Back to Exercise: Apply the Addition Rule

Exercises: Apply the Addition Rule for the Probability of A or B

Work through each section in order. For "or" probabilities, decide first whether the events can both happen: if they can, subtract the overlap P(A and B); if they cannot, the overlap is 0 and you simply add. Convert counts to probabilities over a single sample space before applying the rule, and check that your answer is between 0 and 1. Write interpretations in complete sentences.

Grade 10·21 problems·~32 min·Common Core Math - HS Statistics and Probability·group·hss-cp-b-7
Work through problems with immediate feedback
A

Warm-Up: Union, Overlap, and the Right Rule

These problems review the ideas the Addition Rule is built on.

1.

You are asked to find the probability of "AA or BB." Which combining rule does the connective "or" point to?

2.

One card is drawn from a standard 52-card deck. Let $K = $ "a king" (4 cards) and $H = $ "a heart" (13 cards). How many cards belong to BOTH events, i.e. the overlap KK and HH?

3.

A spinner has 8 equal sections numbered 1 through 8. The event "lands on a multiple of 3" is {3,6}\{3, 6\}. Write the probability of this event as a fraction in the form (favorable)/(total). What is P(multiple of 3)P(\text{multiple of }3)?

B

Fluency Practice: Apply the Rule

Apply the Addition Rule. Decide whether there is an overlap to subtract.

1.

One card is drawn from a standard deck. Let $K = $ "a king" with P(K)=452P(K) = \frac{4}{52} and $H = $ "a heart" with P(H)=1352P(H) = \frac{13}{52}. The overlap is P(K and H)=152P(K \text{ and } H) = \frac{1}{52}. Use the Addition Rule to find P(K or H)P(K \text{ or } H) as a fraction with denominator 52.

2.

A single die is rolled. Let $A = $ "even" ={2,4,6}= \{2, 4, 6\} and $B = $ "greater than 3" ={4,5,6}= \{4, 5, 6\}, so AA and B={4,6}B = \{4, 6\}. Use the Addition Rule to find P(A or B)P(A \text{ or } B) as a fraction with denominator 6.

3.

Two events satisfy P(A)=0.5P(A) = 0.5, P(B)=0.4P(B) = 0.4, and P(A and B)=0.2P(A \text{ and } B) = 0.2. Use the Addition Rule to find P(A or B)P(A \text{ or } B) as a decimal.

4.

A single die is rolled. Let $C = $ "rolls a 2" and $D = $ "rolls a 5." A single roll cannot be both, so these events are mutually exclusive and P(C and D)=0P(C \text{ and } D) = 0. Find P(C or D)P(C \text{ or } D) as a fraction with denominator 6.

You're viewing 2 of 6 sections.

Create a free account to continue the full exercise set and save your progress.

Create free account
0 of 7 answered

Answer all problems to submit.