If the sum of the first two terms of a G.P. is 3, and the sum of the second and the third terms is -6, find the sum of the first term and the common ratio
A. -2 B. -3 C. -5 D. 5
Correct Answer: C
Explanation
Using Sn = \(a\frac{r^2 - 1}{r - 1}\) we get S2 = 3 = \(a\frac{r^2 - 1}{r - 1}\) giving 3(r - 1) = a(r2 - 1) 3r - 3 = ar2 - a ar2 - 3r - a = -3 ..... (1) ar + ar2 = -6 ..... (2) From (2), a = \(\frac{-6}{(r + r^2)}\) Substitute \(\frac{-6}{(r + r^2)}\) for a in (1) \((\frac{-6}{(r + r^2)})r^2 - 3r - \frac{-6}{(r + r^2)} = -3\) Multiply through by (r + r2) to get -6r2 - 3r(r + r2) + 6 = -3(r + r2) -6r2 - 3r2 - 3r3 + 6 = -3r - 3r2 Equating to zero, we have 3r3 - 3r2 + 3r2 + 6r2 - 3r - 6 = 0 This reduces to; 3r3 + 6r2 - 3r - 6 = 0 3(r3 + 2r2 - r - 2) = 0 By the factor theorem, (r + 2): f(-2) = (-2)3 + 2(-2)2 - (-2) - 2 -8 + 8 + 2 - 2 = 0 giving r = -2 as the only valid value of r for the G.P. From (3), = \(\frac{-6}{-2 + (-2)^2} = \frac{-6}{-2 + 4}\) a = -6/2 = -3 Hence (a + r) = (-3 + -2) = -5
