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Grade 12

Evaluate factorial expressions

Lesson

What are factorials?

In 1808, the French mathematician Christian Kramp wrote "I use the very simple notation $n!$n! to designate the product of numbers decreasing from $n$n to unity, i.e. $n!=n\times\left(n-1\right)\times\left(n-2\right)\times\left(n-3\right)\times...\times3\times2\times1$n!=n×(n1)×(n2)×(n3)×...×3×2×1".

Today we refer to the product as "$n$n factorial". So $5!=5\times4\times3\times2\times1=120$5!=5×4×3×2×1=120 and $6!=6\times5\times4\times3\times2\times1=720$6!=6×5×4×3×2×1=720

Factorials grow quickly. For example, $18!=6402373705728000$18!=6402373705728000. The number $100!$100! has $24$24 zeros at the right hand end of the number.  In fact, the number $59!$59! is larger than the current estimate of atoms in the universe!

Simplifying expressions involving Factorials

Since $8!$8! is $8\times7!$8×7!, then an expression like $8!+7!$8!+7! can be simplified as $8\times7!+7!=7!\left(8+1\right)=9\times7!$8×7!+7!=7!(8+1)=9×7!. Similarly, $\frac{8!}{7!}=\frac{8\times7!}{7!}=8$8!7!=8×7!7!=8

More generally, an expression like $\frac{n!}{\left(n-1\right)!}$n!(n1)! can be simplified to $\frac{n\times\left(n-1\right)!}{\left(n-1\right)!}=n$n×(n1)!(n1)!=n.

Similarly, $\frac{n!}{\left(n-3\right)!}=n\times\left(n-1\right)\times\left(n-2\right)$n!(n3)!=n×(n1)×(n2), and this type of simplification can be useful in solving certain equations. For example, to solve $n!=120\times\left(n-3\right)!$n!=120×(n3)! for $n$n, we might proceed as follows:

$n!$n! $=$= $120\times\left(n-3\right)!$120×(n3)!
$n\times\left(n-1\right)\times\left(n-2\right)\times\left(n-3\right)!$n×(n1)×(n2)×(n3)! $=$= $120\times\left(n-3\right)!$120×(n3)!
$n\times\left(n-1\right)\times\left(n-2\right)$n×(n1)×(n2) $=$= $120$120
$n^3-3n^2+2n$n33n2+2n $=$= $120$120
$n^3-3n^2+2n-120$n33n2+2n120 $=$= $0$0
$\left(n-6\right)\left(n^2+3n-120\right)$(n6)(n2+3n120) $=$= $0$0

The factoring of the cubic equation was completed using polynomial division techniques. The quadratic factor cannot be broken into linear factors over the reals. Hence $n=6$n=6. However, since $n$n is an integer, you might notice, at the third line, that $6\times5\times4=120$6×5×4=120, and so the solution is determined as $n=6$n=6 even before the factoring step.

By definition, we say that 0!=1.

 

Examples

Question 1

Evaluate $5!$5!

This is a simple one, either on your calculator use the factorial button.  On my calculator it is listed as $x!$x! you may need to check your manual for yours, OR, we write down and evaluate long hand. 

$5!=5\times4\times3\times2\times1=120$5!=5×4×3×2×1=120

Question 2

Evaluate $\frac{6!}{4!}$6!4!

Long hand this looks like this 

$\frac{6!}{4!}$6!4! $=$= $\frac{6\times5\times4\times3\times2\times1}{4\times3\times2\times1}$6×5×4×3×2×14×3×2×1

But let's just write that right hand side a slightly different way. See how $6!$6! is also equal to $6\times5\times4!$6×5×4! So, 

$\frac{6!}{4!}$6!4! $=$= $\frac{6\times5\times4!}{4!}$6×5×4!4!
$=$= $6\times5$6×5
$=$= $30$30

Being able to simplify factorials in this way is very important, because anything higher than $12!$12! often results in scientific notation on hand held calculators, and over $70!$70! won't compute on hand held calculators. 

Question 3

Evaluate $\frac{7!\times4!}{5!\times2!}$7!×4!5!×2!

Let's use the trick we just learnt in question 2.  And simplify the numerator where we can first. 

$\frac{7!\times4!}{5!\times2!}$7!×4!5!×2! $=$= $\frac{(7\times6\times5!)\times(4\times3\times2!)}{5!\times2!}$(7×6×5!)×(4×3×2!)5!×2!
  $=$= $7\times6\times4\times3$7×6×4×3
$=$= $504$504

More Worked Examples

QUESTION 4

Simplify $\frac{7!}{5!}$7!5!

QUESTION 5

Simplify $\frac{6!}{4!4!}$6!4!4! by identifying common factors of the numerator and denominator.

Outcomes

12D.A.2.1

Recognize the use of permutations and combinations as counting techniques with advantages over other counting techniques, distinguish between situations that involve the use of permutations and those that involve the use of combinations, and make connections between, and calculate, permutations and combinations

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