`a)` Thay `m=\sqrt{3}+1` vào hệ ptr có:
`{(\sqrt{3}x-2y=1),(3x+(\sqrt{3}+1)y=1):}`
`<=>{(3x-2\sqrt{3}y=\sqrt{3}),(3x+(\sqrt{3}+1)y=1):}`
`<=>{((3\sqrt{3}+1)y=1-\sqrt{3}),(\sqrt{3}x-2y=1):}`
`<=>{(y=[-5+2\sqrt{3}]/13),(\sqrt{3}x-2[-5+2\sqrt{3}]/13=1):}`
`<=>{(x=[4+\sqrt{3}]/13),(y=[-5+2\sqrt{3}]/13):}`
`b){((m-1)x-2y=1),(3x+my=1):}`
`<=>{(x=[1-my]/3),((m-1)[1-my]/3-2y=1):}`
`<=>{(x=[1-my]/3),(m-m^2y-1+my-6y=3):}`
`<=>{(x=[1-my]/3),((-m^2+m-6)y=4-m):}`
`<=>{(x=[1-my]/3),(y=[4-m]/[-m^2+m-6]):}`
Mà `-m^2+m-6` luôn `ne 0`
`=>AA m` thì đều tìm được `1` giá trị `y` từ đó tìm được `x`
`=>AA m` thì hệ ptr có `1` nghiệm duy nhất
`c){((m-1)x-2y=1),(3x+my=1):}`
`<=>{(x=[1-my]/3),(y=[4-m]/[-m^2+m-6]):}`
`<=>{(x=(1-m[4-m]/[-m^2+m-6]):3),(y=[4-m]/[-m^2+m-6]):}`
`<=>{(x=[-m^2+m-6-4m+m^2]/[-3m^2+3m-18]),(y=[4-m]/[-m^2+m-6]):}`
`<=>{(x=[-3m-6]/[3(-m^2+m-6)]),(y=[4-m]/[-m^2+m-6]):}`
Ta có: `x-y=[-3m-6]/[3(-m^2+m-6)]-[4-m]/[-m^2+m-6]`
`=[-3m-6-12+3m]/[-3(m^2-m+6)]`
`=[-18]/[-3(m^2-m+6)]=6/[(m-1/2)^2+23/4]`
Vì `(m-1/2)^2+23/4 >= 23/4`
`<=>6/[(m-1/2)^2+23/4] <= 24/23`
Hay `x-y <= 24/23`
Dấu "`=`" xảy ra `<=>m-1/2=0<=>m=1/2`
