The table below shows the results of flipping two coins. How does the experimental probability of getting HH compares to the theoractical how does the experimental probability of getting HH compares to the theoretical probability of getting HH?
5 answers
The table is missing, so we cannot provide an answer.
The table below shows the result of flipping two coins. How does the experimental probability of getting HH compared to the theoretical probability of getting HH?
theoretical is 1/2 * 1/2 = 1/4
As we do not have the table, we cannot determine the experimental probability of getting HH by counting the actual number of times the coins landed on heads (H) both times out of the total number of trials. However, we can determine the theoretical probability of getting HH by using the formula:
Theoretical probability = number of desired outcomes / total number of outcomes
For flipping two coins, there are four possible outcomes: HH, HT, TH, and TT. Out of these outcomes, getting HH is the desired outcome.
Therefore, the theoretical probability of getting HH is 1/4 or 0.25.
To compare the theoretical probability with the experimental probability, we need to know the actual results of flipping the coins. Without that information, we cannot make a comparison.
Theoretical probability = number of desired outcomes / total number of outcomes
For flipping two coins, there are four possible outcomes: HH, HT, TH, and TT. Out of these outcomes, getting HH is the desired outcome.
Therefore, the theoretical probability of getting HH is 1/4 or 0.25.
To compare the theoretical probability with the experimental probability, we need to know the actual results of flipping the coins. Without that information, we cannot make a comparison.
Without the table, we cannot determine the experimental probability of getting HH. However, we can compare the experimental probability to the theoretical probability of getting HH, which is 1/4. If the experimental probability is close to 1/4, it would support the idea that the outcomes of the coin flips are random and follow the laws of probability. If the experimental probability is significantly different from 1/4, it might suggest that the coin is biased or that there is some other factor at play that affects the outcomes of the coin flips.