Explanation

(a) 3, x, y, 18.

Note : When given the consecutive terms of an A.P to be \(a, b, c, d\), then

\(\frac{a + c}{2} = b ; \frac{b + d}{2} = c\).

\(\therefore \frac{3 + y}{2} = x \implies 3 + y = 2x .... (1)\)

Also, \(\frac{x + 18}{2} = y \implies x + 18 = 2y ..... (2)\)

From (2), x = 2y - 18. Putting that in (1), we have

\(3 + y = 2(2y - 18) \implies 3 + y = 4y - 36\)

\(3 + 36 = 4y - y \implies 3y = 39\)

\(y = 13\)

\(x = 2y - 18\)

\(x = 2(13) - 18 = 26 - 18 = 8\)

\((x, y) = (8, 13)\).

(b)(i) G.P

\(T_{2} = ar ; T_{3} = ar^{2} ; T_{4} = ar^{3}\)

\(T_{2} + T_{3} = 6T_{4}\)

\(ar + ar^{2} = 6ar^{3}\)

\(6ar^{3} - ar^{2} - ar = 0\)

\(6ar^{3} - 3ar^{2} + 2ar^{2} - ar = 0\)

\(3ar^{2}(2r - 1) + ar(2r - 1) = 0\)

\((3ar^{2} + ar)(2r - 1) = 0\)

\(ar(3r + 1)(2r - 1) = 0\)

\(\implies 3r + 1 = 0 ; 2r - 1 = 0\)

\(r = \frac{-1}{3} ; r = \frac{1}{2}\)

(ii) Since r is positive, then \(r = \frac{1}{2}\).

\(T_{2} = ar = 8 \implies \frac{a}{2} = 8\)

\(a = 16\)

\(\therefore \text{The first 6 terms} = 16, 8, 4, 2, 1, \frac{1}{2}\)

• an object 1cm high is placed on the axis of a converging lens at a distance of 7.5cm from the... Answer this

  5 Answers   ·   Physics   ·   4 years ago
• can 231 enter architecture unilag? Answer this

  1 Answers   ·   Architecture   ·   2 hours ago
• which school will accept 170 to study nursing? Answer this

  11 Answers   ·   21 hours ago