Question

Uestion 2 (1 point)

Jeremy is picking out dinners to make. He has 25 to choose from in his cookbook.
13 are meat dishes, 8 are pasta dishes, and 4 are soups. of the recipes are
chicken, ş are beef, and are vegetarian. Which statement below is FALSE?
The probability of choosing a meat dish is equal to the probability of choosing a
pasta dish or a soup.
The probability of choosing a pasta dish is 32%.
The probability of choosing a recipe with chicken, beef, or neither is equal.​

Answer 1

The probability of choosing a meat dish is equal to the probability of choosing a pasta dish or a soup

Explanation:

its false

Answer 2

-The probability of choosing a meat dish is equal to the probability of choosing a pasta dish or a soup(
`P(meat)\\eq P(pasta)+P(soup)`)

Explanation:

Given that the number of events is 25 and 13 are meat dishes, 8 are pasta dishes, and 4 are soups.

-Probability is defined as the number of successful event divide by the total number of events.

#find probability of each event:

`P(meat)=(13)/(25)=0.52\\\\P(pasta)=(8)/(25)=0.32\\\\P(soup)=(4)/(25)=0.16`

`P(meat)\\eq P(pasta)\\eq P(soup)`

Hence, the FALSE choice is:The probability of choosing a meat dish is equal to the probability of choosing a pasta dish or a soup.