A Box contain 5 red , 6 blue, 4 white balls. three ball is drawn at random. what is the probability of getting all the red colored balls?
In the answer we are considering n(E)=$^5C_3$$=$$^5C_2$ how?
I like to do these in steps.
First step: What is the probability of pulling out a red ball? Clearly it's $\frac{5}{5+6+4} = \frac{5}{15} = \frac{1}{3}$.
Second step: After removing one red ball, what's the probability of pulling out another red ball? In this case it is $\frac{4}{4+6+4} = \frac{4}{14} = \frac{2}{7}$.
What is the last step? What can you do to get the overall probability that these three events happen in succession?
Probability of getting 3 red balls$=$$ ^5C_3/15C_3= (5!/3!*2!)/(15!/3!*12!)= (5*4*3)/(15*14*13)= 2/91$