- Started with
\[\left(x.re \cdot x.re - x.im \cdot x.im\right) \cdot x.im + \left(x.re \cdot x.im + x.im \cdot x.re\right) \cdot x.re\]
7.0
- Applied simplify to get
\[\color{red}{\left(x.re \cdot x.re - x.im \cdot x.im\right) \cdot x.im + \left(x.re \cdot x.im + x.im \cdot x.re\right) \cdot x.re} \leadsto \color{blue}{x.im \cdot \left(\left(x.re + x.re\right) \cdot x.re + \left(x.re + x.im\right) \cdot \left(x.re - x.im\right)\right)}\]
7.0
- Applied taylor to get
\[x.im \cdot \left(\left(x.re + x.re\right) \cdot x.re + \left(x.re + x.im\right) \cdot \left(x.re - x.im\right)\right) \leadsto 3 \cdot \left(x.im \cdot {x.re}^2\right) - {x.im}^{3}\]
6.9
- Taylor expanded around inf to get
\[\color{red}{3 \cdot \left(x.im \cdot {x.re}^2\right) - {x.im}^{3}} \leadsto \color{blue}{3 \cdot \left(x.im \cdot {x.re}^2\right) - {x.im}^{3}}\]
6.9
- Using strategy
rm 6.9
- Applied square-mult to get
\[3 \cdot \left(x.im \cdot \color{red}{{x.re}^2}\right) - {x.im}^{3} \leadsto 3 \cdot \left(x.im \cdot \color{blue}{\left(x.re \cdot x.re\right)}\right) - {x.im}^{3}\]
6.9
- Applied associate-*r* to get
\[3 \cdot \color{red}{\left(x.im \cdot \left(x.re \cdot x.re\right)\right)} - {x.im}^{3} \leadsto 3 \cdot \color{blue}{\left(\left(x.im \cdot x.re\right) \cdot x.re\right)} - {x.im}^{3}\]
0.2
- Using strategy
rm 0.2
- Applied associate-*r* to get
\[\color{red}{3 \cdot \left(\left(x.im \cdot x.re\right) \cdot x.re\right)} - {x.im}^{3} \leadsto \color{blue}{\left(3 \cdot \left(x.im \cdot x.re\right)\right) \cdot x.re} - {x.im}^{3}\]
0.2
