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与多面体在该点的面角之和的差(多面体的面的内角叫做多面体的面角,角度用弧度制),多面体面上非顶点的曲率均为零,多面体的总曲率等于该多面体各顶点的曲率之和.例如:正四面体在每个顶点有3个面角,每个面角是
,所以正四面体在每个顶点的曲率为
,故其总曲率为
.根据曲率的定义,正方体在每个顶点的曲率为
同类型试题
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
