F1(-√2,0),F2(√2,0),设M(x,y) 　　则：x^2-y^2=1|MO|=√(x^2+y^2)|MF1|=√[(x+√2)^2+y^2]|MF2|=√[(x-√2)^2+y^2] 　　√[(x+√2)^2+y^2]+√[(x-√2)^2+y^2]/√(x^2+y^2)=√6 　　解得M的坐标： 　　（-√2/2{1+[3√6+27+3√(6+18√6)]^(1/3)/3+3/[3√6+27+3√(6+18√6)]^(1/3)+2/3*√6}, 　　1/6/(3√6+27+3√(6+18√6))^(2/3)*√2*((3√6+27+3√(6+18√6))^(2/3)*(18√(6+18√6)+33*(3√6+27+3√(6+18√6))^(2/3)+126√6+315+12√6√(6+18√6)+54*(3√6+27+3√(6+18√6))^(1/3)+12√6*(3√6+27+3√(6+18√6))^(2/3)+(3√6+27+3√(6+18√6))^(4/3)+36√6*(3√6+27+3√(6+18√6))^(1/3)))^(1/2)） 　　或 　　（-√2/2{1+[3√6+27+3√(6+18*√6))^(1/3)/3+3/[3√6+27+3√(6+18√6))^(1/3)+2/3*√6)}, 　　-1/6/(3√6+27+3√(6+18√6))^(2/3)*√2*((3√6+27+3√(6+18√6))^(2/3)*(18√(6+18√6)+33(3√6+27+3√(6+18√6))^(2/3)+126√6+315+12√6√(6+18√6)+54*(3√6+27+3√(6+18√6)^(1/3)+12√6*(3√6+27+3√(6+18√6))^(2/3)+(3√6+27+3√(6+18√6))^(4/3)+36√6*(3√6+27+3√(6+18√6))^(1/3)))^(1/2))