1/2 x 1/3 = 1/6
The probability of spinning the spinner and landing on an odd number depends on the number of odd numbers on the spinner and the total number of numbers on the spinner. If there are 3 odd numbers on the spinner and a total of 6 numbers, then the probability of landing on an odd number is 3/6, which simplifies to 1/2 or 50%.
To determine the probability of spinning red on a spinner, you need to know the total number of sections on the spinner and how many of those sections are red. The probability can be calculated using the formula: Probability = (Number of red sections) / (Total number of sections). If, for example, there are 4 red sections on a spinner with 10 total sections, the probability would be 4/10 or 0.4, which is 40%.
There is insufficient information for us to even begin to answer this question. Please edit the question to include more context or relevant information. There is no information on the shape of the two spinners and what colours are on each.
6-52
Assuming the red and blue spinner has an equal number of red and blue spots, the odds of spinning blue is 50%. On the other spinner, the odds of an odd number is 67%. Combined, the odds of spinning blue and an odd number is 33%. (50% times 67%)
The probability of spinning the spinner and landing on an odd number depends on the number of odd numbers on the spinner and the total number of numbers on the spinner. If there are 3 odd numbers on the spinner and a total of 6 numbers, then the probability of landing on an odd number is 3/6, which simplifies to 1/2 or 50%.
The answer depends on the shape of the spinner and the numbers on it.
1/6
To determine the probability of spinning red on a spinner, you need to know the total number of sections on the spinner and how many of those sections are red. The probability can be calculated using the formula: Probability = (Number of red sections) / (Total number of sections). If, for example, there are 4 red sections on a spinner with 10 total sections, the probability would be 4/10 or 0.4, which is 40%.
If it is a fair spinner, then 3/8
There is insufficient information for us to even begin to answer this question. Please edit the question to include more context or relevant information. There is no information on the shape of the two spinners and what colours are on each.
9
The probability is 3/7.
The probability is 5/9.
The answer depends on how many numbers on the spinner, and their distribution. Without that information, it is not possible to answer the question.
6-52
Assuming the red and blue spinner has an equal number of red and blue spots, the odds of spinning blue is 50%. On the other spinner, the odds of an odd number is 67%. Combined, the odds of spinning blue and an odd number is 33%. (50% times 67%)