which of these contexts describes a situation that is likely?\nanswer\nrolling a number greater than 1 on a…

which of these contexts describes a situation that is likely?\nanswer\nrolling a number greater than 1 on a standard six - sided die, numbered from 1 to 6.\nspinning a spinner divided into four equal - sized sections colored red/green/yellow/blue and landing on red.\nwinning a raffle that sold a total of 100 tickets if you bought 50 tickets.\nreaching into a bag full of 10 strawberry chews and 10 cherry chews without looking and pulling out a strawberry or a cherry chew.

which of these contexts describes a situation that is likely?\nanswer\nrolling a number greater than 1 on a standard six - sided die, numbered from 1 to 6.\nspinning a spinner divided into four equal - sized sections colored red/green/yellow/blue and landing on red.\nwinning a raffle that sold a total of 100 tickets if you bought 50 tickets.\nreaching into a bag full of 10 strawberry chews and 10 cherry chews without looking and pulling out a strawberry or a cherry chew.

Answer

Explanation:

Step1: Calculate probability of rolling a number greater than 1 on a die

A standard six - sided die has 6 possible outcomes. The numbers greater than 1 are 2, 3, 4, 5, 6. So there are 5 favorable outcomes. The probability $P_1=\frac{5}{6}\approx0.833$.

Step2: Calculate probability of landing on red on the spinner

The spinner has 4 equal - sized sections. The probability of landing on red is $P_2 = \frac{1}{4}=0.25$.

Step3: Calculate probability of winning the raffle

The raffle sold 100 tickets and you bought 50. The probability of winning is $P_3=\frac{50}{100}=0.5$.

Step4: Calculate probability of pulling out a strawberry or cherry chew

The bag has 10 strawberry and 10 cherry chews, a total of 20 chews. The probability of pulling out a strawberry or cherry chew is $P_4=\frac{10 + 10}{20}=1$.

Answer:

Reaching into a bag full of 10 strawberry chews and 10 cherry chews without looking and pulling out a strawberry or a cherry chew.