Question

A bag contains 8 red, 3 white and 9 blue balls. If three balls are drawn at random, determine the probability that  all the balls are of different colours.

Answer 1

Out of  20 balls, three balls can be drawn in ²⁰C₃ ways.
∴ Total number of elementary events = ²⁰C₃

Out of eight red balls, one red ball can be drawn in ⁸C₁ ways.
Out of three white balls, one white ball can be drawn in ³C₁.
Out of nine blue balls, one blue ball can be drawn in ⁹C₁ ways.
So, favourable number of elementary events = ⁸C₁ × ³C₁ × ⁹C₁
Hence, required probability =\[\frac{^{8}{}{C}_1 \times ^{3}{}{C}_1 \times^{9}{}{C}_1}{^{20}{}{C}_3} = \frac{8 \times 3 \times 9}{60 \times 19} = \frac{18}{95}\]