(a) If (3 - x), 6, (7 - 5x) are consecutive terms of a geometric

Explanation

(a) (i) (3 - x), 6, (7 - 5x).

First term = a = (3 - x)

common ratio = \(\frac{6}{3 - x} = \frac{7 - 5x}{6}\)

\(36 = (3 - x)(7 - 5x)\)

\(36 = 21 - 15x - 7x + 5x^{2}\)

\(36 = 21 - 22x + 5x^{2}\)

\(5x^{2} - 22x + 21 - 36 = 0\)

\(5x^{2} - 22x - 15 = 0\)

\(5x^{2} - 25x + 3x - 15 = 0 \implies 5x(x - 5) + 3(x - 5) = 0\)

\((x - 5)(5x + 3) = 0\)

\(x = -\frac{3}{5} \text{ or = } 5\)

(ii) Constant ratio = \(\frac{6}{3 - x} = \frac{7 - 5x}{6}\)

Using x = 5,

\(r = \frac{7 - 5(5)}{6} = \frac{-18}{6}\)

= \(-3\)

(b)Considering \(\Delta\) AOC

\(b^{2} = 4^{2} + 3^{2}\)

\(b^{2} = 16 + 9 = 25\)

\(b = \sqrt{25} = 5 cm\)

Considering \(\Delta\) ACD,

Using cosine rule,

\(\cos D = \frac{a^{2} + b^{2} - c^{2}}{2ab} = \frac{a^{2} + c^{2} - b^{2}}{2ac}\)

= \(\frac{6^{2} + 7^{2} - 5^{2}}{2 (6)(7)}\)

= \(\frac{36 + 49 - 25}{84}\)

\(\cos D = \frac{60}{84}\)

\(\cos D = 0.714\)

\(D = \cos^{-1} (0.714)\)

\(D = 44.4° \approxeq 44°\) (to the nearest degree)