Simplify \(Exerc\imath se\times 17dIf\times \frac{x}{y}\) to \(\frac{17Ex{e}^{2}rc\imath sdIfx}{y}\).
\[\frac{17Ex{e}^{2}rc\imath sdIfx}{y}=\frac{3}{4}\times \frac{evaluate(2x-y)}{2x+y}\]
Regroup terms.
\[\frac{17Ex{e}^{2}dIf\imath rcsx}{y}=\frac{3}{4}\times \frac{evaluate(2x-y)}{2x+y}\]
Simplify \(\frac{3}{4}\times \frac{evaluate(2x-y)}{2x+y}\) to \(\frac{3evaluate(2x-y)}{4(2x+y)}\).
\[\frac{17Ex{e}^{2}dIf\imath rcsx}{y}=\frac{3evaluate(2x-y)}{4(2x+y)}\]
Multiply both sides by \(y\).
\[17Ex{e}^{2}dIf\imath rcsx=\frac{3evaluate(2x-y)}{4(2x+y)}y\]
Use this rule: \(\frac{a}{b} \times c=\frac{ac}{b}\).
\[17Ex{e}^{2}dIf\imath rcsx=\frac{3evaluate(2x-y)y}{4(2x+y)}\]
Regroup terms.
\[17Ex{e}^{2}dIf\imath rcsx=\frac{3yevaluate(2x-y)}{4(2x+y)}\]
Divide both sides by \(17\).
\[Ex{e}^{2}dIf\imath rcsx=\frac{\frac{3yevaluate(2x-y)}{4(2x+y)}}{17}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{4(2x+y)}}{17}\) to \(\frac{3yevaluate(2x-y)}{4\times 17(2x+y)}\).
\[Ex{e}^{2}dIf\imath rcsx=\frac{3yevaluate(2x-y)}{4\times 17(2x+y)}\]
Simplify \(4\times 17(2x+y)\) to \(68(2x+y)\).
\[Ex{e}^{2}dIf\imath rcsx=\frac{3yevaluate(2x-y)}{68(2x+y)}\]
Divide both sides by \(Ex\).
\[{e}^{2}dIf\imath rcsx=\frac{\frac{3yevaluate(2x-y)}{68(2x+y)}}{Ex}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68(2x+y)}}{Ex}\) to \(\frac{3yevaluate(2x-y)}{68Ex(2x+y)}\).
\[{e}^{2}dIf\imath rcsx=\frac{3yevaluate(2x-y)}{68Ex(2x+y)}\]
Divide both sides by \({e}^{2}\).
\[dIf\imath rcsx=\frac{\frac{3yevaluate(2x-y)}{68Ex(2x+y)}}{{e}^{2}}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex(2x+y)}}{{e}^{2}}\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}(2x+y)}\).
\[dIf\imath rcsx=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}(2x+y)}\]
Divide both sides by \(dIf\).
\[\imath rcsx=\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}(2x+y)}}{dIf}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}(2x+y)}}{dIf}\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf(2x+y)}\).
\[\imath rcsx=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf(2x+y)}\]
Divide both sides by \(\imath \).
\[rcsx=\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf(2x+y)}}{\imath }\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf(2x+y)}}{\imath }\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath (2x+y)}\).
\[rcsx=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath (2x+y)}\]
Divide both sides by \(c\).
\[rsx=\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath (2x+y)}}{c}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath (2x+y)}}{c}\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath c(2x+y)}\).
\[rsx=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath c(2x+y)}\]
Divide both sides by \(s\).
\[rx=\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath c(2x+y)}}{s}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath c(2x+y)}}{s}\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath cs(2x+y)}\).
\[rx=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath cs(2x+y)}\]
Divide both sides by \(x\).
\[r=\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath cs(2x+y)}}{x}\]
Simplify \(\frac{\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath cs(2x+y)}}{x}\) to \(\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath csx(2x+y)}\).
\[r=\frac{3yevaluate(2x-y)}{68Ex{e}^{2}dIf\imath csx(2x+y)}\]
r=(3*y*evaluate(2*x-y))/(68*Ex*e^2*dIf*IM*c*s*x*(2*x+y))
