set of ordered pairs share the same reference angle is choice no. 3
Further explanation
Angles can be formed from two ray lines that have the same starting point
Commonly used terms include vertex,corner point, and angle size
The magnitude of the angle is usually expressed in degrees
Naming angles can be with one letter according to the vertex or with three letters with the vertex placed between two other letters
In trigonometry an angle can be described from two sides namely the terminal side and the origin / initial side (along the positive x axis)
The terminal side is the side that can be located anywhere and shows the size of an angle.
Reference angle is the smallest angle between the terminal side and the x-axis.
The reference angle is always positive wherever the quadrant is
The reference angle is always less than or equal to 90 °
The formula reference angle (θ) for each quadrant
Same as θ
180 - θ
θ - 180
360 - θ
From the set of ordered pairs from the angle above, it can be seen that the angle value is the value of the special angle of the sin and cos functions, which are
[tex]\dfrac{1}{2}~and~\dfrac{1}{2}\sqrt{3}[/tex]
Sin function is positive in quadrants 1 and 2
Cos function is positive in quadrants 1 and 4
From the available answer choices, the reference angle will be the same value if the existing pair of angles are in the same ordered location and have the same value but only have different marks due to differences in quadrant location
From this condition only option 3 fulfills a reference angle of 30, which is in quadrants 3 and 1
[tex]-\dfrac{1}{2} ,-\dfrac{1}{2}\sqrt{3} \Rightarrow -sin~30,-cos~30\Rightarrow Quadrant~3[/tex]
[tex]\dfrac{1}{2} ,\dfrac{1}{2}\sqrt{3} \Rightarrow sin~30,cos~30\Rightarrow Quadrant~1[/tex]
Learn more
circumference of the circle
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chord, diameter
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the steps for constructing a copy of an angle
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Keywords: angle, reference angle, quadrant, sin, cos
