Answer:
The architects can be 95% confident that the mean breaking strength of the white wood is within this interval (149.736 , 1.664)
Step-by-step explanation:
Given
Sample = n = 16
x = 75.7
s = 10.9
First we Calculate the degree of freedom.
Degree of freedom is calculated as
df = (n - 1)t
df = (16 - 1)t
df = 15t
The we check the t-table corresponding value for 0.05
t 0.05= 1.75377.
0.05 is gotten from
(100% - 95%) = 5%= 5/100 = 0.05
Calculating the True mean breaking strength through the confidence interval
Solving the confidence interval.
This is given by:
x ± ts√df
Confidence Interval = 75.7 ± 1.75377 * 10.9 * √15
Confidence Interval = 75.7 ± 74.036
Confidence Interval = 75.7 + 74.036 , 75.7 - 74.036
Confidence interval = 149.736 , 1.664
Interpreting the above;
The architects can be 95% confident that the mean breaking strength of the white wood is within this interval (149.736 , 1.664)
Answer:
95% confidence interval for the true mean breaking strength of the white wood is (69.89 MPa, 81.51 MPa)
The result above means that the lower limit of the true mean breaking strength of the white wood is 69.89 MPa and the upper limit is 81.51 MPa.
Step-by-step explanation:
Confidence interval = mean + or - Error margin (E)
mean = 75.7 MPa
sd = 10.9 MPa
n = 16
degree of freedom = n - 1 = 16 - 1 = 15
Confidence level (C) = 95% = 0.95
Significance level = 1 - C = 1 - 0.95 = 0.05 = 5%
t-value corresponding to 15 degrees of freedom and 5% significance level is 2.131
E = t × sd/√n = 2.131 × 10.9/√16 = 5.81 MPa
Lower limit = mean - E = 75.7 - 5.81 = 69.89 MPa
Upper limit = mean + E = 75.7 + 5.81 = 81.51 MPa
95% confidence interval is (69.89 MPa, 81.51 MPa)
The result means that the true mean breaking strength of the white wood is between 69.89 and 81.51 MPa.
