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34 votes
34 votes
Evaluate the expression: 16P4A. 1,820B. 10,920C. 7,280D. 43,680

User Schube
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1 Answer

17 votes
17 votes

The permutation is defined as:


_nP_r=(n!)/((n-r)!)

Then in this case we have:


\begin{gathered} _(16)P_4=(16!)/((16-4)!) \\ =(16!)/(12!) \\ =(16\cdot15\cdot14\cdot13\cdot12!)/(12!) \\ =16\cdot15\cdot14\cdot13 \\ =43680 \end{gathered}

Therefore the answer is D.

User Gomes
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