Answer:
Step-by-step explanation:
Hello!
The variable of interest is
X: the amount a 10-11-year-old spends on a trip to the mall.
Assuming that the variable has a normal distribution, you have to construct a 98% CI for the average of the amount spent by the 10-11 year-olds on one trip to the mall.
For this you have to use a Student-t for one sample:
X[bar] ± [tex]t_{n-1;1-\alpha /2}[/tex] * [tex]\frac{S}{\sqrt{n} }[/tex]
n= 6
[tex]t_{n-1;1-\alpha /2}= t_{5; 0.99}= 3.365[/tex]
$18.31, $25.09, $26.96, $26.54, $21.84, $21.46
∑X= 140.20
∑X²= 3333.49
X[bar]= ∑X/n= 140.20/6= 23.37
S²= 1/(n-1)*[∑X²-(∑X)²/n]= 1/5[3333.49-(140.2)²/6]= 11.50
S= 3.39
X[bar] ± [tex]t_{n-1;1-\alpha /2}[/tex] * [tex]\frac{S}{\sqrt{n} }[/tex]
[23.37 ± 3.365 * [tex]\frac{3.39}{\sqrt{6} }[/tex]]
[18.66;29.98]
With a confidence level of 98%, you'd expect that the interval $[18.66;29.98] will include the population mean of the money spent by 10-11 year-olds in one trip to the mall.
I hope you have a SUPER day!
