you are challenged to a lucky draw game. if you draw a face card (k, q, j) from a standard deck of cards…

you are challenged to a lucky draw game. if you draw a face card (k, q, j) from a standard deck of cards, you earn 10 points. if you draw any other card, you lose 2 points. what is the expected value of a draw?\no 0.77\no 1.69\no 1.85\no 2.31
Answer
Explanation:
Step1: Calculate probability of drawing face - card
A standard deck has 52 cards and 12 face - cards. So the probability $P(F)$ of drawing a face - card is $P(F)=\frac{12}{52}=\frac{3}{13}$.
Step2: Calculate probability of drawing non - face card
The probability $P(N)$ of drawing a non - face card is $P(N)=1 - P(F)=1-\frac{3}{13}=\frac{10}{13}$.
Step3: Calculate expected value
The value of drawing a face - card $V(F) = 10$ and the value of drawing a non - face card $V(N)=- 2$. The expected value $E$ is given by $E=P(F)\times V(F)+P(N)\times V(N)$. Substitute the values: $E=\frac{3}{13}\times10+\frac{10}{13}\times(-2)=\frac{30 - 20}{13}=\frac{10}{13}\approx0.77$.
Answer:
0.77