Respuesta :
Answer: (29.4, 32.6)
Step-by-step explanation:
From the question, we know that
Sample size (n) = 27
Sample mean (x) = $31
Sample standard deviation (s) = $3
We are to construct a 99% confidence interval interval for average amount spent on gift.
The formulae for constructing a 99% confidence interval for population mean is given as
u = x + tα/2 × s/√n...... For upper limit
u = x - tα/2 × s/√n...... For lower limit
tα/2 is the critical value for a 2 tailed test. This value of gotten from a t distribution table by checking the degree of freedom ( 27 - 1 = 26) against the level of significance ( 100% - 99% = 1%).
Hence tα/2 = 2.779
Let us substitute our parameters and solve
For lower limit
u = 31 - 2.779 × 3/√27
u = 31 - 2.779 ( 0.5773)
u = 31 - 1.6045
u = 29.4
For upper limit
u = 31 + 2.779 × 3/√27
u = 31 + 2.779 ( 0.5773)
u = 31 + 1.6045
u = 32.6
Hence the 99% confidence interval for population mean is given as 29.4, 32.6
Answer:
CI (29.4, 32.6)
Step-by-step explanation:
Given
n = 27 (Size)
X = 31 (Mean)
sd = 3 (Standard deviation)
Required to construct 99% Confidence Interval CI
X±z×б/√n
What we do have is the z value and to find it we need degrees of freedom and the significance level
DF = 27-1 = 26
SL = 100%-99% =1%
The z value in a two tailed test with (26,1%) =2.779
Back to formula
Lower limit = 31 - 2.779 ×3/√27 = 29.4
Upper limit = 32.6
