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1. A lock has four dials. On each dial are the digits 0 to 9. Numbers cannot be repeated. How many possible combinations are there?
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1. A lock has four dials. On each dial are the digits 0 to 9. Numbers cannot be repeated. How many possible combinations are there?

User Paula Thomas
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1 Answer

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Combinations without repetitions are represented by the following expression:


\begin{gathered} C=(n!)/(r!(n-r)!) \\ \text{By the information given:} \\ n=9\text{ and r=4} \end{gathered}

Then, we can substitute in the equation:


\begin{gathered} C=(9!)/(4!(9-4)!) \\ C=(362880)/(4!\cdot5!)=(362880)/(2880) \\ C=126 \end{gathered}

There are 126 possible combinations.

User Mike Jarvis
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7.3k points
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