往复点阵演示 iShow

往复点阵
20260710 修改自:[url=https://www.geogebra.org/u/ansheng]赵林[/url] — 2021年10月22日 - 下午10:07 的 https://www.geogebra.org/m/dqwt8y4z#material/g4mafbjv
n=Slider(1,30,1)[br]SetValue(n,26)[br][br]#获得系列点,j前乘以(-1)^(i),使得每一列的点的顺序有了交替变化,减一使得都是从0开始,或者最大数开始[br]l1=扁平列表(序列(序列((i,余式([b][color=#ff0000](-1)^(i)[/color][/b] j[b][color=#ff0000]-1[/color][/b],i+1)),j,1,i),i,1,45))[br][img]data:image/png;base64,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[/img][br][br]#基本序列是:序列(序列((i,余式(j-1,i+1)),j,1,i),i,1,45),但是顺序都是从底部往上数的[br][img]data:image/png;base64,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[/img][br][br]以下变式使点的纵坐标变小,往下移[br]l1=扁平列表(序列(序列((i-1,余式((-1)^(i) j-1,i+1)[color=#ff0000]*2[/color]-((i-1)[color=#ff0000]/(2))*2[/color]),j,1,i),i,1,45))[br][br]l1=扁平列表(序列(序列((i,余式((-1)^(i) j-1,i+1)-((i-1)[color=#ff0000]/(2)[/color])),j,1,i),i,1,45))[br][br]l1=扁平列表(序列(序列((i,余式((-1)^(i) j-1,i+1)[color=#980000]*2[/color]-((i-1)/(2))*2),j,1,i),i,1,45))[br][br][br]#相邻两点的箭头序列,第二个点用l3(i)+0.9 (l3(i+1)-l3(i))作少许偏移[br]#基本序列是:序列(向量(l3(i),l3(i+1)),i,1,n-1)[br]l2=序列(向量(l3(i),[b][color=#ff0000]l3(i)+0.9 (l3(i+1)-l3(i))[/color][/b]),i,1,n-1)[br][br]#已出现的系列点,以及最后一个点[br]l3=最前元素(l1,n)[br]u=元素(l3,n)[br][br]#进阶:可增加一个开关a,在列表点前加A a + 点列表,可是点以点A为基准。[br]

Information: 往复点阵演示 iShow