If you roll a six-sided die 2400 times what is the best prediction possible for the number of times you will roll a 5
Assuming a fair die,
1/6 * 2400 = 400
How did you arrive at 26,297, @"Helper"?
To determine the best prediction for the number of times you will roll a 5 when rolling a six-sided die 2400 times, we need to understand the concept of probability.
When rolling a fair six-sided die, there are six equally likely outcomes: 1, 2, 3, 4, 5, and 6. Each outcome has a probability of 1/6 since there are six possible outcomes in total.
The probability of rolling a specific number, such as 5, in a single roll is therefore 1/6.
To find the best prediction for the number of times you will roll a 5 when rolling the die 2400 times, we can assume that each roll is independent and the probability of rolling a 5 remains the same (1/6) throughout.
The best prediction would then be equal to the expected value, which is the product of the probability of an event and the number of trials. In this case, the expected value would be:
Expected value = (Probability of rolling a 5) * (Number of trials)
Expected value = (1/6) * 2400
Expected value = 400
Therefore, the best prediction for the number of times you will roll a 5 when rolling a six-sided die 2400 times is 400 times.