Answer:
z = 0.33
Step-by-step explanation:
Mean = u = 500
Standard Deviation = s = 60
Scores of Jake = x = 520
Step 1: Finding the z score
In order to find the percentage who scored below Jake first we have to convert the scores of Jake to z scores. The formula to find z value is:
[tex]z=\frac{x-u}{s}[/tex]
Using the given values in this formula, we get the z scores:
[tex]z=\frac{520-500}{60}=0.33[/tex]
Thus, rounded of to two decimal places, the z-value for Jake's score is 0.33
Step 2: Find probability from the z-table
In the given table, from first column we will find the value 0.3. In the row across 0.3 we will find the value directly below 0.03 as 0.3 + 0.03 = 0.33
This value comes out to be 0.6293
The image attached below shows this process of finding the probability.
Step 3: Converting the probability to percentage
In order to convert this probability to percentage simply multiply it be 100.
So, 0.6293 = 62.93 %
62.93% rounded to nearest whole number will be 63%
This tells us that approximately 63% students scored below Jake i.e. below 520.
