Solution:
The probability of getting any of the 6 possible outcomes (ie; 1,2,3,4,5,6) when a die is rolled is 1/6 , if the die is fair.
Now, for getting an outcome less than 5, any of the possible outcomes 1, 2, 3, or 4 will be favourable.
Since each of them have probability as 1/6, therefore the total probability will be 4*(1/6) = 4/6 = 2/3.
Rolling a die and getting an outcome that is less than four the probability of an outcome is less than four is
a. What is the theoretical probability of rolling one die and getting a 5 ? b. What is the theoretical probability of rolling one die and getting a 3 or a 4? c. What is the theoretical probability of rolling one die and not getting a 6? d. What is the theoretical probability of rolling one die and getting a 7 ?
Are the events disjoint? st Rolling a die once and getting a 6. Rolling a die once and getting an odd number. ОО Yes Ο Νο ate cce
The following pair of events in rolling a die experiment are mutually exclusive except: A/ Getting odd or even. B/ Getting an odd number or a number less than 4. C/ Getting a number that is less than 3 or more than 4. D/ Getting a number that is more than 7 or even number. E/ None
X is a Random variable representing the outcome of rolling a 6-sided die. Before the die is rolled, you are given two options: (a) You get 1/E(X) in Points right away. (b) You wait until the die is rolled, then get 1/X in Points. Which option is better in getting Points?
A) The following pair of events in rolling a die experiment are mutually exclusive except Getting odd or even. None Getting a number that is more than 7 or even number. Getting an odd number or a number less than 4. Getting a number that is less than 3 or more than 4 B) The probability of drawing three hearts with the replacement from a standard deck is?
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
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)
Consider rolling a die two times What is the sample space if the outcome of interest is the pair of numbers observed in order?
what is the probability of rolling a number less than or equal to 6 on a regular six-sided die?