 1$ $k^2-1$ from k=1 to 5?

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How do you find the sum of the series $k^{2} - 1$ $k^2-1$ from k=1 to 5?

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Answer 1 · 2016-11-10T14:05:57

$5 \sum k = 1 (k^{2} - 1) = 50$ $sum_(k=1)^5 (k^2 - 1) = 50$

Explanation:

We need the standard formula $n \sum r = 1 r^{2} = \frac{1}{6} n (n + 1) (2 n + 1)$ $sum_(r=1)^n r^2=1/6n(n+1)(2n+1)$

$:. sum_(k=1)^5 (k^2 - 1) = sum_(k=1)^5 (k^2) - sum_(k=1)^5 (1)$
$:. sum_(k=1)^5 (k^2 - 1) = 1/6(5)(5+1)(10+1) - 5$
$:. sum_(k=1)^5 (k^2 - 1) = 1/6(5)(6)(11) - 5$
$:. sum_(k=1)^5 (k^2 - 1) = 55 - 5$
$:. sum_(k=1)^5 (k^2 - 1) = 50$

Alternatively, as there are only a few terms we could just write them out and compute the sum;
$sum_(k=1)^5 (k^2 - 1) = (1-1) + (4-1) + (9-1) + (16-1) + (25-1)$
$:. sum_(k=1)^5 (k^2 - 1) = 0 + 3 + 8 + 15 + 24$
$:. sum_(k=1)^5 (k^2 - 1) = 50$ , as before

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How do you find the sum of the series $k^{2} - 1$ $k^2-1$ from k=1 to 5?

1 Answer

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