Seven white balls and three black balls are randomly placed in a row. The probab

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Seven white balls and three black balls are randomly placed in a row. The probability that no two black balls are placed adjacently equals

Options:

A . 12

B . 715

C . 215

D . 13

Answer: Option B
:
B
The number of ways to arrange 7 white an 3 black balls in a row

\frac{10!}{7! .3!} = \frac{10.9.8}{1.2.3} = 120

Numbers of blank places between 7 balls are 6. There is 1 place before first ball and 1 place after last ball. Hence total number of places are 8.
Hence 3 black balls are arranged on these 8 places so that no two black balls are together in number of ways.

=^{8} C_{3} = \frac{8 \times 7 \times 6}{1 \times 2 \times 3} = 56

So required probability =

\frac{56}{120} = \frac{7}{15}

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