Find a geometric way to prove the inequality! (Posted on 2007-11-07)

	Submitted by Chesca Ciprian
Rating: 3.3333 (3 votes)
Solution:	(Hide)
Let consider on the graph of the function f(x) = 1/x , 4 point A(a,1/a),B(b,1/b),C(c,1/c),D(d,1/d) with 0 < a < b < c < d. These points form 4 trapezium. The sum of the area of 3 trapezium are smaller than the last trapezium. So we can write that (b-a)(1/a+1/b) + (c-b)(1/c+1/b) + (d-c)(1/d+1/c) < (d-a)(1/a+1/d). After calculus we find that : a/b+b/c+c/d+d/a > b/a+c/b+d/c+a/d!

	Subject	Author	Date
	It's OK!	Chesca Ciprian	2007-11-08 13:08:25
	Trying again	Mike C	2007-11-08 10:39:02
	re: Similary...but different!	Mike C	2007-11-08 10:12:01
	Similary...but different!	Chesca Ciprian	2007-11-07 14:41:56
	No Subject	Mike C	2007-11-07 11:13:16