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Dean has worn a white shirt on $6$ of the last $18$ days. What is the experimental probability that Dean will wear a white shirt tomorrow? $\newline$ Write your answer as a fraction or whole number. $\newline$ $P(\text{white}) = \_\_\_$

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Experimental probability

Full solution

Q. Dean has worn a white shirt on

6

of the last

18

days. What is the experimental probability that Dean will wear a white shirt tomorrow?

\newline

Write your answer as a fraction or whole number.

\newline

P(\text{white}) = \_\_\_

Identify Days: Identify the total number of days observed and the number of days Dean wore a white shirt. $\newline$ Total days observed = $18$ days, $\newline$ Days Dean wore white = $6$ days, $\newline$ We need to calculate the probability of Dean wearing a white shirt based on past data.
Calculate Probability: Calculate the experimental probability using the formula: $\newline$ Probability $P$ = $\frac{\text{Number of favorable outcomes}}{\text{Total number of outcomes}}$ , $\newline$ $P(\text{white}) = \frac{6}{18}$ .
Simplify Fraction: Simplify the fraction to find the probability in its simplest form. $\frac{6}{18}$ reduces to $\frac{1}{3}$ , So, the probability that Dean will wear a white shirt tomorrow is $\frac{1}{3}$ .

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