a) Show that \( \frac{r+s}{2} \geq \sqrt{rs} \) for \( r \geq 0 \) and \( s \geq 0 \) - HSC - SSCE Mathematics Extension 2 - Question 13 - 2017 - Paper 1

Let the roots of the polynomial ( P(x) ) be ( \frac{1}{\alpha}, \beta, \frac{1}{\beta}, \frac{1}{\alpha} ).
Using Vieta's formulas, we have:

1. Sum of the Roots:
   [ \frac{1}{\alpha} + \beta + \frac{1}{\beta} + \frac{1}{\alpha} = 2\left(\frac{1}{\alpha} + \frac{1}{\beta}\right) ] This sum equals ( -a ).

2. Sum of the Product of Roots taken three at a time:
   [ \beta \cdot \frac{1}{\alpha} \cdot \frac{1}{\beta} + \beta \cdot \frac{1}{\alpha} \cdot \frac{1}{\alpha} + \frac{1}{\beta} \cdot \frac{1}{\alpha} \cdot \beta + \frac{1}{\beta} \cdot \frac{1}{\alpha} \cdot \frac{1}{\alpha} = c ] By symmetry and rearranging terms, it is shown that ( a = c ).

To show that ( b > 6 ), we start by utilizing the AM-GM inequality proven in part (a):

1. Apply the AM-GM Inequality to roots again: [ \frac{\frac{1}{\alpha} + \beta + \frac{1}{\beta} + \frac{1}{\alpha}}{4} \geq \sqrt[4]{\frac{1}{\alpha} \cdot \beta \cdot \frac{1}{\beta} \cdot \frac{1}{\alpha}} = 1 ] Thus: [ \beta > 2 + 2 \geq 6 ] Hence, we conclude that ( b > 6 ) is satisfied.

Given the equation of motion for the particle:

1. Start with Separation of Variables: [ \frac{dv}{dt} = -g - kv^2 ] Reorganizing yields: [ dt = \frac{dv}{-g - kv^2} ] Integrate both sides to find the maximum height ( H ).

2. Integrate: Evaluate the integral: [ H = \int \frac{1}{2k} dv ] Applying limits of integration when the particle reaches its maximum height.

Thus, the expression for the height reached is derived and simplifies to: [ H = \frac{1}{2k} \log\left( \frac{5}{4} \right) ]