1.Let α\alphaα and β\betaβ be the roots of the equation 5x2−6x−2=05x^2 - 6x - 2 = 05x2−6x−2=0. If Sn=αn+βnS_n = \alpha^n + \beta^nSn=αn+βn, n=1,2,3,…n = 1, 2, 3, \ldotsn=1,2,3,…, then:a.6S6+5S5+2S4=06S_6 + 5S_5 + 2S_4 = 06S6+5S5+2S4=0b.5S6+6S5+2S4=05S_6 + 6S_5 + 2S_4 = 05S6+6S5+2S4=0c.5S6+6S5=2S45S_6 + 6S_5 = 2S_45S6+6S5=2S4d.6S6+5S5=2S46S_6 + 5S_5 = 2S_46S6+5S5=2S4Login to continueOnly logged in users canattempt or see the solution.