Simplify \(25y\times 5w\) to \(125yw\).
\[\begin{aligned}&SIz=-125yw+z=425\\&entonceselvalordewes\end{aligned}\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[\begin{aligned}&SIz=-125yw+z=425\\&{e}^{5}{n}^{2}t{o}^{2}c{s}^{2}{l}^{2}vardw\end{aligned}\]
Subtract \(z\) from both sides.
\[SIz-z=-125yw\]
Divide both sides by \(-125\).
\[-\frac{SIz-z}{125}=yw\]
Divide both sides by \(w\).
\[-\frac{\frac{SIz-z}{125}}{w}=y\]
Simplify \(\frac{\frac{SIz-z}{125}}{w}\) to \(\frac{SIz-z}{125w}\).
\[-\frac{SIz-z}{125w}=y\]
Switch sides.
\[y=-\frac{SIz-z}{125w}\]
y=-(SIz-z)/(125*w)
