Question

The mean score for a standardized test is 1700 points. The results are normally distributed with a standard deviation of 75 points. What is the probability that a student will score more than 1700 points?

Answer 1

The Probability that a student will score more than 1700 points `=0.5`

Explanation:

The Mean Score is `=1700`
Standard deviation is `=75`

The `z` score corresponding to mean score `1700= (x-barx)/sigma=(1700-1700)/75=0`

`z` score corresponds to `1700` is `=0`

The area `> 1700` lies to the right of `z=0`

The required probability is given by the area between `z=0` and `z=oo`

This area represents `0.5`

The Probability that a student will score more than 1700 points `=0.5`

It could be easily found like this-

The values are normally distributed. The Probability of the area under Normal Curve represents `=1`

Values greater than 1700 represents one-half of the area. The right wing of the normal curve represents values > 1700, hence probability `0.5`