7. - / 14 points
a random sample of people was taken and their blood types were recorded. the table below shows the probabilities of blood types from that sample.
(a) fill in the missing blanks in the table.
| | a | b | ab | o | total |
|rh+| 0.31 | 0.11 | 0.04 | 0.39 | |
|rh-| 0.05 | 0.02 | 0.01 | | |
|total| | | | | |
(b) what is the probability a person will have type o blood?
(c) what is the probability a person will be rh- given he or she has type a blood? (give your answer to 4 decimals.)
(d) what is the probability a person will have type b blood given that he or she is rh+? (give your answer to 4 decimals.)
(e) what is the probability that a married couple will both be rh-? (give your answer to 4 decimals.)
hint: are each partners blood type independent?
(f) what is the probability that a married couple will both have type a blood? (give your answer to 4 decimals.)
(g) what is the probability that at least one partner in a married couple will have type ab blood? (give your answer to 4 decimals.)

Question

7. - / 14 points
a random sample of people was taken and their blood types were recorded. the table below shows the probabilities of blood types from that sample.
(a) fill in the missing blanks in the table.
| | a | b | ab | o | total |
|rh+| 0.31 | 0.11 | 0.04 | 0.39 |  |
|rh-| 0.05 | 0.02 | 0.01 |  |  |
|total|  |  |  |  |  |
(b) what is the probability a person will have type o blood?
(c) what is the probability a person will be rh- given he or she has type a blood? (give your answer to 4 decimals.)
(d) what is the probability a person will have type b blood given that he or she is rh+? (give your answer to 4 decimals.)
(e) what is the probability that a married couple will both be rh-? (give your answer to 4 decimals.)
hint: are each partners blood type independent?
(f) what is the probability that a married couple will both have type a blood? (give your answer to 4 decimals.)
(g) what is the probability that at least one partner in a married couple will have type ab blood? (give your answer to 4 decimals.)

Accepted Answer

### Part (a)
#### Step 1: Calculate Rh+ Total
Sum the probabilities for Rh+: $ 0.31 + 0.11 + 0.04 + 0.39 = 0.85 $
#### Step 2: Calculate Rh- O
First, find Rh- total. The grand total should be 1. So Rh- total is $ 1 - 0.85 = 0.15 $. Then, Rh- O is $ 0.15 - (0.05 + 0.02 + 0.01) = 0.07 $
#### Step 3: Calculate Rh- Total
As above, $ 0.05 + 0.02 + 0.01 + 0.07 = 0.15 $
#### Step 4: Calculate A Total
$ 0.31 + 0.05 = 0.36 $
#### Step 5: Calculate B Total
$ 0.11 + 0.02 = 0.13 $
#### Step 6: Calculate AB Total
$ 0.04 + 0.01 = 0.05 $
#### Step 7: Calculate O Total
$ 0.39 + 0.07 = 0.46 $
#### Step 8: Grand Total
$ 0.85 + 0.15 = 1 $ (or sum of totals: $ 0.36 + 0.13 + 0.05 + 0.46 = 1 $)

Filled table:
|       | A    | B    | AB   | O    | Total |
|-------|------|------|------|------|-------|
| Rh+   | 0.31 | 0.11 | 0.04 | 0.39 | 0.85  |
| Rh-   | 0.05 | 0.02 | 0.01 | 0.07 | 0.15  |
| Total | 0.36 | 0.13 | 0.05 | 0.46 | 1.00  |

### Part (b)
#### Step 1: Probability of O blood
From the total row, O total is $ 0.39 + 0.07 = 0.46 $
# Answer: $ 0.46 $

### Part (c)
#### Step 1: Use Conditional Probability Formula
$ P(\text{Rh-} | \text{A}) = \frac{P(\text{Rh- and A})}{P(\text{A})} $
$ P(\text{Rh- and A}) = 0.05 $, $ P(\text{A}) = 0.36 $
#### Step 2: Calculate the Probability
$ \frac{0.05}{0.36} \approx 0.1389 $
# Answer: $ 0.1389 $

### Part (d)
#### Step 1: Use Conditional Probability Formula
$ P(\text{B} | \text{Rh+}) = \frac{P(\text{B and Rh+})}{P(\text{Rh+})} $
$ P(\text{B and Rh+}) = 0.11 $, $ P(\text{Rh+}) = 0.85 $
#### Step 2: Calculate the Probability
$ \frac{0.11}{0.85} \approx 0.1294 $
# Answer: $ 0.1294 $

### Part (e)
#### Step 1: Probability of Rh- for one person
From Rh- total, $ 0.15 $. Since independent, multiply: $ 0.15 \times 0.15 = 0.0225 $
# Answer: $ 0.0225 $

### Part (f)
#### Step 1: Probability of A for one person
From A total, $ 0.36 $. Multiply for two independent people: $ 0.36 \times 0.36 = 0.1296 $
# Answer: $ 0.1296 $

### Part (g)
#### Step 1: Probability of neither having AB
Probability of not AB for one person: $ 1 - 0.05 = 0.95 $. For two: $ 0.95 \times 0.95 = 0.9025 $
#### Step 2: Probability of at least one AB
$ 1 - 0.9025 = 0.0975 $
# Answer: $ 0.0975 $

### Final Answers
(a) Filled table as above.
(b) $\boldsymbol{0.46}$
(c) $\boldsymbol{0.1389}$
(d) $\boldsymbol{0.1294}$
(e) $\boldsymbol{0.0225}$
(f) $\boldsymbol{0.1296}$
(g) $\boldsymbol{0.0975}$

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QUESTION IMAGE

Question

Explanation:

Part (a)

Step 1: Calculate Rh+ Total

Step 2: Calculate Rh- O

Step 3: Calculate Rh- Total

Step 4: Calculate A Total

Step 5: Calculate B Total

Step 6: Calculate AB Total

Step 7: Calculate O Total

Step 8: Grand Total

Part (b)

Step 1: Probability of O blood

Answer:

Part (c)

Step 1: Use Conditional Probability Formula

Step 2: Calculate the Probability