Use this rule: \(\frac{a}{b} \times \frac{c}{d}=\frac{ac}{bd}\).
\[\frac{If(x+a)}{a-b}=\frac{(x+b)thenx}{a+b}\]
Multiply both sides by \(a+b\).
\[\frac{If(x+a)}{a-b}(a+b)=(x+b)thenx\]
Use this rule: \(\frac{a}{b} \times c=\frac{ac}{b}\).
\[\frac{If(x+a)(a+b)}{a-b}=(x+b)thenx\]
Divide both sides by \(x+b\).
\[\frac{\frac{If(x+a)(a+b)}{a-b}}{x+b}=thenx\]
Simplify \(\frac{\frac{If(x+a)(a+b)}{a-b}}{x+b}\) to \(\frac{If(x+a)(a+b)}{(a-b)(x+b)}\).
\[\frac{If(x+a)(a+b)}{(a-b)(x+b)}=thenx\]
Divide both sides by \(h\).
\[\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)}}{h}=tenx\]
Simplify \(\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)}}{h}\) to \(\frac{If(x+a)(a+b)}{(a-b)(x+b)h}\).
\[\frac{If(x+a)(a+b)}{(a-b)(x+b)h}=tenx\]
Divide both sides by \(e\).
\[\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)h}}{e}=tnx\]
Simplify \(\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)h}}{e}\) to \(\frac{If(x+a)(a+b)}{(a-b)(x+b)he}\).
\[\frac{If(x+a)(a+b)}{(a-b)(x+b)he}=tnx\]
Divide both sides by \(n\).
\[\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)he}}{n}=tx\]
Simplify \(\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)he}}{n}\) to \(\frac{If(x+a)(a+b)}{(a-b)(x+b)hen}\).
\[\frac{If(x+a)(a+b)}{(a-b)(x+b)hen}=tx\]
Divide both sides by \(x\).
\[\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)hen}}{x}=t\]
Simplify \(\frac{\frac{If(x+a)(a+b)}{(a-b)(x+b)hen}}{x}\) to \(\frac{If(x+a)(a+b)}{(a-b)(x+b)henx}\).
\[\frac{If(x+a)(a+b)}{(a-b)(x+b)henx}=t\]
Switch sides.
\[t=\frac{If(x+a)(a+b)}{(a-b)(x+b)henx}\]
t=(If(x+a)*(a+b))/((a-b)*(x+b)*h*e*n*x)
