You roll a red die and a green die. Find the probability of rolling a four on the red die and a three on the green die.
(1/6)^2
if the answer has to be a fraction what would the correct answer be?
Can you square 1/6 ?
http://www.google.com/search?source=ig&hl=en&rlz=1G1GGLQ_ENUS374&q=1%2F6%29%5E2+&aq=f&aqi=g4&aql=&oq=&gs_rfai=CvNZzswj3S8SbKYKGzQT5q9GjDwAAAKoEBU_QnN2g
To find the probability of rolling a four on the red die and a three on the green die, we need to determine the number of possible outcomes and the number of favorable outcomes.
1. Determine the number of possible outcomes:
- When rolling a die, there are six possible outcomes (numbers 1 to 6) on each die.
- Since there are two dice (red and green), the total number of possible outcomes is 6 * 6 = 36.
2. Determine the number of favorable outcomes:
- We are interested in finding the probability of rolling a four on the red die and a three on the green die.
- There is only one outcome out of six possible outcomes on the red die that results in rolling a four, which is a favorable outcome.
- Similarly, there is only one outcome out of six possible outcomes on the green die that results in rolling a three, which is also a favorable outcome.
- Therefore, the number of favorable outcomes is 1 * 1 = 1.
3. Calculate the probability:
- The probability of an event is given by the number of favorable outcomes divided by the number of possible outcomes.
- So, the probability of rolling a four on the red die and a three on the green die is 1/36.
Thus, the probability of rolling a four on the red die and a three on the green die is 1/36.