設A(a,2/a),B(b,2/b),則C(0,2/a),D(0,2/b)
CA = 2/a,DB = 2/b
CD = |a - b|
梯形ABCD的面積S1 = (1/2)(CA + DB)*CD = (1/2)(2/a + 2/b)|a-b| = (a+b)|a-b|/ab
AB的方程為：(y - 2/a)/(x - a) = (2/b - 2/a)/(b - a) = -2/ab
2x + aby -2(a+b) = 0
O到AB的距離為d = |2*0 + ab*0 - 2(a+b)|/√[2² + (ab)²] = 2(a+b)/√(4 + a²b²)
AB = √[(a - b)² + (2/a - 2/b)²]
= (|a-b|/ab)√(4 + a²b²)
△AOB面積S2 = (1/2)*AB*d = (1/2)(|a-b|/ab)√(4 + a²b²)*2(a+b)/√(4 + a²b²)
= (a+b)|a-b|/(ab)
S1 = S2