Ebatzi: v, r, ω, V, s, t, u, w (complex solution)
r=\frac{\left(\pi \omega \right)^{-\frac{1}{2}}\sqrt{2w}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega \neq 0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w\neq 0
r=-\frac{\left(\pi \omega \right)^{-\frac{1}{2}}\sqrt{2w}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega \neq 0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w\neq 0
r\neq 0\text{, }t=0\text{, }s=0\text{, }v=0\text{, }\omega =0\text{, }V=0\text{, }u=0\text{, }w=0
Ebatzi: v, r, ω, V, s, t, u, w
r=-\frac{\sqrt{\frac{2w}{\pi \omega }}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega >0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w>0
r=-\frac{\sqrt{\frac{2w}{\pi \omega }}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega <0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w<0
r=\frac{\sqrt{\frac{2w}{\pi \omega }}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega >0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w>0
r=\frac{\sqrt{\frac{2w}{\pi \omega }}}{2}\text{, }t=w\text{, }s=w\text{, }v=r\omega \text{, }\omega <0\text{, }V=\frac{\omega }{2\pi }\text{, }u=w\text{, }w<0
r\neq 0\text{, }t=0\text{, }s=0\text{, }v=0\text{, }\omega =0\text{, }V=0\text{, }u=0\text{, }w=0
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