Respuesta :
The probability that he pulls out either a black or white sock, puts it back and then pulls out a brown sock is [tex](\frac{22}{169} )[/tex]
Step-by-step explanation:
Here , as given the total number of:
White Socks = 16
Brown Socks = 4
Black socks = 6
So, the total number of socks in the drawer = 16 + 4 + 6 = 26 socks
Now, the probability of picking a sock either a black or white sock is
[tex]= \frac{\textrm{Total number of black + white sock}}{\textrm{The total number of socks}} = \frac{16+6}{26} = \frac{22}{26} = \frac{11}{13}[/tex]
Also, the picked sock is replaced. So, now the total socks are same = 26.
the probability of picking a brown sock is
[tex]= \frac{\textrm{Total number of brown sock}}{\textrm{The total number of socks}} = \frac{4}{26} = \frac{2}{13}[/tex]
Now, since both events are independent events , so the combined probability is given as:
P (E) = [tex](\frac{11}{13} )\times (\frac{2}{13} ) = (\frac{22}{169} )[/tex]
Hence, the probability that he pulls out either a black or white sock, puts it back and then pulls out a brown sock is [tex](\frac{22}{169} )[/tex]
