對數
發表於 : 2012年 5月 28日, 14:10
a,b,c為異於1的正時數,若(1/loga)+(1/logb)+(1/logc)=1/(loga+logb+logc)
求(ab-1)(bc-1)(ca-1)之值
求(ab-1)(bc-1)(ca-1)之值
令 loga = x,logb = y,logc = z
1/x + 1/y + 1/z = 1/(x + y + z)
(yz + zx + xy)(x + y + z) - xyz = 0
x^2y + y^2z + z^2x + xy^2 + yz^2 + zx^2 + 2xyz = 0
(x + y)(y + z)(z + x) = 0
x + y = log(ab)
ab = 10^(x + y)
故 ab = 1 or bc = 1 or ca = 1
(ab - 1)(bc - 1)(ca - 1) = 0