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Trigonometric Graphs & Equations (Cambridge (CIE) IGCSE Maths)

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What is the graph of $y = \sin x$ for $- 360 ° \leq x \leq 360 °$ ?

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What is the graph of $y = \sin x$ for $- 360 ° \leq x \leq 360 °$ ?
The graph of $y = \sin x$ for $- 360 ° \leq x \leq 360 °$ is:
What is the graph of $y = \cos x$ for $- 360 ° \leq x \leq 360 °$ ?
The graph of $y = \cos x$ for $- 360 ° \leq x \leq 360 °$ is:
What is the graph of $y = \tan x$ for $- 360 ° \leq x \leq 360 °$ ?
The graph of $y = \tan x$ for $- 360 ° \leq x \leq 360 °$ is:
True or False?
The point $(0, 0)$ lies on the graph $y = \sin x$ .
True.
The point $(0, 0)$ lies on the graph $y = \sin x$ .
What is the y-intercept of the graph $y = \cos x$ ?
The y-intercept of the graph $y = \cos x$ is $(0, 1)$ .
What is the minimum y value of the graph $y = \sin x$ ?
The minimum y value of the graph $y = \sin x$ is -1.
True or False?
The graph $y = \cos x$ repeats itself every 180°.
False.
The graph $y = \cos x$ does not repeat itself every 180°.
It repeats itself every 360°.
True or False?
The graph $y = \tan x$ repeats itself every 180°.
True.
The graph $y = \tan x$ repeats itself every 180°.
The graph $y = \sin x$ repeats itself every how many degrees?
The graph $y = \sin x$ repeats itself every 360°.
True or False?
The maximum y value on the graph $y = \tan x$ is 1.
False.
The maximum y value on the graph $y = \tan x$ is not 1.
The graph $y = \tan x$ does not have a maximum value.
How would you use a graph of $y = \sin x$ to find the solutions of $\sin x = 0.5$ for $0 ° \leq x \leq 360 °$ ?
To find the solutions of $\sin x = 0.5$ for $0 ° \leq x \leq 360 °$ using the graph $y = \sin x$ :
- calculate one solution using inverse trig $x = \sin^{- 1} (0.5)$
- draw the horizontal line $y = 0.5$
- use the symmetry of the graph to find the other solution
True or False?
After finding the first solution for an equation involving the cosine function, you can find another solution by subtracting the first solution from 180º.
False.
After finding the first solution for an equation involving the cosine function, you can find another solution by subtracting the first solution from 360º.
What angle should you add to or subtract from a first solution to find another solution for an equation involving the tangent function?
If you know a first solution for an equation involving the tangent function, you can add to or subtract 180º from it to find another solution .

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