People with restless leg syndrome have a strong urge to move their legs to stop uncomfortable sensations. People with fibromyalg
ia suffer pain and tenderness in joints throughout the body. A recent study indicates that people with fibromyalgia are much more likely to have restless leg syndrome than people without the disease.1 The study indicates that, for people with fibromyalgia, the probability is 0.33 of having restless leg syndrome, while for people without fibromyalgia, the probability is 0.03. About 2% of the population has fibromyalgia.Create a tree diagram from this information and use it to find the probability that a person with restless leg syndrome has fibromyalgia.Round your answer to three decimal places.
1 answer:
Answer:
0.1833
Step-by-step explanation:
Given:
% of people with fibromyalgia = 2%
Probability of having a restless leg syndrome for people with fibromyalgia = 0.33
Probability of having a restless leg syndrome for people without fibromyalgia = 0.03
Take F as event of having fibromyalgia
Take R as event of having restless leg
Required:
Find the probability that a person with restless leg syndrome has fibromyalgia.
To find the probability that a person with restless leg syndrome has fibromyalgia, we have: P(F/R)
Where,
P(R/F) = 0.33
P(F) = 2% = 0.02
P(R/F') = 0.03
P(F') = 1 - 0.02 = 0.98
Therefore,
= 0.1833
Probability a person with restless leg syndrome has fibromyalgia = 0.1833
Tree diagram is attached
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Answer:
The 99% confidence interval of the population standard deviation is 1.7047 < σ < 7.485
Step-by-step explanation:
Confidence interval of standard deviation is given as follows;
s =
Where:
= Sample mean
s = Sample standard deviation
n = Sample size = 7
χ = Chi squared value at the given confidence level
= ∑x/n = (62 + 58 + 58 + 56 + 60 +53 + 58)/7 = 57.857
The sample standard deviation s = = 2.854
The test statistic, derived through computation, = ±3.707
Which gives;
1.7047 < σ < 7.485
The 99% confidence interval of the population standard deviation = 1.7047 < σ < 7.485.
<h3><u>Explanation</u></h3>
A function is a set of relation that doesn't have repetitive domain. If we want to know if a graph is function or not, we have to do the line test.
<u>Line</u><u> </u><u>Test</u>
- Draw a vertical line. Make sure that a line passes through a graph.
- See if a line intercepts a graph more than one point or just only one.
<u>Result</u>
If a line intercepts a graph more than one point, it is not a function.
However, if a line only intercepts a graph just one point, it is indeed a function.
The given graph from the question is a function because it passes line test.
<u>Domain</u><u> </u><u>and</u><u> </u><u>Range</u>
Domain is the set of all x-values, meaning we only focus on x-axis or x-value only.
Range is the set of all y-values. We only focus on y-value or y-axis for Range.
<u>Determine</u><u> </u><u>Domain</u><u> </u><u>from</u><u> </u><u>Graph</u>
We can simply say that the domain is from starting domain or x-coordinate point to end x-coordinate point. For example, if a graph starts at x = -4 and ends at x = 2, we can say that - 4<=x=2.
<u>Determine</u><u> </u><u>Range</u><u> </u><u>from</u><u> </u><u>Graph</u>
Similar to Domain except Range starts from the minimum value or point to the maximum point or value. For example if a graph starts at min point = 6 and max point = 9. We can say that 6<=y<=9.
From the graph, the domain starts from negative infinity to positive infinity. Meaning that x can be any numbers. Hence, the domain is set of all real numbers. For range, the minimum value is 0 and max value is positive infinity. Therefore we write y>=0.
<h3><u>Answer</u></h3><u></u>
<u>Domain</u><u> </u><u>is</u><u> </u><u>set</u><u> </u><u>of</u><u> </u><u>all</u><u> </u><u>real</u><u> </u><u>numbers</u><u>.</u>
<u>Range</u><u> </u><u>is</u><u> </u><u>greater</u><u> </u><u>or</u><u> </u><u>equal</u><u> </u><u>to</u><u> </u><u>0</u><u>.</u>