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Explanation:
The symbol [tex]\mu[/tex] or mu represents the population mean, which is a parameter.
The symbol [tex]\sigma[/tex] or sigma represents the population standard deviation, which is also a parameter. The same goes for the symbol p, without any hat on top, as it is the population proportion.
If something represents a population data item, then it's automatically a parameter. It might help to think both words "population" and "parameter" start with the letter P.
Based on those previous paragraphs, we can rule out choices A, D and E. Those three items are parameters. This leaves choices B and C as our final answers.
[tex]\overline{x}[/tex] or xbar is a sample statistic, and it represents an estimate of the population mean. Similarly, [tex]\hat{p}[/tex] or p-hat is the sample proportion and it represents an estimate of the population proportion. These are considered unbiased estimators.
Another example of an unbiased estimator is the variable s which represents the sample standard deviation and it estimates the value of sigma. All of these estimators have one thing in common: they are based on a sample, which in turn tries to predict what the corresponding population value is. In other words, the statistic's job is to estimate the parameter.
Below is a reference table for all of the items mentioned.
A parameter, represented by the symbol mu, is the population mean.
Thus, The population standard deviation, another parameter, is denoted by the letter sigma. The symbol p, which stands for population proportion and has no hat on top, is equivalent.
Something is inherently a parameter if it represents a population data item. It could be helpful to remember that the words "parameter" and "population" both begin with the letter P.
We can eliminate options A, D, and E based on the sentences above. These three things are constraints and parameter. This leaves B and C as our only remaining options. In a similar manner, or p-hat is the sample proportion and it and population.
Thus, A parameter, represented by the symbol mu, is the population mean.
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Based on endosymbiotic theory, what cell would result from the endosymbiotic of a cell with a cyanobacterium?
STAN EVERGLOW
1. STREAM PIRATE
STAN TWICE
1. STREAM SCIENTIST
STAN IVE
1. STREAM ELEVEN
STAN THEM FOR BETTER LIFE !!
What would be your solution to improving the national debt in the United States?
Answer:
Bailouts and debt defaults can also help a government solve a debt problem, but these approaches have notable drawbacks as well.
Issuing Debt With Bonds.
Interest Rate Manipulation.
Instituting Spending Cuts.
Raising Taxes.
Lowering Debt Successes.
National Debt Bailout.
Controversy with Every Method.
Explanation: bIg BrAiN
16. A chalk box is 5/6 th full of its capacity. 5 chalks were taken out by a teacher and 2
chalks were put inside it by a student. If it is 4/5th full now, how many chalks the box
contained when it was full?
(a) 90
(b) 80
(c) 72
(d) can't be determined
Answer:
Well honestly this is a easy one, to figure out the answer to this we first need to pay close attention, it says at the start 5/6 of it is filled which means 90% of it is filled, then it says 5 chalks were taken out by the teacher which would leave the box with 0, and lastly it says that 4 out of 5 of it was put back inside but it had 5 out of 6 but now 4 out of 5 which would mean that it would be 65.67% and then since that is not one of the options you would have to estimate and use number math to figure out what that could be and it would be 72, so 72% of it is filled, Hope this helps :D
Explanation:
Ten numbered balls are placed in a box. The balls numbered 1–4 are blue and those numbered 5–10 are red. What is the probability that a ball drawn at random from the box is blue?
Answer: If 5- 10 is red and 1-4 of them are blue I would say that 7 of them are red and 3 are blue because the probility of it having more than3 would be rare an out of ordinary Hope this helps if not please tell me what the answer options are.
Explanation:
Have a great day
Answer:7
Explanation:
what is 4 * 6?
I will give 200 dollars
Answer:
24
Explanation:
Do you want kostenlos points? Why they are yours my friend, Don't go spending them all in one place!
STAN EVERGLOW
1. STREAM PIRATE
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STAN IVE
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Fun facts
There's a company that turns dead bodies into an ocean reef.
The name "bonobo" resulted from a misspelling.
There is an annual Coffee Break Festival.
You can buy a flying bicycle.
Dolphins sleep with one eye open. .
Why should companies create a front office instead of letting customers look for the specific department they need to get intouch with ;-;
Answer:
Because it is easier that way
Explanation:
You can just go to the office and ask the question. It is more convenient!
Does anyone know how to solve this
[tex] \red{ \rule{1000pt}{9000000pt}}[/tex]
The product of two positive integers is 65. Which number could be the sum of the two integers?
Answer:
18 is the sum of the two integers.
Explanation:
65 is divisible by 4 numbers: 1, 5, 13, and 65.
Meaning 65 x 1 = 65 and 13 x 5 = 65.
So in this case, add 13 and 5 which equals 18.
18 is the sum of the two integers.
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If 7 men 5 women have applied for job and 3 applicants are randomly selected from the probability that 2 are men how many WOmen?
.
The probability of selecting 2 men and a woman is [tex]\frac{21}{44}[/tex]
The sample space is made up of 7 men and 5 women. So we have a total of 12 people.
If 3 applicants are randomly selected without replacement, there will be three mutually exclusive possibilities;
[tex]MMW=\text{Event that a Man, then Man, then Woman is selected}\\MWM=\text{Event that a Man, then Woman, then Man is selected}\\WMM=\text{Event that a Woman, then Man, then Man is selected}\\[/tex]
The final probability will have the form
[tex]P(\text{2 men and 1 woman})=P(MMW)+P(MWM)+P(WMM)[/tex]
because the possibilities are mutually exclusive.
Computing the Probability of each possibilityEach mutually exclusive possibility is made up of dependent events. This is because when selection is done without replacement, it affects the size of the sample space.
The Probability of selecting a Man, then a Man, then a Woman is[tex]P(MMW)=\dfrac{7}{12}\times\dfrac{6}{11}\times\dfrac{5}{10}\\\\=\dfrac{7}{44}[/tex]
The Probability of selecting a Man, then a Woman, then a Man is[tex]P(MWM)=\dfrac{7}{12}\times\dfrac{5}{11}\times\dfrac{6}{10}\\\\=\dfrac{7}{44}[/tex]
The Probability of selecting a Woman, then a Man, then a Man is[tex]P(MWM)=\dfrac{5}{12}\times\dfrac{7}{11}\times\dfrac{6}{10}\\\\=\dfrac{7}{44}[/tex]
Calculate the Probability of getting two men and a womanThe final probability is
[tex]P(\text{2 men and 1 woman})=P(MMW)+P(MWM)+P(WMM)\\\\=\dfrac{7}{44}+\dfrac{7}{44}+\dfrac{7}{44}\\\\=\dfrac{21}{44}[/tex]
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