Inserta diferentes funciones que modelicen el perfil de la flor: función lineal, cuadrática, raíz cuadrada, racional, exponencial y logarítmica[br]输入不同函数用于建模花朵轮廓：一次函数、二次函数、平方根函数、有理函数、指数函数和对数函数。

修改自：[url=https://www.geogebra.org/u/deborapereiro]Débora Pereiro Carbajo[/url] 的 Flores a partir de funciones elementales，https://www.geogebra.org/m/s5kkvsck[br]西班牙语， 2022年4月14日[br][br]可参见：[url=https://www.geogebra.org/u/deborapereiro]Débora Pereiro Carbajo[/url] 的 Flores con funciones，https://www.geogebra.org/m/qamjrsms[br]2021年1月17日[br][br]参见 [url=https://www.geogebra.org/u/deborapereiro]Débora Pereiro Carbajo[/url] 的 GGB绘本：[br][url=https://www.geogebra.org/m/cs8ks2gk]IDM 314 Libando las matemáticas de las fl[br][/url]IDM 314 Libando las matemáticas de las flores con GeoGebra[br]https://www.geogebra.org/m/cs8ks2gk[br][br]参见[br] [url=https://www.geogebra.org/m/edqynt4y]Flores: del jardín a GeoGebra[br][br][color=#b20ea8]Flores: del jardín a GeoGebra[/color][br][color=#b20ea8][i]Débora Pereiro Carbajo y Javier Cayetano Rodríguez[/i][/color][br][br][color=#b20ea8]Ártículo publicado en UNIÓN: [/color][/url][color=#b20ea8][url=https://union.fespm.es/index.php/UNION/article/view/331]https://union.fespm.es/index.php/UNION/article/view/331[/url][/color]

关键技术：[br]l1={x(F),x(G)}[br]t1=最小值(l1)[br]t2=最大值(l1)[br][br]函数f、g（点A、E、B）可调节[br]f(x)=多项式函数({A,E,B})[br]g(x)=0.5 x^(2)[br]a=曲线(t,f(t),g(t),t,t1,t2)[br]b=曲线(t,-f(t),g(t),t,t1,t2)[br][br]立体花瓣单体[br]c=曲面(k a(t)+(1-k) b(t),k,0,1,t,t1,t2)[br][img]data:image/png;base64,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[/img][br][br]最终立体花瓣[br]flor=序列(旋转(c,k*2 ((π)/(n)),h),k,1,n)[br]n控制花瓣的数量[br][br]水平面的花瓣[br]d=积分介于(f,-f(x),t1,t2)