Ten persons numbered 1, ,2 ..,10 play a chess tournament, each player against every other player exactly one game. It is known that no game ends in a
Ten persons numbered 1, ,2
..,10 play a chess tournament, each player against every other player exactly
one game. It is known that no game ends in a draw. If `w_1, w_2, , w_(10)`
are the
number of games won by players 1, ,2 3, ...,10, respectively, and `l_1, l_2, , l_(10)`
are the
number of games lost by the players 1, 2, ...,10, respectively, then
a. `sumw_1=suml_i=45`
b. `w_1+1_i=9`
c. `sumw l1 2()_=81+suml1 2`
d. `sumw l i2()_=suml i2`
A. `sumw_(i)^(2)+81-suml_(i)^(2)`
B. `sumw_(i)^(2)+81=suml_(i)^(2)`
C. `sumw_(i)^(2)=suml_(i)^(2)`
D. None of these
1 Answers
Correct Answer - C
Clearly, each player will play 9 games.
`therefore`Total number of games=`.^(10)C_(2)=45`
clearly, `w_(i)+l_(i)=9 and sumw_(i)=suml_(i)=45`
`impliesw_(i)=9-l_(i)impliesw_(1)^(2)=81-18l_(i)+l_(i)^(2)`
`impliesumw_(i)^(2)=sum81-18suml_(i)+suml_(1)^(2)`
`=81xx10-18xx45+suml_(i)^(2)=suml_(1)^(2)`.