Find the probability that with one spin, the spinner will not stop on A. Write the answer as a reduced fraction.
letters - E A D E F C A B
Counter Clockwise
6/8 = 3/4
To find the probability that the spinner will not stop on A, we need to determine the total number of possible outcomes and the number of outcomes that do not result in A.
Total number of possible outcomes: There are 8 letters on the spinner, so the total number of possible outcomes is 8.
Number of outcomes that do not result in A: There are 7 letters on the spinner that are not A (E, D, E, F, C, A, B), so the number of outcomes that do not result in A is 7.
Probability = Number of outcomes that do not result in A / Total number of possible outcomes
= 7 / 8
Therefore, the probability that the spinner will not stop on A is 7/8.
To find the probability that the spinner will not stop on A, we need to determine the number of outcomes in which the spinner does not land on A and then divide it by the total number of possible outcomes.
Given the following letters on the spinner: E A D E F C A B, we can see that there are a total of 8 different letters.
To count the number of outcomes where the spinner does not land on A, we need to find the number of letters that are not A. Looking at the letters, we can see that there are a total of 5 letters that are not A: E, D, E, F, and C.
Therefore, the probability that the spinner will not stop on A is 5/8.
In reduced fraction form, the answer is 5/8.