Difference between revisions of "Factorial"

Revision as of 00:30, 30 March 2011

The factorial is an important function in combinatorics and analysis, used to determine the number of ways to arrange objects.

Definition

The factorial is defined for positive integers as $n!=n \cdot (n-1) \cdots 2 \cdot 1 = \prod_{i=1}^n i$ . Alternatively, a recursive definition for the factorial is $n!=n \cdot (n-1)!$ .

Examples

$0! = 1$
$1! = 1$
$2! = 2$
$3! = 6$
$4! = 24$
$5! = 120$
$6! = 720$
$7! = 5040$
$8! = 40320$
$9! = 362880$
$10! = 3628800$
$11! = 39916800$
$12! = 479001600$
$13! = 6227020800$
$14! = 87178291200$
$15! = 1307674368000$
$16! = 20922789888000$
$17! = 355687428096000$
$18! = 6402373705728000$
$19! = 121645100408832000$
$20! = 2432902008176640000$
$21! = 51090942171709440000$
$22! = 1124000727777607680000$
$23! = 25852016738884976640000$
$24! = 620448401733239439360000$
$25! = 15511210043330985984000000$
$26! = 403291461126605635584000000$
$27! = 10888869450418352160768000000$
$28! = 304888344611713860501504000000$
$29! = 8841761993739701954543616000000$
$30! = 265252859812191058636308480000000$
$31! = 8222838654177922817725562880000000$
$32! = 263130836933693530167218012160000000$
$33! = 8683317618811886495518194401280000000$
$34! = 295232799039604140847618609643520000000$
$35! = 10333147966386144929666651337523200000000$
$36! = 371993326789901217467999448150835200000000$
$37! = 13763753091226345046315979581580902400000000$
$38! = 523022617466601111760007224100074291200000000$
$39! = 20397882081197443358640281739902897356800000000$
$40! = 815915283247897734345611269596115894272000000000$
$41! = 33452526613163807108170062053440751665152000000000$
$42! = 1405006117752879898543142606244511569936384000000000$
$43! = 60415263063373835637355132068513997507264512000000000$
$44! = 2658271574788448768043625811014615890319638528000000000$
$45! = 119622220865480194561963161495657715064383733760000000000$
$46! = 5502622159812088949850305428800254892961651752960000000000$
$47! = 258623241511168180642964355153611979969197632389120000000000$
$48! = 12413915592536072670862289047373375038521486354677760000000000$
$49! = 608281864034267560872252163321295376887552831379210240000000000$
$50! = 30414093201713378043612608166064768844377641568960512000000000000$
$51! = 1551118753287382280224243016469303211063259720016986112000000000000$
$52! = 80658175170943878571660636856403766975289505440883277824000000000000$
$53! = 4274883284060025564298013753389399649690343788366813724672000000000000$
$54! = 230843697339241380472092742683027581083278564571807941132288000000000000$
$55! = 12696403353658275925965100847566516959580321051449436762275840000000000000$
$56! = 710998587804863451854045647463724949736497978881168458687447040000000000000$
$57! = 40526919504877216755680601905432322134980384796226602145184481280000000000000$
$58! = 2350561331282878571829474910515074683828862318181142924420699914240000000000000$
$59! = 138683118545689835737939019720389406345902876772687432540821294940160000000000000$
$60! = 8320987112741390144276341183223364380754172606361245952449277696409600000000000000$ (Note: this number is 82 digits long with 14 terminal zeroes!)
$1000!$ is 2568 digits long and has as much as 249 terminal zeroes!

Additional Information

By convention, $0!$ is given the value $1$ .

The gamma function is a generalization of the factorial to values other than nonnegative integers.

Prime Factorization

Main article: Prime factorization

Documentation

Use {{hatnote|text}} </noinclude>

Since $n!$ is the product of all positive integers not exceeding $n$ , it is clear that it is divisible by all primes $p\le n$ , and not divisible by any prime $p>n$ . But what is the power of a prime $p\le n$ in the prime factorization of $n!$ ? We can find it as the sum of powers of $p$ in all the factors $1,2,\dots, n$ ; but rather than counting the power of $p$ in each factor, we shall count the number of factors divisible by a given power of $p$ . Among the numbers $1,2,\dots,n$ , exactly $\left\lfloor\frac n{p^k}\right\rfloor$ are divisible by $p^k$ (here $\lfloor\cdot\rfloor$ is the floor function). The ones divisible by $p$ give one power of $p$ . The ones divisible by $p^2$ give another power of $p$ . Those divisible by $p^3$ give yet another power of $p$ . Continuing in this manner gives

$\left\lfloor\frac n{p}\right\rfloor+ \left\lfloor\frac n{p^2}\right\rfloor+ \left\lfloor\frac n{p^3}\right\rfloor+\dots$

for the power of $p$ in the prime factorization of $n!$ . The series is formally infinite, but the terms converge to $0$ rapidly, as it is the reciprocal of an exponential function. For example, the power of $7$ in $100!$ is just $\left\lfloor\frac {100}{7}\right\rfloor+ \left\lfloor\frac {100}{49}\right\rfloor=14+2=16$ ( $7^3=343$ is already greater than $100$ ).

Uses

The factorial is used in the definitions of combinations and permutations, as $n!$ is the number of ways to order $n$ distinct objects.

Problems

Introductory

Find the units digit of the sum

$\sum_{i=1}^{100}(i!)^{2}$

$\mathrm{(A)}\,0\quad\mathrm{(B)}\,1\quad\mathrm{(C)}\,3\quad\mathrm{(D)}\,5\quad\mathrm{(E)}\,7\quad\mathrm{(F)}\,9$ (Source)

Intermediate

Let $P$ be the product of the first $100$ positive odd integers. Find the largest integer $k$ such that $P$ is divisible by $3^k .$

(Source)

Olympiad

Let $p_n (k)$ be the number of permutations of the set $\{ 1, \ldots , n \} , \; n \ge 1$ , which have exactly $k$ fixed points. Prove that $\sum_{k=0}^{n} k \cdot p_n (k) = n!$ .