\(\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d}{1} \cdot \frac{a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}\)
- Started with
\[\frac{b \cdot c - a \cdot d}{{c}^2 + {d}^2}\]
12.6
- Using strategy
rm 12.6
- Applied add-sqr-sqrt to get
\[\frac{b \cdot c - a \cdot d}{\color{red}{{c}^2 + {d}^2}} \leadsto \frac{b \cdot c - a \cdot d}{\color{blue}{{\left(\sqrt{{c}^2 + {d}^2}\right)}^2}}\]
12.5
- Applied simplify to get
\[\frac{b \cdot c - a \cdot d}{{\color{red}{\left(\sqrt{{c}^2 + {d}^2}\right)}}^2} \leadsto \frac{b \cdot c - a \cdot d}{{\color{blue}{\left(\sqrt{c^2 + d^2}^*\right)}}^2}\]
8.0
- Applied taylor to get
\[\frac{b \cdot c - a \cdot d}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} \leadsto \frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}\]
8.0
- Taylor expanded around 0 to get
\[\color{red}{\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}} \leadsto \color{blue}{\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}}\]
8.0
- Using strategy
rm 8.0
- Applied *-un-lft-identity to get
\[\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{{\color{red}{\left(\sqrt{c^2 + d^2}^*\right)}}^2} \leadsto \frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{{\color{blue}{\left(1 \cdot \sqrt{c^2 + d^2}^*\right)}}^2}\]
8.0
- Applied square-prod to get
\[\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{\color{red}{{\left(1 \cdot \sqrt{c^2 + d^2}^*\right)}^2}} \leadsto \frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \frac{d \cdot a}{\color{blue}{{1}^2 \cdot {\left(\sqrt{c^2 + d^2}^*\right)}^2}}\]
8.0
- Applied times-frac to get
\[\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \color{red}{\frac{d \cdot a}{{1}^2 \cdot {\left(\sqrt{c^2 + d^2}^*\right)}^2}} \leadsto \frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \color{blue}{\frac{d}{{1}^2} \cdot \frac{a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}}\]
4.3
- Applied simplify to get
\[\frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \color{red}{\frac{d}{{1}^2}} \cdot \frac{a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} \leadsto \frac{b \cdot c}{{\left(\sqrt{c^2 + d^2}^*\right)}^2} - \color{blue}{\frac{d}{1}} \cdot \frac{a}{{\left(\sqrt{c^2 + d^2}^*\right)}^2}\]
4.3
