Remove parentheses.
\[px={x}^{2}-4x+3thenevaluatep(3)-p\times -1-p\times \frac{2}{5}Simpl\imath fy\]
Regroup terms.
\[px={x}^{2}-4x+3enevaluatep(3)th-p\times -1-p\times \frac{2}{5}Simpl\imath fy\]
Simplify \(p\times -1\) to \(-p\).
\[px={x}^{2}-4x+3enevaluatep(3)th-(-p)-p\times \frac{2}{5}Simpl\imath fy\]
Simplify \(p\times \frac{2}{5}Simpl\imath fy\) to \(\frac{p\times 2Simpl\imath fy}{5}\).
\[px={x}^{2}-4x+3enevaluatep(3)th-(-p)-\frac{p\times 2Simpl\imath fy}{5}\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[px={x}^{2}-4x+3enevaluatep(3)th-(-p)-\frac{{p}^{2}\times 2Siml\imath fy}{5}\]
Regroup terms.
\[px={x}^{2}-4x+3enevaluatep(3)th-(-p)-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Remove parentheses.
\[px={x}^{2}-4x+3enevaluatep(3)th+p-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Subtract \({x}^{2}\) from both sides.
\[px-{x}^{2}=-4x+3enevaluatep(3)th+p-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Factor out the common term \(x\).
\[x(p-x)=-4x+3enevaluatep(3)th+p-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Add \(4x\) to both sides.
\[x(p-x)+4x=3enevaluatep(3)th+p-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Factor out the common term \(x\).
\[x(p-x+(4))=3enevaluatep(3)th+p-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Subtract \(p\) from both sides.
\[x(p-x+4)-p=3enevaluatep(3)th-\frac{2Si\imath {p}^{2}mlfy}{5}\]
Add \(\frac{2Si\imath {p}^{2}mlfy}{5}\) to both sides.
\[x(p-x+4)-p+\frac{2Si\imath {p}^{2}mlfy}{5}=3enevaluatep(3)th\]
Divide both sides by \(3\).
\[\frac{x(p-x+4)-p+\frac{2Si\imath {p}^{2}mlfy}{5}}{3}=enevaluatep(3)th\]
Simplify \(\frac{x(p-x+4)-p+\frac{2Si\imath {p}^{2}mlfy}{5}}{3}\) to \(\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{\frac{2Si\imath {p}^{2}mlfy}{5}}{3}\).
\[\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{\frac{2Si\imath {p}^{2}mlfy}{5}}{3}=enevaluatep(3)th\]
Simplify \(\frac{\frac{2Si\imath {p}^{2}mlfy}{5}}{3}\) to \(\frac{2Si\imath {p}^{2}mlfy}{5\times 3}\).
\[\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{5\times 3}=enevaluatep(3)th\]
Simplify \(5\times 3\) to \(15\).
\[\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}=enevaluatep(3)th\]
Divide both sides by \(e\).
\[\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{e}=nevaluatep(3)th\]
Divide both sides by \(nevaluatep(3)\).
\[\frac{\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{e}}{nevaluatep(3)}=th\]
Simplify \(\frac{\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{e}}{nevaluatep(3)}\) to \(\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)}\).
\[\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)}=th\]
Divide both sides by \(h\).
\[\frac{\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)}}{h}=t\]
Simplify \(\frac{\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)}}{h}\) to \(\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)h}\).
\[\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)h}=t\]
Switch sides.
\[t=\frac{\frac{x(p-x+4)}{3}-\frac{p}{3}+\frac{2Si\imath {p}^{2}mlfy}{15}}{enevaluatep(3)h}\]
t=((x*(p-x+4))/3-p/3+(2*Si*IM*p^2*m*l*f*y)/15)/(e*nevaluatep(3)*h)
