If the events are independent, the probability of both/all events occurring is determined by multiplying the probabilities of the individual events.
Assuming equal amount of odd and even numbers, the probability of getting one odd number is .5.
Assuming equal amount of odd and even numbers, the probability of getting one odd number is .5.
Let's assume that both spinners have "n" sections and that each section is equally likely to be landed on when spun.
Now, we need to find the number of odd numbers on each spinner. If there are "m" odd numbers on each spinner, the probability of landing on an odd number on either spinner is m/n.
Since the spinners are spun independently, the probability of landing an odd number on both spinners is the product of the individual probabilities, given by (m/n) * (m/n).
Therefore, the probability of getting two odd numbers can be calculated as P = (m/n) * (m/n).
Please provide the number of equally divided sections on each spinner and the number of odd numbers on each spinner so that we can proceed with the calculation.