3628800
This question can be solved easily using the fundamental principle of counting.
Any of the 10 people can stand in the first place, 9 in the second, 8 in the third and so on until only 1 can stand in the last place.
Since these events are interlinked, you will multiply 10•9•8•7•6•5•4•3•2•1 i.e. 10!
10! = 3628800
Thus 10 people can be arranged in a row in 3628800 ways.
Answer:
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Answer:
3628800
Step-by-step explanation:
This question can be solved easily using the fundamental principle of counting.
Any of the 10 people can stand in the first place, 9 in the second, 8 in the third and so on until only 1 can stand in the last place.
Since these events are interlinked, you will multiply 10•9•8•7•6•5•4•3•2•1 i.e. 10!
10! = 3628800
Thus 10 people can be arranged in a row in 3628800 ways.
Answer:
Thus 10 people can be arranged in a row in 3628800 ways.