Tximeleta-kurba (transzendentea)From Wikipedia, the free encyclopedia Tximeleta-kurba (ingelesez butterfly curve) Temple H. Fayk aurkitutako kurba plano transzendentea da. Ekuazio parametriko hauek definitzen dute: x = sin ( t ) ( e cos ( t ) − 2 cos ( 4 t ) − sin 5 ( t 12 ) ) {\displaystyle x=\sin(t)\left(e^{\cos(t)}-2\cos(4t)-\sin ^{5}\left({t \over 12}\right)\right)} y = cos ( t ) ( e cos ( t ) − 2 cos ( 4 t ) − sin 5 ( t 12 ) ) {\displaystyle y=\cos(t)\left(e^{\cos(t)}-2\cos(4t)-\sin ^{5}\left({t \over 12}\right)\right)} Tximeleta-kurba. edo honako ekuazio polarrak: r = e cos θ − 2 cos ( 4 θ ) + sin 5 ( 2 θ − π 24 ) {\displaystyle r=e^{\cos \theta }-2\cos(4\theta )+\sin ^{5}\left({\frac {2\theta -\pi }{24}}\right)}
Tximeleta-kurba (ingelesez butterfly curve) Temple H. Fayk aurkitutako kurba plano transzendentea da. Ekuazio parametriko hauek definitzen dute: x = sin ( t ) ( e cos ( t ) − 2 cos ( 4 t ) − sin 5 ( t 12 ) ) {\displaystyle x=\sin(t)\left(e^{\cos(t)}-2\cos(4t)-\sin ^{5}\left({t \over 12}\right)\right)} y = cos ( t ) ( e cos ( t ) − 2 cos ( 4 t ) − sin 5 ( t 12 ) ) {\displaystyle y=\cos(t)\left(e^{\cos(t)}-2\cos(4t)-\sin ^{5}\left({t \over 12}\right)\right)} Tximeleta-kurba. edo honako ekuazio polarrak: r = e cos θ − 2 cos ( 4 θ ) + sin 5 ( 2 θ − π 24 ) {\displaystyle r=e^{\cos \theta }-2\cos(4\theta )+\sin ^{5}\left({\frac {2\theta -\pi }{24}}\right)}