Explanation

The term of the given G.P. are  (x + 2), (4x + 3), and (7x + 24)

(a) Common ratio = \(\frac{(4x + 3)}{(x + 2)}\) = \(\frac{(7x + 24)}{(4x + 3)}\)

                      cross multiply

(4x + 3)(4x + 3) = (x + 2)(7x + 24)

16x\(^2\) + 24x + 9 = 7x\(^2\) + 38x + 48

16x\(^2\) - 7x\(^2\) + 24x - 38x + 9 - 48 = 0

9x\(^2\) - 14x - 39 = 0

9x\(^2\) - 27x + 13x - 39 = 0 (from 9x\(^2\) x 39)

9x(x - 3) + 13(x -3) = 0

(9x + 13)(x - 3) = 0

(9x + 13) = 0 or (x - 3) = 0

x = \(\frac{-13}{9}\) or 3

(b) When x =  \(\frac{-13}{9}\)

Common ratio = \(\frac{(4x + 3)}{(x + 2)}\) = \(\frac{(4(\frac{-13}{9}) + 3)}{((\frac{-13}{9}) + 2)}\)

                        = \(\frac{\frac{-25}{9}}{\frac{5}{9}}\) = \(\frac{- 25}{9}\) x \(\frac{9}{5}\) = - 5.

Common ratio,r = - 5

When x = 3,

Common ratio = \(\frac{(4(3) + 3)}{((3) + 2)}\) = \(\frac{15}{5}\) = 3.

Common ratio, r = 3

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