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The coin can result in one of two possibilities. For each of those . . .

The cube has 6 possibilities.

Total possibilities for the coin and the cube = 2 x 6 = 12 .

Q: How many different outcomes are possible when flipping a coin and rolling a dice?

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3 of them.

36 possible outcomes, assuming replications (ie: rolling a 6 and a 1, rolling a 1 and a 6; counted as two separate outcomes.)

There is 6 possible outcomes per roll of a die. So, there are 6*6*6*6 outcomes or 64 or 1296 possible outcomes.

There are 65 = 7776 possible outcomes. However, if the number cubes are indistinguishable, then these represent 378 distinct outcomes.

There is 62 or 36 possible outcomes rolling two dice.

Related questions

There is 2 outcomes for flipping the coin, and 6 outcomes for rolling the cube. The total outcomes for both are 2*6 = 12.

Flipping a coin: two possible outcomes, H or T. Rolling a die: six possible outcomes, 1, 2, 3, 4, 5, or 6. Flipping a coin and rolling a die: 12 possible outcomes. So the sample space has 12 outcomes such as, {H1, H2, H3, H4, H5, H6, T1, T2, T3, T4, T5, T6 }

3 of them.

There is 2 outcomes for flipping the coin, and 6 outcomes for rolling the cube. The total outcomes for both are 2*6 = 12.

There is 2 outcomes for flipping the coin, and 6 outcomes for rolling the cube. The total outcomes for both are 2*6 = 12.

If the numbers (or symbols) are all different then 10 outcomes.

There are 2*4*6 = 48 possible outcomes in total.

a lot

The sample space for this situation is all the possible outcomes that could be achieved. Like H1, H2, H3, H4, H5, H6, T1, T2, T3, T4, T5, and T6 are the outcomes for flipping a Coin and rolling a number cube.

The Bernoulli experiment is a trial that has two different outcomes, failure and success. The experiment can be used in flipping a coin or rolling a die.

6 sides will be either 1,2,3,4,5, or 6 , so 6 possible outcomes

There are 36 possible outcomes.