There are 32 possible outcomes.
HHHHH,
HHHHT, HHHTH, HHTHH, HTHHH, THHHH,
HHHTT, HHTHT, HHTTH, HTHHT, HTHTH, HTTHH, THHHT, THHTH, THTHH, TTHHH,
HHTTT, HTHTT, HTTHT, HTTTH, THHTT, THTHT, THTTH, TTHHT, TTHTH, TTTHH,
HTTTT, THTTT, TTHTT, TTTHT, TTTTH,
TTTTT.
There are 210 total possible outcomes from flipping a coin 10 times.There is one possible outcome where there are 0 heads.There are 10 possible outcomes where there is 1 head.So there are 210 - 11 possible outcomes with at least 2 heads.(1013)
The outcomes are: heads, tails, tails or tails, heads, tails or tails, tails, heads. You can see that there are 3 possible outcomes with exactly 1 head.
16
24 or 16
There are sixteen different outcomes. To figure this you multiply the number of possible outcomes for each coin, which is 2 for all of them. So you take 2^4 which comes out to 16.
There are 26 = 64 possible outcomes.
16
480
4 HH HT TH TT
There are 210 total possible outcomes from flipping a coin 10 times.There is one possible outcome where there are 0 heads.There are 10 possible outcomes where there is 1 head.So there are 210 - 11 possible outcomes with at least 2 heads.(1013)
Heads or tails; each have a probability of 0.5 (assuming a fair coin).
Do you mean what are all the possible outcomes? Or what is the probability of a certain outcome? Need a little more information.
It is used to represent one of the two possible outcomes of tossing a coin.
A system with two possible outcomes with equal probabilities.
The outcomes are: heads, tails, tails or tails, heads, tails or tails, tails, heads. You can see that there are 3 possible outcomes with exactly 1 head.
To determine the number of leaves on a tree diagram representing all possible combinations of tossing a coin and drawing a card from a standard deck of cards, we first note that there are 2 possible outcomes when tossing a coin (heads or tails) and 52 possible outcomes when drawing a card. Therefore, the total number of combinations is 2 (coin outcomes) multiplied by 52 (card outcomes), resulting in 104 leaves on the tree diagram.
There is 2 outcomes for flipping the coin, and 6 outcomes for rolling the cube. The total outcomes for both are 2*6 = 12.