pf(x)+qf(y)>=f(px+qy)
px^2+pax+pb+qy^2+qay+qb>=(px+qy)^2+apx+aqy+b
px^2+qy^2>=(px+qy)^2
px^2+qy^2>=p^2x^2+q^2y^2+2pqxy
(p-p^2)x^2+(q-q^2)y^2>=2pqxy
將q=1-p代入,化簡得
(p-p^2)(x^2+y^2)>=2(p-p^2)xy
∵ x^2+y^2>=2xy
∴ p-p^2>0
p>p^2
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