wiz-icon
MyQuestionIcon
MyQuestionIcon
1
You visited us 1 times! Enjoying our articles? Unlock Full Access!
Question

Sixteen players P1.P2.P16 play in a tournament. They are divided into eight pairs at random.From each pair a winner is decided on the basis of a game played between the two players of the pair.Assuming that all the players are of equal strength, the probability that exactly one of the two players P1 and P2 is among the eight winners is

A
415
No worries! We‘ve got your back. Try BYJU‘S free classes today!
B
715
No worries! We‘ve got your back. Try BYJU‘S free classes today!
C
815
Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses
D
1730
No worries! We‘ve got your back. Try BYJU‘S free classes today!
Open in App
Solution

The correct option is C 815
Let E1(E2) denote the event that P1 and P2 are paired (not paired) together and let A denote the event that one of two players P1 and P2is among the winners.
Since, P1 can be paired with any of the remaining 15 players.
We have, P(E1)=115
and P(E2)=1P(E1)=1115=1415
In case E1 occurs, it is certain that one of P1 and P2 will be among the winners. In case E2 occurs, the probability that exactly of P1 and P2 is among the winners is
P{(P1¯P2)(¯P1P2)}=P(P1¯P2)+P(¯P1P2)=P(P1)P(¯P2)+P(¯P1)P(P2)=(12)(112)+(112)(12)=14+14=12
ie, P(AE1)=1 and P(AE2)=12
By the total probability Rule,
P(A)=P(E1).P(AE1)+P(E1).P(AE2)=115(1)+1415(12)=815

flag
Suggest Corrections
thumbs-up
0
similar_icon
Similar questions
Join BYJU'S Learning Program
similar_icon
Related Videos
thumbnail
lock
Total Probability Theorem
MATHEMATICS
Watch in App
Join BYJU'S Learning Program
CrossIcon