luka has a bag containing 5 socks: 3 red, 1 white, and 1 black. he draws 1 sock out of the bag, replaces it…

luka has a bag containing 5 socks: 3 red, 1 white, and 1 black. he draws 1 sock out of the bag, replaces it, and then draws another sock. what is the probability that he will draw a black sock and then a red sock, p(black, then red)?\n$\frac{1}{25}$\n$\frac{1}{15}$\n$\frac{3}{15}$\n$\frac{3}{25}$
Answer
Explanation:
Step1: Calculate probability of drawing black sock
The probability of drawing a black sock on the first draw is the number of black socks divided by the total number of socks. There is 1 black sock and 5 total socks, so $P(\text{black})=\frac{1}{5}$.
Step2: Calculate probability of drawing red sock
Since the sock is replaced, the total number of socks remains 5 for the second - draw. There are 3 red socks, so $P(\text{red})=\frac{3}{5}$.
Step3: Calculate probability of both events
For independent events (drawing with replacement), the probability of both events occurring is the product of their individual probabilities. So $P(\text{black, then red})=P(\text{black})\times P(\text{red})=\frac{1}{5}\times\frac{3}{5}=\frac{3}{25}$.
Answer:
$\frac{3}{25}$