type the correct answer in the box. use numerals instead of words. for this question, an answer that is not a whole number should be entered as a decimal, rounded to the thousandths place. management at a restaurant is deciding whether to add a new italian or chinese dish to their menu. they randomly select customers to survey whether or not they would order each type of cuisine. the survey responses are shown in the two - way frequency table. use the table to complete the statements. the probability that a customer would order italian is . the probability that a customer would order chinese and would not order italian is . the probability that a customer would order italian given that they would not order chinese is .
| | would order chinese | would not order chinese | total |
|--|--|--|--|
| would order italian | 43 | 20 | 63 |
| would not order italian | 25 | 14 | 39 |
| total | 68 | 34 | 102 |

Question

type the correct answer in the box. use numerals instead of words. for this question, an answer that is not a whole number should be entered as a decimal, rounded to the thousandths place. management at a restaurant is deciding whether to add a new italian or chinese dish to their menu. they randomly select customers to survey whether or not they would order each type of cuisine. the survey responses are shown in the two - way frequency table. use the table to complete the statements. the probability that a customer would order italian is  . the probability that a customer would order chinese and would not order italian is  . the probability that a customer would order italian given that they would not order chinese is  .
| | would order chinese | would not order chinese | total |
|--|--|--|--|
| would order italian | 43 | 20 | 63 |
| would not order italian | 25 | 14 | 39 |
| total | 68 | 34 | 102 |

Accepted Answer

# Explanation:
## Step1: Recall conditional - probability formula
The formula for conditional probability is $P(A|B)=\frac{P(A\cap B)}{P(B)}$. In terms of frequencies from a two - way table, if we want to find the probability that a customer would order Italian given that they would not order Chinese, we use the formula $P(	ext{Italian}|	ext{Not Chinese})=\frac{n(	ext{Italian and Not Chinese})}{n(	ext{Not Chinese})}$.
## Step2: Identify relevant frequencies from the table
The number of customers who would not order Chinese is $n(	ext{Not Chinese}) = 34$. The number of customers who would not order Chinese and would order Italian is $n(	ext{Italian and Not Chinese})=20$.
## Step3: Calculate the probability
$P(	ext{Italian}|	ext{Not Chinese})=\frac{20}{34}\approx0.588$

The probability that a customer would order Chinese and would not order Italian is found by looking at the number of customers who would order Chinese and not Italian. The number of customers who would order Chinese and not Italian is $n(	ext{Chinese and Not Italian}) = 25$, and the total number of customers is $n(	ext{Total})=102$. So the probability $P(	ext{Chinese and Not Italian})=\frac{25}{102}\approx0.245$

The probability that a customer would order Italian is $P(	ext{Italian})=\frac{43 + 20}{102}=\frac{63}{102}\approx0.618$

# Answer:
0.588
0.245
0.618

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QUESTION IMAGE

Question

Explanation:

Step1: Recall conditional - probability formula

Step2: Identify relevant frequencies from the table

Step3: Calculate the probability

Answer: