1.If α,β\alpha, \betaα,β are the roots of the equation lx2−mx+m=0lx^2 - mx + m = 0lx2−mx+m=0, l≠ml \neq ml=m, l≠0l \neq 0l=0, then which one of the following statements is correct?a.α/β+β/α−m/l=0\sqrt{\alpha/\beta} + \sqrt{\beta/\alpha} - \sqrt{m/l} = 0α/β+β/α−m/l=0b.α/β+β/α+m/l=0\sqrt{\alpha/\beta} + \sqrt{\beta/\alpha} + \sqrt{m/l} = 0α/β+β/α+m/l=0c.(α+β)/(αβ)−m/l=0\sqrt{(\alpha+\beta)/(\alpha\beta)} - \sqrt{m/l} = 0(α+β)/(αβ)−m/l=0d.The arithmetic mean of α\alphaα and β\betaβ is the same as their geometric meanLogin to continueOnly logged in users canattempt or see the solution.