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@@ -163,9 +163,11 @@ $$ T(n) \leq O(n) + T(max\{k, n−k\}) \leq O(n) + T(9n/10)$$
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Vamos analizar essa recursão, note que colocamos $\leq$ , pois as linhas 3 e 5 do Particione-D podem consumir tempo menor do que as linhas 2 e 4.
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-$$T(n) = O(n) + T(9n/10) = an + T(9n/10) $$
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+$$T(n) = O(n) + T(9n/10) = an + T(9n/10) = an + an \frac{9}{10} T(n \frac{9}{10}^2) $$
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-$$T(n) = O(n) + T(9n/10) = an + T(9n/10) = an + an \frac{9}{10} T(n \frac{9}{10}^2)$$
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+$$= an \sum\_{j=1}{i} \frac{9}{10}^{j-1} + T(n \frac{9}{10}^i) = an \cdot \frac{\frac{9}{10}^i-1}{\frac{9}{10}-1} + T(n \frac{9}{10}^i)$$
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+
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+Suponha que $n = $
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