Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[3{x}^{2}=6x-3byf{a}^{2}c{t}^{2}{o}^{2}r{\imath }^{2}zn\]
Use Square Rule: \({i}^{2}=-1\).
\[3{x}^{2}=6x-3byf{a}^{2}c{t}^{2}{o}^{2}r\times -1\times zn\]
Simplify \(3byf{a}^{2}c{t}^{2}{o}^{2}r\times -1\times zn\) to \(-3byf{a}^{2}c{t}^{2}{o}^{2}rzn\).
\[3{x}^{2}=6x-(-3byf{a}^{2}c{t}^{2}{o}^{2}rzn)\]
Remove parentheses.
\[3{x}^{2}=6x+3byf{a}^{2}c{t}^{2}{o}^{2}rzn\]
Factor out the common term \(3\).
\[3{x}^{2}=3(2x+byf{a}^{2}c{t}^{2}{o}^{2}rzn)\]
Cancel \(3\) on both sides.
\[{x}^{2}=2x+byf{a}^{2}c{t}^{2}{o}^{2}rzn\]
Subtract \(2x\) from both sides.
\[{x}^{2}-2x=byf{a}^{2}c{t}^{2}{o}^{2}rzn\]
Divide both sides by \(y\).
\[\frac{{x}^{2}-2x}{y}=bf{a}^{2}c{t}^{2}{o}^{2}rzn\]
Factor out the common term \(x\).
\[\frac{x(x-2)}{y}=bf{a}^{2}c{t}^{2}{o}^{2}rzn\]
Divide both sides by \(f\).
\[\frac{\frac{x(x-2)}{y}}{f}=b{a}^{2}c{t}^{2}{o}^{2}rzn\]
Simplify \(\frac{\frac{x(x-2)}{y}}{f}\) to \(\frac{x(x-2)}{yf}\).
\[\frac{x(x-2)}{yf}=b{a}^{2}c{t}^{2}{o}^{2}rzn\]
Divide both sides by \({a}^{2}\).
\[\frac{\frac{x(x-2)}{yf}}{{a}^{2}}=bc{t}^{2}{o}^{2}rzn\]
Simplify \(\frac{\frac{x(x-2)}{yf}}{{a}^{2}}\) to \(\frac{x(x-2)}{yf{a}^{2}}\).
\[\frac{x(x-2)}{yf{a}^{2}}=bc{t}^{2}{o}^{2}rzn\]
Divide both sides by \(c\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}}}{c}=b{t}^{2}{o}^{2}rzn\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}}}{c}\) to \(\frac{x(x-2)}{yf{a}^{2}c}\).
\[\frac{x(x-2)}{yf{a}^{2}c}=b{t}^{2}{o}^{2}rzn\]
Divide both sides by \({t}^{2}\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}c}}{{t}^{2}}=b{o}^{2}rzn\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}c}}{{t}^{2}}\) to \(\frac{x(x-2)}{yf{a}^{2}c{t}^{2}}\).
\[\frac{x(x-2)}{yf{a}^{2}c{t}^{2}}=b{o}^{2}rzn\]
Divide both sides by \({o}^{2}\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}}}{{o}^{2}}=brzn\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}}}{{o}^{2}}\) to \(\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}}\).
\[\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}}=brzn\]
Divide both sides by \(r\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}}}{r}=bzn\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}}}{r}\) to \(\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}r}\).
\[\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}r}=bzn\]
Divide both sides by \(z\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}r}}{z}=bn\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}r}}{z}\) to \(\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rz}\).
\[\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rz}=bn\]
Divide both sides by \(n\).
\[\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rz}}{n}=b\]
Simplify \(\frac{\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rz}}{n}\) to \(\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rzn}\).
\[\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rzn}=b\]
Switch sides.
\[b=\frac{x(x-2)}{yf{a}^{2}c{t}^{2}{o}^{2}rzn}\]
b=(x*(x-2))/(y*f*a^2*c*t^2*o^2*r*z*n)
