Questions: Find the experimental probability (aka relative frequency): Roll dice: 1,3,3,4,4 P(1)= 2 / 5 1 / 6 1 / 5 3 / 5

Transcript text: Find the experimental probability (aka relative frequency): Roll dice: $1,3,3,4,4$ \[ P(1)= \] $2 / 5$ $1 / 6$ $1 / 5$ $3 / 5$

Solution

Solution Steps

To find the experimental probability of rolling a 1, we need to count the number of times 1 appears in the given set of dice rolls and divide it by the total number of rolls.

Solution Approach

Count the occurrences of the number 1 in the list of dice rolls.
Divide this count by the total number of dice rolls to get the experimental probability.

Step 1: Count the occurrences of 1

We count the number of times the number 1 appears in the list of dice rolls: \[ \text{count\_of\_1} = 1 \]

Step 2: Determine the total number of rolls

We determine the total number of dice rolls: \[ \text{total\_rolls} = 5 \]

Step 3: Calculate the experimental probability

We calculate the experimental probability by dividing the count of 1 by the total number of rolls: \[ P(1) = \frac{\text{count\_of\_1}}{\text{total\_rolls}} = \frac{1}{5} = 0.2 \]