4 probability – HP 42S User Manual

4 Probability

Probability functions are in ▀ PROB menu (over x key).
They are COMB, PERM, N!, GAM, RAN and SEED.

COMB: This calculates the number of combinations of N things taken r at a time. The order does
not matter. A thing cannot appear more than one time.

Example: If we have the five letters a, e, i, o and u the possible combinations taken one at a time are
{a,e,i,o,u}. This means 5 combinations.

Taken two at a time
{ae, ai, ao, au, ei, eo, eu, io, iu, ou}. This means 10 combinations.

Taken four at a time
{aeio, aeiu, aeou, aiou, eiou}. This means also 10 combinations.

The number of combinations is given by

C

 N , r=

N !

r !

 N −r!

(Where N!=N.(N-1).(N-2)...2.1)

To calculate this using 42S just enter N, press ENTER, enter r and press COMB.

PERM: This calculates the number of arrangements of N things taken r at a time. A thing cannot
appear more than one time but now the order matters.

Example: Five cars are in a race. Their colors are red, blue, green, white and cyan. What are the
possible results?

Solution: For the first position we have five possibilities. For the second position we have four
possibilities, and three possibilities for the third position. So we have 5x4x3=60 different
arrangements. To see this using 42S just enter 5, press ENTER, enter 3 and press PERM.

It is simple to realize that the number of arrangements is given by

A

N , r=N. N −1...N −r1=

N !

 N −r!

In particular if r=N (all the things are taken) then the arrangements are called permutations and the
number of permutation is N!.

Example: In how many ways we can re-arrange the letters of the word “love”.
Solution: 4!=24.

N!: This just calculates the factorial of N given by N!=N.(N-1)...1 for a number (non-negative
integer). The biggest number allowed is HP-42S is 253 and in Free42 is 170.

GAM: This is the Gamma function which is defined by

Γ a=

∫

0

∞

x

a

−1

e

−x

dx