20/10/19 16:52:33.29 p8xYs2Sf.net
前>>322
tan9°/tan3°={3-tan^2(3°)}/{1-3tan^2(3°)+3√3tan3°-√3tan^3(3°)}
tan75°/tan51°=(2+√3){1-3tan^2(3°)+3√3tan3°-√3tan^3(3°)}/{√3-3√3tan^2(3°)-3tan(3°)+tan^3(3°)}より、
(tan9°)(tan51°)/tan3°
={3-tan^2(3°)}{√3-3√3tan^2(3°)-3tan(3°)+tan^3(3°)}/{1-3tan^2(3°)+3√3tan3°-√3tan^3(3°)}^2
=3{√3-3√3tan^2(3°)-3tan(3°)+tan^3(3°)}-tan^2(3°) {√3-3√3tan^2(3°)-3tan(3°)+tan^3(3°)}/{1+9tan^4(3°)+27tan^2(3°)+9tan^2(3°)+tan^6(3°)-18tan^2(3°)+18√3tan^3(3°)-6tan^4(3°)+2√3tan^3(3°)}
={3√3-9√3tan^2(3°)-9tan(3°)+3tan^3(3°)-√3tan^2(3°)+3√3tan^4(3°)+3tan^3(3°)-tan^5(3°)}/{1+18tan^2(3°)+20√3tan^3(3°)+3tan^4(3°)+tan^6(3°)}
={3√3-9tan(3°)-10√3tan^2(3°)+6tan^3(3°)+3√3tan^4(3°)-tan^5(3°)}/{1+18tan^2(3°)+20√3tan^3(3°)+3tan^4(3°)+tan^6(3°)}
ここまでできた。
2+√3になりそうじゃない?
それとも限りなく近い近似値なのかなぁ?
計算機で誤差が0になるぐらいの。