Permutation

Analyze each word problem to identify the needed data

Solve problems involving linear permutation, circular permutations and distinguishable permutation

Participate actively during the discussion

A teacher wants to assign 4 different tasks to her 4 students. in how many ways can she do it?

 $P\left(n,r\right)=n!\ \ \ \ \ \ \ \ where\ n=4\ ;\ r=4$ 

 $P\left(4,4\right)=4!$  

 24 ways

In how many  different ways can 12 people occupy 12 seats in front row of a mini theather?

 $P\left(n,r\right)=n!\ \ \ \ \ \ \ \ where\ n=12\ ;\ r=12$ 

 $P\left(12,12\right)=12!$  

 479,001,600 ways

In how many  different ways can 5 bicycles  be parked if there are 7 available parking spaces?

 $P\left(n,r\right)=\frac{n!}{\left(n-r\right)!}\ \ \ \ \ \ \ where\ n=7\ ;\ r=5$ 

 $P\left(7,5\right)=\frac{7!}{\left(7-5\right)!}$  

  $P=\frac{7!}{2!}$  

2,520 different ways

If there are 10 people and only 6 chairs are available, in how many ways they can be seated?

 $P\left(n,r\right)=\frac{n!}{\left(n-r\right)!}\ \ \ \ \ \ \ where\ n=10\ ;\ r=6$ 

 $P\left(7,5\right)=\frac{10!}{\left(10-6\right)!}$  

  $P=\frac{10!}{4!}$  

151,200 different ways

Find the number of different ways that the family of 6 can be seated around the circular table with 6 chairs?

 $P=\left(n-1\right)!\ \ \ \ \ \ \ where\ n=6\$ 

 $P=\left(6-1\right)!$  

  $P=5!$  

120 different ways

There are 12 people in a dinner gathering. In how many ways can the host arrange his guests around the table

 $P=\left(n-1\right)!\ \ \ \ \ \ \ where\ n=12$ 

 $P=\left(12-1\right)!$  

  $P=11!$  

39,916,800 different ways

Let us use Filipino traits in solving permutation

In how many different ways can the letters  of MAKADIYOS be arranged?

 $P=\frac{n!}{\left(p!\right)}!\ \ \ \ \ \ \ where\ n=9\ ;\ q=2$ 

 $P=\frac{9!}{2!}$  

181,440 different ways

In how many different ways can the letters  of MAPAGPAKUMBABA be arranged?

 $P=\frac{n!}{\left(p!q!r!s!\right)}\ \ \ where\ n=14\ ;\$  $\ p\ \left(M\right)=2\ \ ;q\ \left(A\right)\ =5\ ;\ r\ \left(P\right)=2\ ;\ s\ \left(B\right)=2$ 

 $P=\frac{14!}{\left(2!5!2!2!\right)}$  

90,810,720 different ways