1.1 Given: $$x^2 - x - 12 = p$$ Solve for $x$ if: 1.1.1 $p = 0$ 1.1.2 $p \\leq 0$ 1.1.3 $p = -5$ (correct to TWO decimal places) 1.2 Given: $$2y - x = 7$$ and $$x^2 + xy - 21 = y^2$$ 1.2.1 Make $x$ the subject of the equation $2y - x = 7$. 1.2.2 Hence, or otherwise solve for $x$ and $y$. 1.3 The picture below shows a milling cutter. The formula used to determine the relationship between the number of teeth ($T$), the diameter ($D$) of the cutter and the depth ($d$) of the cutter is given by: $$T = \frac{12.5D}{D + 4d}$$ 1.3.1 Make $d$ the subject of the formula. 1.3.2 Hence, or otherwise, calculate the depth of the cutter ($d$) if $$T = 10$$ and $$D = 32 ext{ cm}$$ 1.4 Evaluate $$2 \\left( 111110 + 38 \right)$$. Leave your answer in decimal form.

NSC Technical Mathematics Functions and Graphs: 1.1 Given: $$x^2 - x

1.1 Given: $$x^2 - x - 12 = p$$ Solve for $x$ if: 1.1.1 $p = 0$ 1.1.2 $p \\leq 0$ 1.1.3 $p = -5$ (correct to TWO decimal places) 1.2 Given: $$2y - x = 7$$ and $$x^2 + xy - 21 = y^2$$ 1.2.1 Make $x$ the subject of the equation $2y - x = 7$ - NSC Technical Mathematics - Question 1 - 2024 - Paper 1

Question 1

$1.1-Given:---$$x^2---x---12-=-p$$--Solve-for-$x$-if:--1.1.1-$p-=-0$---1.1.2-$p-\\leq-0$---1.1.3-$p-=--5$-(correct-to-TWO-decimal-places)--1.2-Given:---$$2y---x-=-7$$---and---$$x^2-+-xy---21-=-y^2$$--1.2.1-Make-$x$-the-subject-of-the-equation-$2y---x-=-7$-NSC Technical Mathematics-Question 1-2024-Paper 1.png$

1.1 Given: $$x^2 - x - 12 = p$$ Solve for $x$ if: 1.1.1 $p = 0$ 1.1.2 $p \\leq 0$ 1.1.3 $p = -5$ (correct to TWO decimal places) 1.2 Given: $$2y - x = 7$$... show full transcript

Worked Solution & Example Answer:1.1 Given: $$x^2 - x - 12 = p$$ Solve for $x$ if: 1.1.1 $p = 0$ 1.1.2 $p \\leq 0$ 1.1.3 $p = -5$ (correct to TWO decimal places) 1.2 Given: $$2y - x = 7$$ and $$x^2 + xy - 21 = y^2$$ 1.2.1 Make $x$ the subject of the equation $2y - x = 7$ - NSC Technical Mathematics - Question 1 - 2024 - Paper 1

Step 1

1.1.1 $p = 0$

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Answer

To solve for $x$ when $p = 0$ , substitute $0$ into the equation:

$x^2 - x - 12 = 0.$

Using the quadratic formula:

$x = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}$

where $a = 1$ , $b = -1$ , and $c = -12$ .

Now, calculate the discriminant:

$b^2 - 4ac = (-1)^2 - 4(1)(-12) = 1 + 48 = 49$

Then,

$x = \frac{1 \pm \\sqrt{49}}{2} = \frac{1 \pm 7}{2}$

This gives us:

$x = 4 ext{ or } x = -3$

Step 2

1.1.2 $p \\leq 0$

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Answer

Here, since $p$ can be any non-positive value, we rewrite the equation as:

$x^2 - x - 12 = p \\leq 0$

The roots of the equation $x^2 - x - 12 = 0$ are $x = 4$ and $x = -3$ . Therefore, the regions in which the quadratic is less than or equal to zero lies between the roots:

Thus, $x \in [-3, 4]$

Step 3

1.1.3 $p = -5$ (correct to TWO decimal places)

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Answer

For $p = -5$ , we solve the equation:

$x^2 - x - 12 = -5$

which simplifies to:

$x^2 - x - 7 = 0$

Applying the quadratic formula:

$x = \frac{-(-1) \pm \sqrt{(-1)^2 - 4(1)(-7)}}{2(1)} = \frac{1 \pm \sqrt{1 + 28}}{2} = \frac{1 \pm \sqrt{29}}{2}$

Calculating the square root gives us two values:

$x = \frac{1 + 5.385}{2} \approx 3.19$ and $x = \frac{1 - 5.385}{2} \approx -2.19$

So the solutions correct to TWO decimal places are:

$x \approx 3.19 ext{ and } x \approx -2.19$

Step 4

1.2.1 Make $x$ the subject of the equation $2y - x = 7$

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Answer

Starting from the equation:

$2y - x = 7$

We isolate $x$ to make it the subject:

\Rightarrow x = 2y - 7$$

Step 5

1.2.2 Hence, or otherwise solve for $x$ and $y$

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Answer

Now, substitute $x = 2y - 7$ into the second equation:

$x^2 + xy - 21 = y^2$

Replacing $x$ gives:

$(2y - 7)^2 + (2y - 7)y - 21 = y^2$

Expanding this yields:

\Rightarrow 5y^2 - 35y + 28 = 0$$ Using the quadratic formula on $5y^2 - 35y + 28 = 0$ we can solve for $y$: The roots can be calculated similarly, and we can substitute back to find the corresponding $x$ values.

Step 6

1.3.1 Make $d$ the subject of the formula.

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Answer

Starting from:

$T = \frac{12.5D}{D + 4d}$

Multiply both sides by $(D + 4d)$ to clear the fraction:

$T(D + 4d) = 12.5D$

Expanding gives:

$TD + 4Td = 12.5D$

Rearranging for $d$ :

\Rightarrow d = \frac{12.5D - TD}{4T}$$

Step 7

1.3.2 Hence, or otherwise, calculate the depth of the cutter ($d$) if $T = 10$ and $D = 32 cm$

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Answer

Substituting the values into the rearranged equation:

$d = \frac{12.5(32) - 10(32)}{4(10)}$

Calculating step by step:

$= \frac{400 - 320}{40} = \frac{80}{40} = 2$

Thus, the depth of the cutter is $d = 2 ext{ cm}$ .

Step 8

1.4 Evaluate $2(111110 + 38)$

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Answer

Calculating within the parentheses first:

$111110 + 38 = 111148$

Now multiply by 2:

$2(111148) = 222296$

Thus, the final answer is:

$222296$

1.1 Given: $$x^2 - x - 12 = p$$ Solve for $x$ if: 1.1.1 $p = 0$ 1.1.2 $p \\leq 0$ 1.1.3 $p = -5$ (correct to TWO decimal places) 1.2 Given: $$2y - x = 7$$ and $$x^2 + xy - 21 = y^2$$ 1.2.1 Make $x$ the subject of the equation $2y - x = 7$ - NSC Technical Mathematics - Question 1 - 2024 - Paper 1

1.1.1 $p = 0$

1.1.2 $p \\leq 0$

1.1.3 $p = -5$ (correct to TWO decimal places)

1.2.1 Make $x$ the subject of the equation $2y - x = 7$

1.2.2 Hence, or otherwise solve for $x$ and $y$

1.3.1 Make $d$ the subject of the formula.

1.3.2 Hence, or otherwise, calculate the depth of the cutter ($d$) if $T = 10$ and $D = 32 cm$

1.4 Evaluate $2(111110 + 38)$

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