A standardized exam's scores are normally distributed. In a recent year, the mean test score was 14901490 and the standard deviation was 320320. The test scores of four s…

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asked Jun 6, 2020 15.8k views

1 Answer

Greg Burghardt · Answer 1 · 2020-06-11T02:46:03+0000

Given : A standardized exam's scores are normally distributed.

Mean test score :
$\mu=1490$

Standard deviation :
$\sigma=320$

Let x be the random variable that represents the scores of students .

z-score :
$z=(x-\mu)/(\sigma)$

We know that generally , z-scores lower than -1.96 or higher than 1.96 are considered unusual .

For x= 1900

$z=(1900-1490)/(320)\approx1.28$

Since it lies between -1.96 and 1.96 , thus it is not unusual.

For x= 1240

$z=(1240-1490)/(320)\approx-0.78$

Since it lies between -1.96 and 1.96 , thus it is not unusual.

For x= 2190

$z=(2190-1490)/(320)\approx2.19$

Since it is greater than 1.96 , thus it is unusual.

For x= 1240

$z=(1370-1490)/(320)\approx-0.38$

Since it lies between -1.96 and 1.96 , thus it is not unusual.