The cubic polynomial $P(x) = x^3 + rx^2 + sx + t$, where $r$, $s$, and $t$ are real numbers, has three real zeros, $1$, $eta$, and $-eta$ - HSC - SSCE Mathematics Extension 1 - Question 4 - 2006 - Paper 1

Continuing from the expanded polynomial, we have: P(x) = x^3 - x^2 - eta^2x + eta^2

Here, we can compare the coefficients to find $s$ and $t$. We see: s = -eta^2 \ \ t = eta^2

Thus, s + t = -eta^2 + eta^2 = 0.

The equation for the position of the particle undergoing simple harmonic motion can be described as:

x(t) = A imes ext{cos}igg( rac{2 heta}{T} t - rac{ heta}{2} igg)

where $A = 18$ (amplitude) and $T = 5$ (period). Thus:

x(t) = 18 imes ext{cos}igg( rac{2 heta}{5} t igg).

The time taken for the particle to move from a rest position to the point halfway can be calculated using the properties of simple harmonic motion. The rest position occurs at maximum and minimum amplitudes, so:

1. The time from maximum position to equilibrium is $T/4$. Since the motion is symmetric, halfway is reached after $T/8$ seconds. Therefore, the answer is:

$\frac{5}{8} \text{ seconds}.$

To find the velocity, we differentiate the position function:

$v = \frac{d}{dt}(18t^3 + 27t^2 + 9t) = 54t^2 + 54t + 9.$

Squaring both sides gives:

$v^2 = (54t^2 + 54t + 9)^2.$

After manipulation, one can show that:

$v^2 = 9t^2(1 + x^2)$ for the given terms.

Using substitution, we can integrate the given function. The integral can be split as:

$\int \left( \frac{1}{x} - \frac{1}{1+x} \right) dx = -3t$ unifying the expressions. Therefore, the result gives the desired expression after evaluating constants.

Using the derived equation:

$\text{log}_e \bigg( \frac{1}{x} \bigg) = 3t + c$

We can exponentiate both sides:

$\frac{1}{x} = e^{3t + c} \Rightarrow x = \frac{1}{e^{3t + c}}$

Using initial conditions will provide the constant's specific value.