All High School Math Resources
Example Questions
Example Question #1 : Multiplying And Dividing Factorials
Solve the following expression.
This expression can be simplified because all terms in the expression for 8! are also found in the expression for 10!. By writing the expression below, we are able to cancel 8!.
Example Question #2 : Multiplying And Dividing Factorials
Solve:
Both the numerator and denominator are factorials. If you expanded both, everything would cancel out except for in the numerator. Multiply those together to get 720.
Example Question #1 : Multiplying And Dividing Factorials
Simplify .
Thus, since the remaining terms cancel out. 56 is the simplified result.
Example Question #1 : Factorials
Stewie has marbles in a bag. How many marbles does Stewie have?
Simplifying this equation we notice that the 3's, 2's, and 1's cancel so
Alternative Solution
Example Question #3 : Multiplying And Dividing Factorials
Which of the following is NOT the same as ?
The cancels out all of except for the parts higher than 4, this leaves a 6 and a 5 left to multilpy
Example Question #4 : Multiplying And Dividing Factorials
Simplify and solve .
Remember a number followed by a ! is a factorial. A factorial is the product of the given number and all of the numbers smaller than it down to zero. For example, .
Rather than do all of the math involved for , notice that is the same as
From here, the 's cancel out, leaving us with .
Example Question #1 : Multiplying And Dividing Factorials
Which of the following is equivalent to ?
None of the other answers are correct.
This is a factorial question. The formula for factorials is .
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