作业帮复数的证明:arg(z^n)=n arg(z)[2π],z=\=0,n∈N 能这样证明吗?arg(z^n)=arg(z^m ×z^n-m) m∈N,m为常数因为arg(z1*z2)≡arg(z1)+arg(z2) [2π]所以可得arg(z^m ×z^n-m)≡arg(z^m)+arg(z^n-m) [2π]arg(z^m ×z^n-m)≡m*arg(z)+(n-m)arg(z)
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![复数的证明:arg(z^n)=n arg(z)[2π],z=\=0,n∈N 能这样证明吗?arg(z^n)=arg(z^m ×z^n-m) m∈N,m为常数因为arg(z1*z2)≡arg(z1)+arg(z2) [2π]所以可得arg(z^m ×z^n-m)≡arg(z^m)+arg(z^n-m) [2π]arg(z^m ×z^n-m)≡m*arg(z)+(n-m)arg(z)](/uploads/image/z/1207621-37-1.jpg?t=%E5%A4%8D%E6%95%B0%E7%9A%84%E8%AF%81%E6%98%8E%EF%BC%9Aarg%28z%5En%29%3Dn+arg%28z%29%5B2%CF%80%5D%2Cz%3D%5C%3D0%2Cn%E2%88%88N+%E8%83%BD%E8%BF%99%E6%A0%B7%E8%AF%81%E6%98%8E%E5%90%97%3Farg%28z%5En%29%3Darg%28z%5Em+%C3%97z%5En-m%29+m%E2%88%88N%2Cm%E4%B8%BA%E5%B8%B8%E6%95%B0%E5%9B%A0%E4%B8%BAarg%28z1%2Az2%29%E2%89%A1arg%28z1%29%2Barg%28z2%29+%5B2%CF%80%5D%E6%89%80%E4%BB%A5%E5%8F%AF%E5%BE%97arg%28z%5Em+%C3%97z%5En-m%29%E2%89%A1arg%28z%5Em%29%2Barg%28z%5En-m%29+%5B2%CF%80%5Darg%28z%5Em+%C3%97z%5En-m%29%E2%89%A1m%2Aarg%28z%29%2B%28n-m%29arg%28z%29)
复数的证明:arg(z^n)=n arg(z)[2π],z=\=0,n∈N 能这样证明吗?arg(z^n)=arg(z^m ×z^n-m) m∈N,m为常数因为arg(z1*z2)≡arg(z1)+arg(z2) [2π]所以可得arg(z^m ×z^n-m)≡arg(z^m)+arg(z^n-m) [2π]arg(z^m ×z^n-m)≡m*arg(z)+(n-m)arg(z)
复数的证明:arg(z^n)=n arg(z)[2π],z=\=0,n∈N 能这样证明吗?
arg(z^n)=arg(z^m ×z^n-m) m∈N,m为常数
因为arg(z1*z2)≡arg(z1)+arg(z2) [2π]
所以可得arg(z^m ×z^n-m)≡arg(z^m)+arg(z^n-m) [2π]
arg(z^m ×z^n-m)≡m*arg(z)+(n-m)arg(z) [2π]
arg(z^m ×z^n-m)≡n*arg(z) [2π]
疑问是:能否就这样推论?
复数的证明:arg(z^n)=n arg(z)[2π],z=\=0,n∈N 能这样证明吗?arg(z^n)=arg(z^m ×z^n-m) m∈N,m为常数因为arg(z1*z2)≡arg(z1)+arg(z2) [2π]所以可得arg(z^m ×z^n-m)≡arg(z^m)+arg(z^n-m) [2π]arg(z^m ×z^n-m)≡m*arg(z)+(n-m)arg(z)
圆上取三点z1,z2,z3
arg((z3-z2)/(z3-z1))是∠z2z3z1
arg(z2/z1)是∠z2Oz1
因为arg的范围,
我们可以认为z1,z2,z3的位置使得
∠z2z3z1是∠z2Oz1的同弧的圆周角
我们知道同弧的圆周角是圆心角的一半.