1 Answer

Solarenqu · Answer 1 · 2023-04-24T13:55:32+0000

Let us write out the given data,

$\begin{gathered} \mu=\operatorname{mean}=3350 \\ \sigma=standard\text{ deviation=122} \\ x=3500 \\ z=z-\text{score} \end{gathered}$

Let us now write the formula for Z-score,

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

Let us solve for z-score,

$\begin{gathered} z=(3500-3350)/(122) \\ =(150)/(122)=1.2295 \\ z=1.2295 \end{gathered}$

The probablity that the percent of adult who eat more than 3500 will be

[tex]\begin{gathered} Pr(z>1.23)\Rightarrow Pr(0Hence,the percent of adults who eat more than 3500 calories per day is 11%

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