Roger completed a probability experiment with a coin. He flipped the coin 32 times, and it landed on tails eight times. He looked at the results of his experiment to determine the ratio of heads outcomes to tails outcomes.
To determine the ratio of heads outcomes to tails outcomes, we need to find the number of heads outcomes.
Since Roger flipped the coin 32 times and it landed on tails eight times, the number of heads outcomes is 32 - 8 = <<32-8=24>>24.
Therefore, the ratio of heads outcomes to tails outcomes is 24/8 = <<24/8=3>>3/1.
To determine the ratio of heads outcomes to tails outcomes, we need to count the number of heads outcomes and tails outcomes.
Given that Roger flipped the coin 32 times and got 8 tails, we can find the number of heads outcomes by subtracting the number of tails outcomes from the total number of flips:
Number of heads outcomes = Total number of flips - Number of tails outcomes
Number of heads outcomes = 32 - 8 = 24
Now that we have the number of heads outcomes and tails outcomes, we can calculate the ratio:
Ratio of heads outcomes to tails outcomes = Number of heads outcomes / Number of tails outcomes
Ratio of heads outcomes to tails outcomes = 24 / 8 = 3/1
Therefore, the ratio of heads outcomes to tails outcomes is 3:1.
To determine the ratio of heads outcomes to tails outcomes, we need to calculate the number of heads outcomes. Since the coin was flipped 32 times, the number of heads outcomes can be found by subtracting the number of tails outcomes from the total number of flips.
Number of heads outcomes = Total number of flips - Number of tails outcomes
Number of heads outcomes = 32 - 8
Number of heads outcomes = 24
The ratio of heads outcomes to tails outcomes can be expressed as:
Ratio = Number of heads outcomes / Number of tails outcomes
Ratio = 24 / 8
Ratio = 3
Therefore, the ratio of heads outcomes to tails outcomes is 3:1, meaning for every 3 heads, there is 1 tail.