Respuesta :
Answer:
a) We are within 2 deviations from the mean since 30 -2*5 = 20 and 30 + 2*5 = 40. So our value for k = 2 and we can find the % like this:
[tex]\% = (1- \frac{1}{2^2}) *100 = 75\%[/tex]
b) We are within 3 deviations from the mean since 30 -3*5 = 20 and 30 + 3*5 = 45. So our value for k = 3 and we can find the % like this:
[tex]\% = (1- \frac{1}{3^2}) *100 = 88.88\% \approx 89\%[/tex]
c) We are within 1.4 deviations from the mean since 30 -1.4*5 = 23 and 30 + 1.4*5 = 37. So our value for k = 1.4 and we can find the % like this:
[tex]\% = (1- \frac{1}{1.4^2}) *100 = 48.97\% \approx 49\%[/tex]
d) We are within 2.6 deviations from the mean since 30 -2.6*5 = 17 and 30 + 2.6*5 = 43. So our value for k = 2.6 and we can find the % like this:
[tex]\% = (1- \frac{1}{2.6^2}) *100 = 85.2\% \approx 85\%[/tex]
e) We are within 3.4 deviations from the mean since 30 -3.4*5 =13 and 30 + 3.4*5 = 47. So our value for k = 3.4 and we can find the % like this:
[tex]\% = (1- \frac{1}{3.4^2}) *100 = 91.35\% \approx 91\%[/tex]
Step-by-step explanation:
For this case we need to remember what says the Chebysev theorem, and it says that we have at least [tex] 1-\frac{1}{k^2} [/tex] of the data liying within k deviations from the mean on the interval [tex] \bar X \pm k s[/tex]
We know that [tex]\bar X= 30, s=5[/tex]
Part a
For this case we want the values between 20 and 40
So we are within 2 deviations from the mean since 30 -2*5 = 20 and 30 + 2*5 = 40. So our value for k = 2 and we can find the % like this:
[tex]\% = (1- \frac{1}{2^2}) *100 = 75\%[/tex]
Part b
For this case we want the values between 15 and 45
So we are within 3 deviations from the mean since 30 -3*5 = 20 and 30 + 3*5 = 45. So our value for k = 3 and we can find the % like this:
[tex]\% = (1- \frac{1}{3^2}) *100 = 88.88\% \approx 89\%[/tex]
Part c
For this case we want the values between 23 and 37
So we are within 1.4 deviations from the mean since 30 -1.4*5 = 23 and 30 + 1.4*5 = 37. So our value for k = 1.4 and we can find the % like this:
[tex]\% = (1- \frac{1}{1.4^2}) *100 = 48.97\% \approx 49\%[/tex]
Part d
For this case we want the values between 17 and 43
So we are within 2.6 deviations from the mean since 30 -2.6*5 = 17 and 30 + 2.6*5 = 43. So our value for k = 2.6 and we can find the % like this:
[tex]\% = (1- \frac{1}{2.6^2}) *100 = 85.2\% \approx 85\%[/tex]
Part e
For this case we want the values between 13 and 47
So we are within 3.4 deviations from the mean since 30 -3.4*5 =13 and 30 + 3.4*5 = 47. So our value for k = 3.4 and we can find the % like this:
[tex]\% = (1- \frac{1}{3.4^2}) *100 = 91.35\% \approx 91\%[/tex]
