Answers:
without replacement: a) 86/969 b)80/323
with replacement: a)853/6859 b)1440/6859
Step-by-step explanation:
if the balls are not replaced
the equal probable results of experiment
the outcome space :
[tex]S=[R_{1} R_{2} R_{3} ,R_{1} R_{2} G_{1} ,R_{1} R_{2} B_{1}..........][/tex], and there are 19.18.17 elements in S.
where
R- event that all three balls are red.
G- events that all three balls are green.
B- events that all three balls are blue.
and the number of possibilities from S that are in Red is 5.4.3 there are 6.5.4 events in blue, and 8.7.6 in green
[tex]P(R)+P(B)+P(G)=(5.4.3/19.18.17)+(6.5.4/19.18.17)+(8.7.6/19.18.17)[/tex]
[tex]=86/969[/tex]
if the balls are placed
the equal probable results of experiment
the outcome space :
[tex]S=[R_{1} R_{2} R_{3}, R_{1} R_{2} G_{1},R_{1} R_{2} B_{1} .........][/tex]
and there are 19.19.19 elements in S.
R- event that all three balls are red.
G- events that all three balls are green.
B- events that all three balls are blue.
and the number of possibilities from S are in red is 5.5.5, there are 6.6.6 events in blue and 8.8.8 in green
thus the result is:
[tex]P(R)+P(B)+P(G)=(5^3/19^3)+(6^3/19^3)+(8^3/19^3)=853/6859[/tex]
if the balls are not replaced
the equal probable results of experiment
the outcome space :
[tex]S=[R_{1} R_{2} R_{3}, R_{1} R_{2} B_{1} ,R_{1} R_{2} G_{1}..... ][/tex]
and there are 19.18.17 elements in S
and if all balls have to be in different colors.
choose one of the 5 red balls, 1 of the 6 green balls and 1 of the 8 green balls. and for every choice of red, a green and a blue ball they can be permuted 3! ways
[tex]P(R,B,G)=(5.6.8.3!/19.18.17)=80/323[/tex]
if the balls are replaces then
[tex]P(R,B,G)=(5.6.8.3!/19^3)=1440/6859[/tex]
