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Given a sample mean difference of 23, a standard error of 4.2, and a critical t value of 2.262, what are the values for the confidence interval?

Respuesta :

JeanaShupp

Answer: (13.4996, 32.5004)

Step-by-step explanation:

The confidence interval for mean difference is given by :-

[tex](\overline{x}_1-\overline{x}_2)\pm t^*\times SE[/tex] ,

where [tex](\overline{x}_1-\overline{x}_2)[/tex] = sample mean difference .

[tex]t^*[/tex]= critical t value (two-tailed)

SE= Standard error.

Given : [tex](\overline{x}_1-\overline{x}_2)=23[/tex]

[tex]t^*=2.262[/tex]

SE= 4.2

Now, the confidence interval for mean difference will be :-

[tex]23\pm (2.262)\times (4.2)\\\\= 23\pm9.5004\\\\=(23-9.5004,\ 23+9.5004)\\\\=(13.4996,\ 32.5004)[/tex]

Hence, the required confidence interval : (13.4996, 32.5004)

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