O-Level A-Math 2020 Paper 2, Question 5: Quadratic inequality on a number line

(a) \(15(1 + 2x) \geqslant x(19 - 2x) \Rightarrow 15 + 30x \geqslant 19x - 2x^2 \Rightarrow 2x^2 + 11x + 15 \geqslant 0 \Rightarrow (2x + 5)(x + 3) \geqslant 0\). The roots are \(x = -3\) and \(x = -2.5\); the parabola opens upwards, so the expression is \(\geqslant 0\) outside the roots: \(x \leqslant -3\) or \(x \geqslant -2.5\). Number line: filled (closed) circles at \(-3\) and \(-2.5\), with shading/arrow to the left of \(-3\) and to the right of \(-2.5\).

(b)(i) For \(x > 0\): \(y = 3x^{1/3}\) rises from the origin, increasing and concave down (cube-root shape). \(y = \dfrac{1}{3}x^{-3}\) is a decreasing curve, \(\to +\infty\) as \(x \to 0^+\) and \(\to 0^+\) as \(x \to \infty\) (it hugs both axes). The two curves cross exactly once for \(x > 0\).

(b)(ii) At the intersection \(3x^{1/3} = \dfrac{1}{3}x^{-3} \Rightarrow 9x^{1/3} = x^{-3} \Rightarrow 9 = x^{-3 - 1/3} = x^{-10/3} \Rightarrow x^{10/3} = \dfrac{1}{9} \Rightarrow x^{10} = \dfrac{1}{9^3} = \dfrac{1}{729}.\) (shown)