Photo AI

Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$ - HSC - SSCE Mathematics Extension 2 - Question 6 - 2008 - Paper 1

Question 6

$Let-$\omega$-be-the-complex-number-satisfying-$\omega^3-=-1$-and-$\text{Im}(\omega)->-0$-HSC-SSCE Mathematics Extension 2-Question 6-2008-Paper 1.png$

Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$. The cubic polynomial, $p(z) = z^3 + az^2 + bz + c$, has zeros $1, -\omega$ ... show full transcript

Worked Solution & Example Answer:Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$ - HSC - SSCE Mathematics Extension 2 - Question 6 - 2008 - Paper 1

Step 1

Find $p(z)$

96%

114 rated

Answer

To find the polynomial $p(z)$ , we first recognize that the zeros of the polynomial are $1$ , $-\omega$ , and $-\overline{\omega}$ . Since $\omega$ satisfies $\omega^3 = 1$ , we can express these zeros in terms of $\omega$ :

Calculate $\overline{\omega} = \frac{1}{\omega}$ , since for a complex number on the unit circle, the conjugate is the reciprocal.
Therefore, the zeros can be written as $1$ , $-\omega$ , and $-\frac{1}{\omega}$ .
The polynomial can thus be formed as:

$p(z) = (z - 1)(z + \omega)(z + \frac{1}{\omega})$
Expand this product:

$p(z) = (z - 1)(z^2 + z(\omega + \frac{1}{\omega}) + 1)$
Finding value of $\omega + \frac{1}{\omega} = \frac{\omega^2 + 1}{\omega} = 2 \cos(\theta)$ for some angle $\theta$ where \text{Im} $(\omega) > 0$
Thus, we have:

$p(z) = (z - 1)(z^2 + 2 \cos(\theta) z + 1)$
The result can be simplified further and for specific values of $a$ , $b$ , and $c$ , will yield the final form of the cubic polynomial.

Step 2

Show that the line $\ell$ has equation $bx \sec \theta - ay \tan \theta - ab = 0$

99%

104 rated

Answer

To show that the equation of the line $\ell$ is given by:

Start from the known properties of the hyperbola and the point $P(\sec\theta, b \tan \theta)$ .
The derivative at point $P$ gives the slope of the tangent line $\ell$ :
- The slope of a tangent to a hyperbola is given by implicit differentiation.
Substitute the coordinates of point $P$ into the equation of the line:

$y - b \tan \theta = m(x - \sec \theta)$

Where $m$ is the slope derived above. 4. Rearranging gives the desired result:

$bx \sec \theta - ay \tan \theta - ab = 0$ .

Step 3

Show that $SR = \frac{ab(\sec\theta - 1)}{\sqrt{a^2 \tan^2\theta + b^2 \sec^2 \theta}}$

96%

101 rated

Answer

We know from the geometry of the hyperbola that $SR$ is the distance from point $S$ to the line $\ell$ .
The distance from a point to a line can be expressed as:

$d = \frac{|Ax + By + C|}{\sqrt{A^2 + B^2}}$

Using coefficients from the line equation. 3. Substituting $S(-ae, 0)$ and calculating gives the necessary distance formula for $SR$ .

Step 4

Show that $SR \times S'R' = b^2$

98%

120 rated

Answer

From the previous results, express $S'R'$ in a similar manner as $SR$ using $S'$ .
Since $SR$ and $SR'$ are equal by definition of hyperbola properties, we can substitute accordingly.
The geometric property can be simplified and shown to equal $b^2$ .
Therefore, we conclude:

$SR \times S'R' = b^2$ .

Step 5

Show that $\frac{1}{r} = \frac{r - 1}{r} [\frac{1}{n} - \frac{1}{r - 1}]$

97%

117 rated

Answer

Begin with the left hand side:

$\frac{1}{r}$
Rewrite the right hand side:

$= \frac{r - 1}{r} \left( \frac{1}{n} - \frac{1}{r - 1} \right)$
By simplifying, establish the equality through common denominators and properties of fractions.

Step 6

Hence show that, if $m$ is an integer with $m \geq r$, then \[ \frac{1}{r} + \cdots + \frac{1}{r} = \frac{m}{r} - \frac{1}{n} [\frac{1}{r} - \frac{1}{r - 1}] \text{ (total } m \text{ terms)}. \]

97%

121 rated

Answer

Consider the sum of $m$ terms of $\frac{1}{r}$ .
This gives:

$\frac{m}{r}$
Now apply the initial condition from part (i) concerning $n$ and rewrite:

$\frac{1}{n} \left( m - \frac{m}{r - 1}\right)$
Ensure terms are combined properly to yield the final expression.

Step 7

What is the limiting value of the sum \[ \sum_{r=1}^{m} \frac{1}{n} \] as $m$ increases without bound?

96%

114 rated

Answer

The limiting value evaluates the series:

$\sum_{r=1}^{m} \frac{1}{n} = \frac{m}{n}$
As $m$ approaches infinity, this implies:

$\lim_{m \to \infty} \frac{m}{n} = \infty$
Thus, the limiting value of the sum as $m$ increases indefinitely is:

$\infty$ .

Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$ - HSC - SSCE Mathematics Extension 2 - Question 6 - 2008 - Paper 1

Worked Solution & Example Answer:Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$ - HSC - SSCE Mathematics Extension 2 - Question 6 - 2008 - Paper 1

Find $p(z)$

Show that the line $\ell$ has equation $bx \sec \theta - ay \tan \theta - ab = 0$

Show that $SR = \frac{ab(\sec\theta - 1)}{\sqrt{a^2 \tan^2\theta + b^2 \sec^2 \theta}}$

Show that $SR \times S'R' = b^2$

Show that $\frac{1}{r} = \frac{r - 1}{r} [\frac{1}{n} - \frac{1}{r - 1}]$

Hence show that, if $m$ is an integer with $m \geq r$, then \[ \frac{1}{r} + \cdots + \frac{1}{r} = \frac{m}{r} - \frac{1}{n} [\frac{1}{r} - \frac{1}{r - 1}] \text{ (total } m \text{ terms)}. \]

What is the limiting value of the sum \[ \sum_{r=1}^{m} \frac{1}{n} \] as $m$ increases without bound?

Join the SSCE students using SimpleStudy...