证明: 设BD与圆O交于G,连EG 设圆O半径为R,则,AE=EF=FB=2R AD⊥OD==>AP为圆O切线==>AD^2=AE*AF=2R*4=8R^2,AD=2√2R cosA=AD/AO=(2√2R)/(3R)=2√2/3 BD^2=AD^2+AB^2-2AD*AB*cosA =8R^2+36R^2-2*(2√2R)*(6R)*(2√2/3)...