Question 1166922
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The distribution of scores on a standardized aptitude test is approximately normal with a mean of 520 and a standard deviation of 95.
What is the minimum score needed to be in the top 15% on this test? Carry your intermediate computations to at least four decimal places, and round your answer to the nearest integer.
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The other  " tutor "  (which is an  Artificial  Intelligence,  I think - it is why I write 
here  " tutor "  in quotation marks)  obtained the value for the score to be  618.458
and then rounded it to the  " nearest integer "  618.



In this problem,  such rounding is a  {{{highlight(highlight(MISTAKE))}}}:   to be in the top  15%,
the rounding should go to the nearest &nbsp;<U>GREATER</U> &nbsp;integer number, &nbsp;which is &nbsp;619.