第衣果:
如何证明gcd(a,b)=gcd(a+b,lcm(a,b))
设a=r1*k;b=r2*k;r1与r2互质
a+b=(r1+r2)*k;
gcd(a,b)=k;
lcm(a,b)=a*b/gcd(a,b)
=r1*r2*k*k/k=r1*r2*k;
所以gcd(a+b,lcm(a,b))=k;
故gcd(a,b)=gcd(a+b,lcm(a,b))
第鹅果:
如何证明gcd(a,b)*lcm(a,b)=a*b;
设x=gcd(a,b),y=lcm(a,b);
设a=m*x,b=n*x;
则y=m*n*x;
所以gcd(a,b)*lcm(a,b)=x*m*n*x;
a*b=m*x*n*x;
故gcd(a,b)*lcm(a,b)=a*b;
证完啦O(∩_∩)O哈哈~
开心QwQ\(^o^)/~
原文:https://www.cnblogs.com/xrj1229/p/9211021.html