Remove parentheses.
If*p*x=x^3+3*x^2-2*x+4*t*h*e*n*f*IM*n*d*t*h*a*l*u*e*o*f\(p\times 2+p\times -2-p\times 0\).
Take out the constants.
If*p*x=x^3+3*x^2-2*x+(4*2)*t*t*h*h*n*n*f*d*a*l*u*o*e*IM*e*f\(p+p\times -2-p\times 0\).
Simplify \(4\times 2\) to \(8\).
If*p*x=x^3+3*x^2-2*x+8*t*t*h*h*n*n*f*d*a*l*u*o*e*IM*e*f\(p+p\times -2-p\times 0\).
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
If*p*x=x^3+3*x^2-2*x+8*t^2*h^2*n^2*f*d*a*l*u*o*e^2*IM*f\(p+p\times -2-p\times 0\).
Regroup terms.
If*p*x=x^3+3*x^2-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p+p\times -2-p\times 0\).
Regroup terms.
If*p*x=x^3+3*x^2-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-p\times 0\).
Regroup terms.
If*p*x=x^3+3*x^2-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Subtract \({x}^{3}\) from both sides.
If*p*x-x^3=3*x^2-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Factor out the common term \(x\).
x*(If*p-x^2)=3*x^2-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Subtract \(3{x}^{2}\) from both sides.
x*(If*p-x^2)-3*x^2=-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Factor out the common term \(x\).
x*(If*p-x^2-3*x)=-2*x+8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Add \(2x\) to both sides.
x*(If*p-x^2-3*x)+2*x=8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Factor out the common term \(x\).
x*(If*p-x^2-3*x+(2))=8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-2p-0\).*p
Add \(2p\) to both sides.
x*(If*p-x^2-3*x+2)+2*p=8*e^2*IM*t^2*h^2*n^2*f*d*a*l*u*o*f\(p-0\).*p
Regroup terms.
Divide both sides by \(8\).
Divide both sides by \({e}^{2}\).
Divide both sides by \(\imath \).
Divide both sides by \({t}^{2}\).
Divide both sides by \({h}^{2}\).
Divide both sides by \({n}^{2}\).
Divide both sides by \(f\).
Divide both sides by \(a\).
Divide both sides by \(l\).
Divide both sides by \(u\).
Divide both sides by \(o\).
Simplify .*p)/(8*e^2*IM*t^2*h^2*n^2*f*a*l*u*o))/f\(p\) to .*p)/(8*e^2*IM*t^2*h^2*n^2*f*a*l*u*o*f\(p\).
Switch sides.
d=(x*(If*p-x^2-3*x+2)+2*p+0].*p)/(8*e^2*IM*t^2*h^2*n^2*f*a*l*u*o*f[p)
