Question

An experiment is given together with an event. Find the (modeled) probability of each event, assuming that the coins are distinguishable and fair, and that what is observed are the faces uppermost.

Three coins are tossed; the result is at most one tail.

An experiment is given together with an event. Find the (modeled) probability of each event, assuming that the dice are distinguishable and fair, and that what is observed are the numbers uppermost.

Two dice are rolled; the numbers add to 3.

An experiment is given together with an event. Find the (modeled) probability of each event, assuming that the dice are distinguishable and fair, and that what is observed are the numbers uppermost.

Two dice are rolled; the numbers add to 11.

An experiment is given together with an event. Find the (modeled) probability of each event, assuming that the dice are distinguishable and fair, and that what is observed are the numbers uppermost.

Two dice are rolled; the numbers add to 13.

An experiment is given together with an event. Find the (modeled) probability of each event, assuming that the dice are distinguishable and fair, and that what is observed are the numbers uppermost.

Two dice are rolled; both numbers are prime. (A positive integer is prime if it is neither 1 nor a product of smaller integers.)

Use the given information to find the indicated probability.

P(A ∪ B) = .8, P(B) = .7, P(A ∩ B) = .4.

Find P(A).

Use the given information to find the indicated probability.

P(A) = .78.

Find P(A').

P(A') =

Answer 1