x=-\sqrt{100\cos(\theta )-y^{2}}

x=\sqrt{100\cos(\theta )-y^{2}}

y=-\sqrt{100\cos(\theta )-x^{2}}

y=\sqrt{100\cos(\theta )-x^{2}}

x=\sqrt{100\cos(\theta )-y^{2}}

x=-\sqrt{100\cos(\theta )-y^{2}}\text{, }\exists n_{1}\in \mathrm{Z}\text{ : }\left(\theta \geq \frac{\pi \left(4n_{1}+3\right)}{2}\text{ and }\theta \leq \frac{\pi \left(4n_{1}+5\right)}{2}\right)\text{ and }\exists n_{1}\in \mathrm{Z}\text{ : }\left(\theta \geq \frac{\pi \left(4n_{1}-1\right)}{2}\text{ and }\theta \leq \frac{\pi \left(4n_{1}+1\right)}{2}\right)\text{ and }|y|\leq 10\sqrt{\cos(\theta )}

y=\sqrt{100\cos(\theta )-x^{2}}

y=-\sqrt{100\cos(\theta )-x^{2}}\text{, }\exists n_{1}\in \mathrm{Z}\text{ : }\left(\theta \geq \frac{\pi \left(4n_{1}+3\right)}{2}\text{ and }\theta \leq \frac{\pi \left(4n_{1}+5\right)}{2}\right)\text{ and }\exists n_{1}\in \mathrm{Z}\text{ : }\left(\theta \geq \frac{\pi \left(4n_{1}-1\right)}{2}\text{ and }\theta \leq \frac{\pi \left(4n_{1}+1\right)}{2}\right)\text{ and }|x|\leq 10\sqrt{\cos(\theta )}