11(k?2,k?N*),且a2 < a ? b,证明:b? kk?1111解:(构造函数法)令f(a)?a?a2,又0?a??,f(a)在(0,)上单调递增 ,
k22111k?1k?112?∴b?a?a?f()??2?2?2
kkkk?1kk?14.若0?a?
5.记f(x)?1?x,a > b > 0,证明:| f (a) ? f (b) | < | a ? b| (构造图形法)构造矩形ABCD, F在CD上, 使|AB| = a, |DF| = b, |AD| = 1, 则|AC| ? |AF| < |CF|
226.若x, y, z > 0,证明:x?y?xy?2D1AbFa-bC1aBy2?z2?yz?z2?x2?zx
C解:(构造图形法)作?AOB = ?BOC = ?COA = 120?, 设|OA| = x, |OB| = y, |OC| = z 22则由余弦定理 |AC|=x?y?xy
zAxyOB|BC| =
y?z?yz,|CA|=z?x?zx
222222因为|AC+||BC|>|CA|,所以x?y?xy +y2?z2?yz>z2?x2?zx
16