Anasayfa: Revizyonlar arasındaki fark
mo |
Mob |
||
| 12. satır: | 12. satır: | ||
: <math>Mo = zeng^2</math> | : <math>Mo = zeng^2</math> | ||
Notice how <math>e^{1/g}</math> changes in terms of <math>Horroz</math>. Because of the hyper-quantum interpolative design of this n-dimensional nano-system architecture, we can write this equation: | Notice how <math>e^{1/g}</math> changes in terms of <math>Horroz</math>. Because of the hyper-quantum interpolative design of this n-dimensional nano-system architecture, we can write this equation: | ||
: <math>\sqrt{Horroz} = \log _{n}\left(\sum _{x=1}^{\lceil Re(z)\rceil }\operatorname {sinc} \left(\prod _{y=1}^{\lceil Re(z)\rceil +1}\left(\int_{-\infty}^{-\infty}{e^{\sin\sin x^y}n^z dg}\right)\right)\right)</math> | : <math>\sqrt{\text{Horroz}} = \log _{n}\left(\sum _{x=1}^{\lceil Re(z)\rceil }\operatorname {sinc} \left(\prod _{y=1}^{\lceil Re(z)\rceil +1}\left(\int_{-\infty}^{-\infty}{e^{\sin\sin x^y}n^{\pi z} dg}\right)\right)\right)</math> | ||
Therefore, one can show that: | |||
: <math>\sqrt{\text{Zıkkım}} = \frac{e^{1-2^\varphi}}{\sqrt{\pi \text{Horroz}}} \int_{0}^{\text{Horroz}} {e^{-t^3} dt}</math> | |||