A spinner with eight equally sized slices is shown below the eight slices are red the dial is spun and stops on a slice at random what is the probability that the dial stops on a red slice right your fraction as a whole number
Since there are eight equally sized slices and all of them are red, the probability of the dial stopping on a red slice is 8/8, which simplifies to 1.
There are 8 equally sized slices on the spinner, and all of them are red. So, the total number of favorable outcomes (red slices) is 8.
Since the spinner stops on a slice at random, the total number of possible outcomes is also 8 (since there are 8 slices in total).
Therefore, the probability of the dial stopping on a red slice can be calculated as:
P(red slice) = Number of favorable outcomes / Total number of possible outcomes
P(red slice) = 8 / 8
Simplifying the fraction, we get:
P(red slice) = 1
As a whole number, the probability that the dial stops on a red slice is 1.
To calculate the probability of the dial stopping on a red slice, we need to determine the number of red slices and the total number of possible outcomes.
In this case, there are eight equally sized slices, and all of them are red. So, the number of red slices is 8.
Since the spinner has eight slices in total, the total number of possible outcomes is also 8.
Now, to calculate the probability, we divide the number of desired outcomes (red slices) by the total number of possible outcomes:
Probability = Number of desired outcomes / Total number of possible outcomes
Probability = 8 (number of red slices) / 8 (total number of slices)
Simplifying the fraction, we have:
Probability = 1
Therefore, the probability of the dial stopping on a red slice is 1, which means it is certain that it will stop on a red slice.