1.2: Angles

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Sep 5, 2021
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- 1.1: Lines
- 1.3: Angle Classifications

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An angle is the figure formed by two rays with a common end point, The two rays are called the sides of the angle and the common end point is called the vertex of the angle, The symbol for angle is $\angle$

屏幕快照 2020-10-27 下午8.16.32.png — Figure $\PageIndex{1}$ : Angle $BAC$ has vertex $A$ and sides $\overrightarrow{AB}$ and $\overrightarrow{AC}$

The angle in Figure $\PageIndex{1}$ has vertex $A$ and sides $AB$ and $AC$ , It is denoted by $\angle BAC$ or $\angle CAB$ or simply $\angle A$ . When three letters are used, the middle letter is always the vertex, In Figure $\PageIndex{2}$ we would not use the notation $\angle A$ as an abbreviation for $\angle BAC$ because it could also mean $\angle CAD$ or $\angle BAD$ , We could however use the simpler name $\angle x$ for $\angle BAC$ if " $x$ " is marked in as shown,

屏幕快照 2020-10-27 下午8.19.28.png — Figure $\PageIndex{2}$ : $\angle BAC$ may also be denoted by $\angle x$ .

Angles can be measured with an instrument called a protractor. The unit of measurement is called a degree and the symbol for degree is $^{\circ}$ .

To measure an angle, place the center of the protractor (often marked with a cross or a small circle) on the vertex of the angle, Position the protractor so that one side of the angle cuts across 0, at the beginning of the scale, and so that the other side cuts across a point further up on the scale, We use either the upper scale or the lower scale, whichever is more convenient, For example, in Figure $\PageIndex{3}$ , one side of $\angle BAC$ crosses 0 on the lower scale and the other side crosses 50 on the lower scale. The measure of $\angle BAC$ is therefore $50^{\circ}$ and we write $\angle BAC$ = $50^{\circ}$ .

屏幕快照 2020-10-27 下午8.21.10.png — Figure $\PageIndex{3}$ : The protractor shows $\angle BAC = 50^{\circ}$

In Figure $\PageIndex{4}$ , side $\overrightarrow AD$ of $\angle DAC$ crosses 0 on the upper scale. Therefore we look on the upper scale for the point at which $\overrightarrow{AC}$ crosses and conclude that $\angle DAC = 130^{\circ}$ .

屏幕快照 2020-10-27 下午8.22.35.png — Figure $\PageIndex{4}$ : $\angle DAC = 130^{\circ}$ .

Example $\PageIndex{1}$

Draw an angle of $40^{\circ}$ and label it $\angle BAC$ .

Solution

Draw ray $\overrightarrow{AB}$ using a straight edge:

$屏幕快照 2020-10-27 下午8.24.27.png$

Place the protractor so that its center coincides with $A$ and $\overrightarrow{AB}$ crosses the scale at 0:

$屏幕快照 2020-10-27 下午8.25.38.png$

Mark the place on the protractor corresponding to $40^{\circ}$ . Label this point $C$ :

$屏幕快照 2020-10-27 下午8.27.01.png$

Connect $A$ with $C$ :

$屏幕快照 2020-10-27 下午8.30.27.png$

Two angles are said to be equal if they have the same measure in degrees. We often indicate two angles are equal by marking them in the same way. In Figure $\PageIndex{5}$ , $\angle A = \angle B$ .

屏幕快照 2020-10-27 下午8.35.58.png — Figure $\PageIndex{5}$ : Equal angles.

An angle bisector is a ray which divides an angle into two equal angles. In Figure $\PageIndex{6}$ , $\overrightarrow{AC}$ is an angle bisector of $\angle BAD$ . We also say $\overrightarrow{AC}$ bisects $\angle BAD$ .

屏幕快照 2020-10-27 下午8.39.30.png — Figure $\PageIndex{6}$ : $\overrightarrow{AC}$ bisects $\angle BAD$ .

Example $\PageIndex{2}$

Find $x$ if $\overrightarrow{AC}$ bisects $\angle BAD$ and $\angle BAD = 80^{\circ}$ :

$屏幕快照 2020-10-27 下午8.42.54.png$

Solution

$x^{\circ} = \dfrac{1}{2} \angle BAD = \dfrac{1}{2} (80^{\circ}) = 40^{\circ}$

Answer: $x = 40$ .

Example $\PageIndex{3}$

Find $x$ if $\overrightarrow{AC}$ bisects $\angle BAD$ :

$屏幕快照 2020-10-27 下午8.44.31.png$

Solution

$\begin{array} {rcl} {\angle BAC} & = & {\angle CAD} \\ {\dfrac{7}{2} x} & = & {3x + 5} \\ {(2) \dfrac{7}{2} x} & = & {(2) (3x + 5)} \\ {7x} & = & {6x + 10} \\ {7x - 6x} & = & {10} \\ {x } & = & {10} \end{array}$