the equation shown is used in statistics to relate $z$, the $z$-score of a data element, to $x$, the value…

the equation shown is used in statistics to relate $z$, the $z$-score of a data element, to $x$, the value of the data element, $m$, the mean of the data set, and $d$, the standard deviation of the data: $z = \\frac{x - m}{d}$. solve the formula for $m$, the mean of the data set. enter your answer in the box. $m = $

the equation shown is used in statistics to relate $z$, the $z$-score of a data element, to $x$, the value of the data element, $m$, the mean of the data set, and $d$, the standard deviation of the data: $z = \\frac{x - m}{d}$. solve the formula for $m$, the mean of the data set. enter your answer in the box. $m = $

Answer

Explanation:

Step1: Multiply both sides by d

$z\times d=\frac{x - m}{d}\times d$ $zd=x - m$

Step2: Isolate m

$m=x - zd$

Answer:

$x - zd$