Question

determine the probability of each situation.

1. a bag contains 25 marbles: 10 black, 13 red, and 2 blue. what is the probability of getting a red or a blue marble?
2. what is the probability of drawing a jack or a club from a standard deck of playing cards?
3. numbers 1 - 10 are written on cards and placed in a bag. what is the probability of choosing 8 or choosing a number less than 5?
4. the letters a - p are written on cards and placed in a bag. what is the probability of choosing an e or choosing a vowel?
5. a spinner contains the numbers 3, 4, 5, and 6 on equal sized wedges. what is the probability of spinning an even number or a number greater than 5?
6. what is the probability of rolling an even number or an odd number on a standard 6 -sided die?
7. what is the probability of drawing an ace or a queen from a standard deck of playing cards?
8. what is the probability of drawing a king or a red card from a standard deck of playing cards?

Explanation:

Problem 1

Step1: Identify favorable and total outcomes

Total marbles = 25. Red marbles = 13, Blue marbles = 2.

Step2: Calculate probabilities and sum

Probability of red: $P(\text{red}) = \frac{13}{25}$, Probability of blue: $P(\text{blue}) = \frac{2}{25}$. Since mutually exclusive, $P(\text{red or blue}) = \frac{13}{25} + \frac{2}{25} = \frac{15}{25} = \frac{3}{5}$.

Step1: Recall deck composition

Standard deck: 52 cards. Jacks: 4, Clubs: 13, Jack of Clubs: 1 (overlap).

Step2: Apply inclusion - exclusion principle

$P(\text{Jack or Club}) = P(\text{Jack}) + P(\text{Club}) - P(\text{Jack and Club}) = \frac{4}{52} + \frac{13}{52} - \frac{1}{52} = \frac{16}{52} = \frac{4}{13}$.

Step1: Identify favorable outcomes

Numbers 1 - 10. Number 8: 1 outcome. Numbers less than 5: 1,2,3,4 (4 outcomes). No overlap.

Step2: Calculate probability

Total outcomes = 10. $P(8 \text{ or } <5) = \frac{1 + 4}{10} = \frac{5}{10} = \frac{1}{2}$.

Answer:

$\frac{3}{5}$

Problem 2