7.4.30 A single fair die is tossed. Find the odds in favor of rolling a number...
A single, fair 6-sided die is tossed. Find the odds in favor of rolling a 1. What are the odds in favor of rolling a 1? to (Simplify your answer.)
A single die is rolled twice. Find the probability of rolling an even number the first time and a number greater than 4 the second time. Find the probability of roing an even number the first time and a number greater than 4 the second time. (Type an integer or a simplified fraction.)
For the experiment of rolling a single fair die, find the probability of obtaining not less than 3 The probability of obtaining not less than 3 is (Type an integer or a simplified fraction)
Compute the odds in favor of obtaining a number divisible by 2 or 3 in a single roll of a die. The odds in favor are: ____ to _____ ?? (Type a whole number).
If P(A) = 5 compute the odds in favor of A resulting from a single trial of an experiment. The odds in favor of A are to (Simplify your answer) 7
A probability experiment consists of rolling a fair 6-sided die. Find the probability of the event below rolling a number greater than 3. The probability is _______.
A coin is tossed and a six-sided die numbered 1 through 6 is rolled. Find the probability of tossing a head and then rolling a number greater than 2. The probability of tossing a head and then rolling a number greater than 2 is _______ (Round to three decimal places as needed.)
You are tossing three fair coins and rolling one fair die, find the probability of getting a. two heads on the three coins b. rolling an even number on the die c. getting two heads on the coins and an even number on the die d. getting two heads on the coins or an even number on the die
A fair 9-sided die is tossed. Find P(4 or at least 5). That is, find the probability that the result is a 4 or at least 5. You may enter your answer as a fraction, or as a decimal rounded to 3 places after the decimal point, if necessary.
a certain game consist of rolling a single fair die and pays off as follows: $5 for a $6, $4 for a 5, $3 for a 4 and no payoff otherwise. find the expected winnings for this game