MATH 221 - Chapter 5

In​ statistics, what is true of​ randomness? A. Randomness is hard to achieve without help from a computer or some other randomizing device. B. Randomness can be achieved by writing a sequence with no structure. C. Randomness means having no apparent pattern. D. Randomness should be avoided because it can lead to incorrect answers.

A. Randomness is hard to achieve without help from a computer or some other randomizing device.

A friend flips a coin 40 times and says that the probability of getting a head is 40​% because he got sixteen heads. Is the friend referring to an empirical probability or a theoretical​ probability? Explain. A. This is an example of empirical probability because it is based on the relative frequency at which an event happens after infinitely many repetitions. B. This is an example of theoretical probability because it is not based on an experiment. C. This is an example of empirical probability because it is based on an experiment. D. This is an example of theoretical probability because it is based on an experiment.

C. This is an example of empirical probability because it is based on an experiment.

Probabilities that are based on​ short-run relative frequencies are called​ what? Theoretical probabilities Practical probabilities Pseudo probabilities Empirical probabilities

Empirical probabilities Probabilities that are based on short-run relative frequencies are called empirical probabilities. If a coin is tossed 10 times and 6 results are​ heads, the empirical probability of getting heads is six tenths =​0.6, or​ 60%.

Experiments used to produce empirical probabilities are called​ what? Frequencies Simulations Theories Randomizations

Simulations Experiments used to produce empirical probabilities are called​ simulations, because the investigators hope that these experiments simulate the situation they are examining.

Statistics and probability use the​ "inclusive OR". This means that referring to outcomes A OR B is referring to​ what? A. Outcomes that are only in​ A, only in​ B, or in both B. Outcomes that are only in B C. Outcomes that are in both A and B D. Outcomes that are only in A

Outcomes that are in A OR B are outcomes that are only in​ A, only in​ B, or in both.

Probabilities are always numbers between and including what​ numbers? 0 and 1 0.01 and 1.0 minus −1 and 1 1 and 100

answer: 0 and 1 Probabilities are always numbers between and including 0 and 1. If the probability of an event happening is​ 0, then that event never happens. If the probability of an event happening is​ 1, then that event always happens.

If the probability that it will rain tomorrow is​ 0.30, the probability that it will not rain tomorrow is​ what? A. −0.30 B. 0.30 C. 0.70 D. Impossible to determine from the given information

answer: 0.70 The probability that an event does not occur is 1 minus the probability that the event will occur. The probability that it will not rain tomorrow is then 1 − 0.30 = 0.70.

Which of the following is the probability that something in the sample space will​ occur? A. 0 B. 1 C. 0.50 D. Impossible to determine from the given information

answer: 1 note: The sample space is the set of all possible and equally likely outcomes of the experiment. Because it contains all possible​ outcomes, the probability that something in the sample space will occur is 1.

Given the event​ "a die lands with a 6 on​ top", which of the following is the complement of this​ event? A.The die lands with a 6 on the bottom B.The die lands with a 3 on the top C.The number of times the die lands with a 6 on top in n throws of the die D.The die lands with a​ 1, 2,​ 3, 4, or 5 on top

answer: A The complement is all the ways the die can land with a number that is not a 6 on top. This happens when the die lands with a​ 1, 2,​ 3, 4, or 5 on top.

The sample space of a random experiment is​ what? A. The set of all possible outcomes of the experiment B. The set of all possible and equally likely outcomes of the experiment C. Events that have no outcomes in common D. Any collection of outcomes of the experiment

answer: B note: The sample space of a random experiment is the set of all possible and equally likely outcomes of the experiment. It is often represented with the letter S.

When two events have no outcomes in​ common, they are called​ what? Complementary Conditional Mutually exclusive A sample space

answer: Mutually exclusive When two events have no outcomes in​ common, they are called mutually exclusive. Rolling a 5 on a​ six-sided die and rolling a 3 on a​ six-sided die are mutually exclusive events.

Because they are generated by a seed value that starts the random​ sequence, computer-generated random numbers are sometimes called​ what? ​Pseudo-random numbers Arbitrary random numbers Prime random numbers Empirical random numbers

answer: ​Pseudo-random numbers Computer-generated random numbers are sometimes called​ pseudo-random numbers. If a researcher inputs the same seed​ number, that researcher will always see the same sequence of​ pseudo-random numbers.

A Monopoly player claims that the probability of getting a 4 when rolling a six-sided die is one-sixth because the die is equally likely to land on any of the six sides. Is this an example of a theoretical probability or an empirical​ probability? Explain. A. This is an example of theoretical probability because it is based on an experiment. B. This is an example of empirical probability because it is based on an experiment. C. This is an example of theoretical probability because it is not based on an experiment. D. This is an example of empirical probability because it is based on the relative frequency at which an event happens after infinitely many repetitions.

note: Theoretical probability is the relative frequency at which an event happens after infinitely many repetitions. This value never changes.