In Chapter 2 we discussed how to summarize data using different methods and to display data using
graphs. Graphs are one important component of statistics; however it is also important to numerically
describe the main characteristics of a data set. The numerical summary measures, such as the ones
that identify the center and spread of a distribution, identify many important features of a distribution.
For example, the techniques learned in Chapter 2 can help us graph data on family incomes.
However, if we want to know the income of a “typical” family (given by the center of the distribution),
the spread of the distribution of incomes, or the relative position of a family with a particular income,
the numerical summary measures can provide more detailed information (see Figure 3.1). The
measures that we discuss in this chapter include measures of (1) central tendency, (2) dispersion
(or spread), and (3) position.
Answer:
Find the probability of each of the following, if z~n(μ = 0,σ = 1). (please round any numerical answers to 4 decimal places).
Explanation:
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The statement that is true of simon as an individual is; C: His annual deductible will be $800.
<h3>What is In-network Insurance?</h3>
For in - network insurance, we know the following facts;
- Charged a lower copayment rate after deductible.
- Incur a relatively low out-of-pocket amount.
- Have a relatively low annual deductible.
Now, in-network physicians help to reduce the cost of insurance to the individual and as a result, what is most likely going to happen is that Simon will have an annual deductible of $800 and is less likely that he will not pay anything after meeting this annual deductible.
The missing options are;
a. The cost of his annual physical will be 50% after deductible
b. The maximum amount that he can expect to pay out-of-pocket is $6,000.
c. His annual deductible will be $800.
d. Once he hits his annual deductible of $800, he will incur no additional costs for health care services for the rest of the calendar year.
Read more about in-network insurance at; brainly.com/question/26278533
Answer: values equality over intelligence.
Explanation: