(a) The vectors $egin{pmatrix} a^2 \ 2 \ \\ a + 5 \ a - 4 \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\}egin{pmatrix} a + 5 \ a - 4 \\ \\ \\ \\} are perpendicular. (b) The region, R, is bounded by the function, $y = x^3$, the x-axis and the lines $x = 1$ and $x = 2$. What is the volume of the solid of revolution obtained when the region R is rotated about the x-axis? (c) A charity employs a worker to collect donations. There is a 0.31 chance that when the charity worker talks to someone a donation is made to the charity. Each day the charity worker must talk to exactly 100 people. Use the standard normal distribution and the information on page 13 to approximate the probability that, on a particular day, at least 35% of the people talked to made a donation. (d) Use mathematical induction to prove that $2^n + 13$ is divisible by 7 for all integers $n e 1$. (e) The diagram shows the graph of $y = \frac{1}{|x - 5|}$. For what values of $x$ is $rac{x}{6} \geq \frac{1}{|x - 5|}$?

SSCE HSC Mathematics Extension 1 Absolute value functions: (a) The vectors $egin{pmatrix}

(a) The vectors $egin{pmatrix} a^2 \ 2 \ \\ a + 5 \ a - 4 \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\}egin{pmatrix} a + 5 \ a - 4 \\ \\ \\ \\} are perpendicular - HSC - SSCE Mathematics Extension 1 - Question 12 - 2024 - Paper 1

Question 12

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(a) The vectors $egin{pmatrix} a^2 \ 2 \ \\ a + 5 \ a - 4 \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\... show full transcript

Worked Solution & Example Answer:(a) The vectors $egin{pmatrix} a^2 \ 2 \ \\ a + 5 \ a - 4 \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\}egin{pmatrix} a + 5 \ a - 4 \\ \\ \\ \\} are perpendicular - HSC - SSCE Mathematics Extension 1 - Question 12 - 2024 - Paper 1

Step 1

Find the possible values of a.

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Answer

To determine the possible values of $a$ , we first establish the condition for perpendicular vectors. For vectors $egin{pmatrix} a^2 \ 2 \ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\$ and $egin{pmatrix} a + 5 \ a - 4 \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\ \\$ to be perpendicular, their dot product should equal zero.

Let's calculate it:

$egin{pmatrix} a^2 \ 2 \\ \\ \\ \\ \\$ egin{pmatrix} a + 5 \ a - 4 \\ \end{pmatrix} = 0$

Expanding yields:

$a^2(a + 5) + 2(a - 4) = 0$

Simplifying gives us:

$a^3 + 5a^2 + 2a - 8 = 0$

We can now factor this polynomial to find the roots. Testing for rational roots, we find that $a = 1$ is a solution. This factors our polynomial as:

$(a - 1)(a^2 + 6a + 8) = 0$

This simplifies to:

$a^2 + 6a + 8 = (a + 2)(a + 4)$

Thus, the possible values of $a$ are $-2$ , $-4$ , and $1$ .

Step 2

What is the volume of the solid of revolution obtained when the region R is rotated about the x-axis?

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Answer

To find the volume of the solid of revolution when the region $R$ is rotated about the x-axis, we use the formula for volume:

$V = \pi \int_1^2 (x^3)^2 \, dx$

Calculating this integral:

$V = \pi \int_1^2 x^6 \, dx$

Evaluating the integral:

$= \pi \left[ \frac{x^7}{7} \right]_1^2 = \pi \left( \frac{2^7}{7} - \frac{1^7}{7} \right) = \pi \left( \frac{128}{7} - \frac{1}{7} \right) = \frac{127\pi}{7}$

Step 3

Use the standard normal distribution to approximate the probability that, on a particular day, at least 35% of the people talked to made a donation.

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Answer

We denote the number of donations made as $X$ . Given that there is a 0.31 chance of donations, the expected number of donations out of 100 people is:

$E(X) = n p = 100 \times 0.31 = 31$

The variance is calculated as:

$Var(X) = np(1 - p) = 100 \times 0.31 \times 0.69 = 21.39$

The standard deviation $\, \sigma = \sqrt{24.84} \approx 4.92$ .

To find the probability that at least 35 people (i.e., 35%) made donations:

We apply the z-score formula:

$z = \frac{X - \mu}{\sigma} = \frac{35 - 31}{4.92} \approx 0.81$

Using standard normal distribution tables, we find:

$P(Z \geq 0.81) = 1 - P(Z < 0.81) \approx 1 - 0.7910 = 0.2090$

Thus, approximately 20.90% probability that at least 35% of people made donations.

Step 4

Use mathematical induction to prove that $2^n + 13$ is divisible by 7 for all integers n ≥ 1.

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Answer

Base case (n=1):

$2^1 + 13 = 15$ , which is divisible by 7.

Inductive step: Assume true for $n = k$ , that is, $2^k + 13$ is divisible by 7.

Now consider $n = k + 1$ , we have:

$2^{k+1} + 13 = 2 \cdot 2^k + 13 = 2(2^k + 13) - 13$

Since $2^k + 13$ is divisible by 7, it follows that $2(2^k + 13)$ is also divisible by 7. Therefore, $2^{k+1} + 13$ is divisible by 7.

By induction, $2^n + 13$ is divisible by 7 for all integers $n \geq 1$ .

Step 5

For what values of x is $ \frac{x}{6} \geq \frac{1}{|x - 5|} $?

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Answer

To solve the inequality, we must consider two cases based on the absolute value.

Case 1: x > 5

In this scenario, the absolute value $|x - 5|$ simplifies to $(x - 5)$ , yielding:

$\frac{x}{6} \geq \frac{1}{x - 5}$

Cross-multiplying gives:

$x(x - 5) \geq 6$

This simplifies to:

$x^2 - 5x - 6 \geq 0$

Factoring yields:

$(x - 6)(x + 1) \geq 0$

Therefore, the solution from this case is:

$x \in [6, \infty)$

Case 2: x < 5

Here, the absolute value eliminates as $|x - 5| = (5 - x)$ , leading to:

$\frac{x}{6} \geq \frac{1}{5 - x}$

Cross-multiplying results in:

$x(5 - x) \geq 6$

This implies:

$-x^2 + 5x - 6 \geq 0$

Factoring gives:

$(x - 2)(x - 3) \leq 0$

Thus, from this case, we find:

$x \in [2, 3]$

Final Solution: Therefore, the complete solution set is:

$x \in [2, 3] \cup [6, \infty)$

Find the possible values of a.

What is the volume of the solid of revolution obtained when the region R is rotated about the x-axis?

Use the standard normal distribution to approximate the probability that, on a particular day, at least 35% of the people talked to made a donation.

Use mathematical induction to prove that $2^n + 13$ is divisible by 7 for all integers n ≥ 1.

For what values of x is \( \frac{x}{6} \geq \frac{1}{|x - 5|} \)?

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