(a) Prove that \( \sqrt{23} \) is irrational - HSC - SSCE Mathematics Extension 2 - Question 12 - 2023 - Paper 1

To prove this inequality, apply the Cauchy-Schwarz inequality:

Rearranging gives:

Thus, the result is proved.

To find the resultant force, we need to resolve the weight ( mg ) into components parallel and perpendicular to the inclined plane:

The component along the slope:

$F_{parallel} = mg \sin \theta\n$

The component perpendicular to the slope gives: $F_{perpendicular} = mg \cos \theta.$

Since the only force acting perpendicular is the normal force ( R ), we have: ( \mathbf{F} = - (mg \sin \theta) \hat{j}. )

Starting from Newton's second law, the net force acting on the object equals mass times acceleration:

Integrating the acceleration equation: rac{d^2 y}{dt^2} = g \sin \theta \implies \frac{dy}{dt} = g \sin \theta t + C. The constant ( C = 0 ) (initially at rest), and integrating again: $y(t) = \frac{1}{2} g \sin \theta t^{2}.$

First, express the complex number in polar form:

$r = \sqrt{2^2 + (-2)^2} = \sqrt{8} = 2\sqrt{2},$

and the argument is: $\theta = \tan^{-1}\left(\frac{-2}{2}\right) = -\frac{\pi}{4}.$

So we write:\n$2 - 2i = 2\sqrt{2} \left( \cos\left(-\frac{\pi}{4}\right) + i \sin\left(-\frac{\pi}{4}\right) \right).$

The cube roots are: $\sqrt[3]{2\sqrt{2}} \left( \cos \left(\frac{\theta + 2k\pi}{3}\right) + i \sin \left(\frac{\theta + 2k\pi}{3}\right) \right), \quad k = 0, 1, 2.$

Since the coefficients of ( P(z) ) are real, complex roots must occur in conjugate pairs. Since ( 2 + i ) is a zero, its conjugate ( 2 - i ) must also be a zero.

Given the known zeros ( 2 + i ) and ( 2 - i ), we can express:

$P(z) = (z - (2 + i))(z - (2 - i))(z - \alpha)(z - \beta)$

where ( \alpha ) and ( \beta ) are the remaining roots. Now we can expand the product of the two known factors and set the polynomial equal to zero to find ( \alpha ) and ( \beta ). Expanding gives: $(z^2 - 4z + 5)(z^2 + az + b) \text{ for some real } a, b.$