QUESTION IMAGE
Question
complete parts (a) through (c). write the probabilities as fractions.
(a) check the outcomes for each event below. then, enter the probability of the
event a: rolling a number from 5 to 6
event b: rolling an even number
event a or b: rolling a number from 5 to 6 or rolling an even number
event a and b: rolling a number from 5 to 6 and rolling an even number
(b) compute the following.
$p(a) + p(b) - p(a \text{ and } b)$
(c) select the answer that makes the
$p(a) + p(b) - p(a \text{ and } b) = $ dropdown with options: $p(a \text{ and } b)$, $p(a)$, $p(a \text{ or } b)$, $p(b)$
Part (a) - Identifying Outcomes
We assume we are rolling a standard six - sided die (numbers 1 - 6).
- Event A (Rolling 5 - 6): The outcomes are 5, 6. So we check the boxes for 5 and 6.
- Event B (Rolling even): Even numbers on a die are 2, 4, 6. So we check the boxes for 2, 4, 6.
- Event A or B: Outcomes that are in A or B. From A (5, 6) and B (2, 4, 6), the combined set is 2, 4, 5, 6. So we check the boxes for 2, 4, 5, 6.
- Event A and B: Outcomes that are in both A and B. A has 5, 6 and B has 2, 4, 6. The intersection is 6. So we check the box for 6.
Part (b) - Calculating Probabilities
A standard die has 6 possible outcomes.
- Step 1: Find \(P(A)\)
Event A has 2 outcomes (5, 6). So \(P(A)=\frac{\text{Number of outcomes in A}}{\text{Total outcomes}}=\frac{2}{6}\)
- Step 2: Find \(P(B)\)
Event B has 3 outcomes (2, 4, 6). So \(P(B)=\frac{\text{Number of outcomes in B}}{\text{Total outcomes}}=\frac{3}{6}\)
- Step 3: Find \(P(A\text{ and }B)\)
Event \(A\text{ and }B\) has 1 outcome (6). So \(P(A\text{ and }B)=\frac{\text{Number of outcomes in }A\text{ and }B}{\text{Total outcomes}}=\frac{1}{6}\)
- Step 4: Calculate \(P(A)+P(B)-P(A\text{ and }B)\)
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Part (c) - Identifying the Formula
By the principle of inclusion - exclusion for probability, \(P(A\text{ or }B)=P(A)+P(B)-P(A\text{ and }B)\). So the correct option to fill in the blank is \(P(A\text{ or }B)\)
Final Answers
- (a) Outcomes for A: 5, 6; Outcomes for B: 2, 4, 6; Outcomes for A or B: 2, 4, 5, 6; Outcomes for A and B: 6 (check the respective boxes).
- (b) \(P(A)+P(B)-P(A\text{ and }B)=\frac{2}{3}\)
- (c) The answer is \(P(A\text{ or }B)\)
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Part (a) - Identifying Outcomes
We assume we are rolling a standard six - sided die (numbers 1 - 6).
- Event A (Rolling 5 - 6): The outcomes are 5, 6. So we check the boxes for 5 and 6.
- Event B (Rolling even): Even numbers on a die are 2, 4, 6. So we check the boxes for 2, 4, 6.
- Event A or B: Outcomes that are in A or B. From A (5, 6) and B (2, 4, 6), the combined set is 2, 4, 5, 6. So we check the boxes for 2, 4, 5, 6.
- Event A and B: Outcomes that are in both A and B. A has 5, 6 and B has 2, 4, 6. The intersection is 6. So we check the box for 6.
Part (b) - Calculating Probabilities
A standard die has 6 possible outcomes.
- Step 1: Find \(P(A)\)
Event A has 2 outcomes (5, 6). So \(P(A)=\frac{\text{Number of outcomes in A}}{\text{Total outcomes}}=\frac{2}{6}\)
- Step 2: Find \(P(B)\)
Event B has 3 outcomes (2, 4, 6). So \(P(B)=\frac{\text{Number of outcomes in B}}{\text{Total outcomes}}=\frac{3}{6}\)
- Step 3: Find \(P(A\text{ and }B)\)
Event \(A\text{ and }B\) has 1 outcome (6). So \(P(A\text{ and }B)=\frac{\text{Number of outcomes in }A\text{ and }B}{\text{Total outcomes}}=\frac{1}{6}\)
- Step 4: Calculate \(P(A)+P(B)-P(A\text{ and }B)\)
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Part (c) - Identifying the Formula
By the principle of inclusion - exclusion for probability, \(P(A\text{ or }B)=P(A)+P(B)-P(A\text{ and }B)\). So the correct option to fill in the blank is \(P(A\text{ or }B)\)
Final Answers
- (a) Outcomes for A: 5, 6; Outcomes for B: 2, 4, 6; Outcomes for A or B: 2, 4, 5, 6; Outcomes for A and B: 6 (check the respective boxes).
- (b) \(P(A)+P(B)-P(A\text{ and }B)=\frac{2}{3}\)
- (c) The answer is \(P(A\text{ or }B)\)