Given the following information, determine the 68.3 percent, 95.5 percent, and 99.7 percent confidence intervals.
overbar above X equals 4.33 comma SE sub m equals 3
I've looked at the table as recommended. I just do not understand this at all. I'm really lost on this and confused. Pick a confidence level, calculate Z score do this do that. I am so lost and desperate to at least have a clue as to how this needs to be done. Help me someone please!!???
besides telling me to look at the back of a book for a table, looking at it does nothing for me I am lost. I would appreciate it.
3 answers
Somebody be so kind and brake this down to me, please it's for a test I need the help.
Mean = 4.33
SE 3
1- a = .683
a= 0.317
Za/2 = Z0.1585 = 1 z table
invNorm(0.1585) = 1
mean -+ Z *SE
4.33 -1(3), 4.33+1*3
(1.33, 7.33)
You can follow concept and you will get rest of your answer.
SE 3
1- a = .683
a= 0.317
Za/2 = Z0.1585 = 1 z table
invNorm(0.1585) = 1
mean -+ Z *SE
4.33 -1(3), 4.33+1*3
(1.33, 7.33)
You can follow concept and you will get rest of your answer.
Find table in the back of your statistics text labeled something like "areas under normal distribution" to find the proportion/probability [(1-.95)/2] = Z = 1.96. You divide by 2, because you are considering both above and below.
95% = mean ± 1.96 SEm
The other percentages would be solved in the same way.
95% = mean ± 1.96 SEm
The other percentages would be solved in the same way.
1 answer