Answer:
A = 82.82
B = 72.53
C = 61.58
D = 53.55
Step-by-step explanation:
First, determine the percentile at which the cutoff grade in each letter grade interval falls on and find the equivalent z-score:
A: (100-10) = 90-th percentile
z-score = 1.282
B: (100-10-30) = 60-th percentile
z-score = 0.253
C : (100-10-30-40) = 20-th percentile
z-score = -0.842
D: (100-10-30-40-15) = 5-th percentile
z-score = −1.645
The value 'X' for each cutoff can be found by applying the z-score equation:
[tex]z= \frac{X- \mu }{SD}[/tex]
Where μ is the mean and SD is the standard deviation
Therefore, the cutoffs are:
[tex]1.282= \frac{X(A)- 70}{10}\\X(A) = 10*1.282 +70\\X(A) = 82.82\\\\0.253 = \frac{X(B)- 70}{10}\\X(B) = 10*0.253 +70\\X(B) = 72.53\\\\0.253 = \frac{X(C)- 70}{10}\\X(C) = 10*-0.842 +70\\X(C) = 61.58\\\\0.253 = \frac{X(D)- 70}{10}\\X(D) = 10*-1.645 +70\\X(D) = 53.55\\[/tex]
