The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 180 \degree]$. R(21.5\degree; -0.7) and T are the points of intersection of the curves of $f$ and $g$. Use the graphs above to answer the following questions. 5.1 Give the period of $f$. 5.2 Determine the numerical values of $a$ and $b$. 5.3 Write down the coordinates of T. 5.4 Determine the value(s) of $x$ for which: 5.4.1 $g(x) \, imes \, f(x) > 0$ for $x \in [90 \degree; 180 \degree]$. 5.4.2 $f(x)$ will be undefined.

NSC Technical Mathematics Functions and Graphs: The graphs below represent the c

The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 180 \degree]$ - NSC Technical Mathematics - Question 5 - 2019 - Paper 2

Question 5

$The-graphs-below-represent-the-curves-of-functions-$f$-and-$g$-defined-by-$f(x)-=-a-\,-sin-\,-x$-and-$g(x)-=---cos-\,-b-\,-x$-respectively-for-$x-\in-[0-\degree-;-180-\degree]$-NSC Technical Mathematics-Question 5-2019-Paper 2.png$

The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 18... show full transcript

Worked Solution & Example Answer:The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 180 \degree]$ - NSC Technical Mathematics - Question 5 - 2019 - Paper 2

Step 1

Give the period of $f$

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Answer

The period of the function $f(x) = a \, sin \, x$ is given by the formula:

$T = 360\degree$

Thus, the period of $f$ is $360\degree$ .

Step 2

Determine the numerical values of $a$ and $b$

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Answer

From the graph, we can deduce that the amplitude of the sine function is given by the maximum height reached by $f$ , which corresponds to $a = -2$ .

Similarly, the cosine function $g(x) = - cos(b \, x)$ shows that the maximum value is also impacted by the coefficient $b$ , which reads as $b = 2$ .

Step 3

Write down the coordinates of T

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Answer

The coordinates of point T, where the curves intersect, can be found on the graph. Thus,

$T(158.5\degree; -0.7)$ is an accepted answer.

Step 4

Determine the value(s) of $x$ for which:

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Answer

For part 5.4.1, since we are looking for when the product $g(x) \, imes \, f(x) > 0$ , we analyze the graph. This condition holds true for values in the interval:
$135\degree < x < 180\degree$

For part 5.4.2, $f(x)$ will be undefined at the points where $g(x)$ crosses zero:

$x = 45\degree \, or \, x = 135\degree$ .

The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 180 \degree]$ - NSC Technical Mathematics - Question 5 - 2019 - Paper 2

Worked Solution & Example Answer:The graphs below represent the curves of functions $f$ and $g$ defined by $f(x) = a \, sin \, x$ and $g(x) = - cos \, b \, x$ respectively for $x \in [0 \degree ; 180 \degree]$ - NSC Technical Mathematics - Question 5 - 2019 - Paper 2

Give the period of $f$

Determine the numerical values of $a$ and $b$

Write down the coordinates of T

Determine the value(s) of $x$ for which:

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