What is the probability that she will wear a red or a not blue shirt?
Answer Expert Verified Therefore, the probability that Rhian will wear a blue or a red shirt is or 0.6.
Have 8 pairs of pants 7 shirts and 4 ties How many different outfits are possible?
Question 706279: A boy owns 8 pairs of pants, 7 shirts, 4 ties, and 2 jackets. How many different outfits can he wear to school if he must wear one of each item? 8*7*4*2=448 COMBINATIONS.
How many outfits can you make from a choice of 3 shirts 2 pants and 4 pairs of shoes?
How many outfits can Mary make? 3 shirts * 2 pants * 4 shoes 3 * 2 * 4 = 24 possible outfits Page 9 Option 3: Fundamental Counting Principle I flip a coin 3 times.
How many outfits are possible with 5 pairs of jeans 8 shirts and 2 pairs of shoes?
Answer: 80 i believe. 5 x 8 x 2 = 80.
What is the probability that Mark wears a black pair of pants and a red shirt on a given day?
Answer Expert Verified Therefore, the probability that he would wear a black pants and a red shirt is 1/15 or 6.67%.
What is mutually exclusive events and word problems involving probability?
If A and B are mutually exclusive events then the probability of A happening OR the probability of B happening is P(A) + P(B). Example: The probabilities of three teams A, B and C winning a badminton competition are 1/3, 1/5 and 1/9 respectively.
How many outfits can 5 make?
5 s’s means a total of 5 X 4, or 20 outfits.
How do you know if A and B is mutually exclusive?
A and B are mutually exclusive events if they cannot occur at the same time. This means that A and B do not share any outcomes and P(A AND B) = 0. and is not equal to zero.
What is the difference between mutually exclusive and exhaustive events explain with example?
Two events are mutually exclusive if they cannot both be true. A set of events is collectively exhaustive where at least one of the events must occur. For example, when rolling a six-sided die, the outcomes 1, 2, 3, 4, 5, and 6 are collectively exhaustive, because they encompass the entire range of possible outcomes.
