In a tournament each of the participants was to play one match
against each of the other participants. 3 players fell ill after each
of them had played 3 matches and had to leave the tournament .
What was the total number of the participants at the beginning ,
if the total number of the matches played was 75 ?

Question

In a tournament each of the participants was to play one match 
against each of the other participants. 3 players fell ill after each
of them had played 3 matches and had to leave the tournament .
What was the total number of the participants at the beginning ,
if the total number of the matches played was 75 ?

mathmath333 · Answer

$\large \color{black}{\begin{align}
& \normalsize \text{In a tournament each of the participants was to play one match }  \hspace{.33em}\~\
& \normalsize \text{against each of the other participants. 3 players fell ill after each}  \hspace{.33em}\~\
& \normalsize \text{of them had played 3 matches and had to leave the tournament .}  \hspace{.33em}\~\
& \normalsize \text{What was the total number of the participants at the beginning ,}  \hspace{.33em}\~\
& \normalsize \text{if the total number of the matches played was 75 ?}  \hspace{.33em}\~\
& a.)\ 8  \hspace{.33em}\~\
& b.)\ 10  \hspace{.33em}\~\
& c.)\ 12  \hspace{.33em}\~\
& d.)\ 15  \hspace{.33em}\~\
\end{align}}$

mathmath333 · Answer

option d.) is given correct

anonymous · Answer

similar problem to Nourage's.

look up the "handshake problem"

imqwerty · Answer

:D

mathmath333 · Answer

that problem is easy this question has twists

imqwerty · Answer

ok what i think -
let the no. of ppl be x
number of matches played if we don't count those 3 ppl=(x-3)!
nd if u count those 3 ppl we have to include the matches played by them =9

so (x-3)!+9+75

nd here comes up the twist

imqwerty · Answer

did i do any mistake out there? ^

anonymous · Answer

suppose there are 12 people in a room and each person is to shake the hand of everyone else in the room (excluding themself).

the 1st person will shake hands with 11 others,
the 2nd person will shake the hand of 10 others (already counted shaking hands with the 1st person), etc.
11+10+9+8+7+6+5+4+3+2+1 = 66

now 3 people shook hands with 3 people each for a total of 9.

66+9 = 75

anonymous · Answer

so, 15 people

imqwerty · Answer

wait i got my mistake :)

anonymous · Answer

$$\left(\begin{matrix}n \ 2\end{matrix}\right)+9=75$$solve for n

imqwerty · Answer

it should be $$\frac{ (n-3)(2+(n-4)) }{ 2}$$ instead of (n-3)!

so we get-
(n-3)(2+(n-4))/2 + 9 =75

n=14

anonymous · Answer

it's interesting... i put it all there and perhaps you don't  understand but why offer something with no reasoning and the wrong answer to boot?

anonymous · Answer

$$\left(\begin{matrix}n \ 2\end{matrix}\right)+9=75$$n=12
but you have to add 3 for the 3 that dropped out... n=12 is the number who stayed in and played each of the other 11 teams once/

triciaal · Answer

@UnkleRhaukus please help

sohailiftikhar · Answer

here we are given that each participant was to play one match against each one participant

sohailiftikhar · Answer

and let we consider participants 1,2,3,4,5,6,7etc we have to find the pairs

sohailiftikhar · Answer

like 1-2 ,1-3 ,1-4 ,1-5 etc but we are given that number of matches are 75 so we have to consider those numbers by which we can arrange that matches so start from 8

sohailiftikhar · Answer

hey got my point or not ?

sohailiftikhar · Answer

like we are given set {1,2,3,4,5,6} so we are asked that find the number of order pairs ..

sohailiftikhar · Answer

it looks like i'm talking to myself ..