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How many different combinations of 10 numbers are there with 70 numbers? - Answers
To find the number of different combinations of 10 numbers from a total of 70 numbers, you can use the combination formula, which is represented as ( C(n, r) = \frac{n!}{r!(n-r)!} ). In this case, ( n = 70 ) and ( r = 10 ), so the calculation is ( C(70, 10) = \frac{70!}{10!(70-10)!} ). This results in a total of 5,486,560 different combinations.
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How many different combinations of 10 numbers are there with 70 numbers? - Answers
To find the number of different combinations of 10 numbers from a total of 70 numbers, you can use the combination formula, which is represented as ( C(n, r) = \frac{n!}{r!(n-r)!} ). In this case, ( n = 70 ) and ( r = 10 ), so the calculation is ( C(70, 10) = \frac{70!}{10!(70-10)!} ). This results in a total of 5,486,560 different combinations.
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How many different combinations of 10 numbers are there with 70 numbers? - Answers
To find the number of different combinations of 10 numbers from a total of 70 numbers, you can use the combination formula, which is represented as ( C(n, r) = \frac{n!}{r!(n-r)!} ). In this case, ( n = 70 ) and ( r = 10 ), so the calculation is ( C(70, 10) = \frac{70!}{10!(70-10)!} ). This results in a total of 5,486,560 different combinations.
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- og:descriptionTo find the number of different combinations of 10 numbers from a total of 70 numbers, you can use the combination formula, which is represented as ( C(n, r) = \frac{n!}{r!(n-r)!} ). In this case, ( n = 70 ) and ( r = 10 ), so the calculation is ( C(70, 10) = \frac{70!}{10!(70-10)!} ). This results in a total of 5,486,560 different combinations.
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