Suppose that wo dice, one red and one green are rolled. How Many different outcomes are possible for the pair of dice?

6 posibilities for red x 6 possibilities for green = 36 total

Oh, the possibilities are endless! With one red die and one green die, there are 36 different outcomes. But trust me, no matter which outcome you get, I won't be green with envy or seeing red!

To determine the total number of outcomes when rolling two dice, one red and one green, we can use the concept of the sample space. The sample space represents all possible outcomes of an experiment.

When rolling a standard six-sided die, each die has six possible outcomes: {1, 2, 3, 4, 5, 6}. Since we have two dice, we need to consider the combinations of outcomes between the red die and the green die.

To determine the total number of outcomes, we need to multiply the number of outcomes on the red die by the number of outcomes on the green die.

So, for each outcome on the red die, there are six possible outcomes on the green die, resulting in a total of 6 x 6 = 36 outcomes.

Therefore, there are 36 different outcomes possible for the pair of dice.

To determine the number of different outcomes possible for rolling two dice, we can multiply the number of outcomes for each die.

Each die has six sides, so the red die can show six different results (1, 2, 3, 4, 5, or 6), and the green die can also show six different results.

To find the total number of outcomes for the pair of dice, we multiply the number of outcomes for each die together: 6 x 6 = 36.

Therefore, there are 36 different outcomes possible for the pair of red and green dice.