Explanation
Coterminal angles19 are angles in standard position (angles with the initial side on the positive x-axis) that have a common terminal side
for instantce
tne angle -30 and angle 330 are coterminal
so
Step 1
Let
[tex]\text{angle}=\frac{19}{6}\pi[/tex]now, draw the angel
remember that:
[tex]\pi\text{ rad= 180 \degree}[/tex]so, convert the angle ( from radians to degrees)
[tex]\begin{gathered} \text{angle}=\frac{19}{6}\pi \\ \text{angle}=\frac{19}{6}\pi\cdot(\frac{180\text{ \degree}}{\pi\text{ rad}})=\frac{18}{6}\cdot180 \\ \text{angle}=540\text{ \degree} \end{gathered}[/tex]hence, 540 ° is the angle
Step 2
now, as we have an angle greater than 360 and smaller than 720
to find the cotermiinal angle, we need to subtract 360 from teh given angle,so
[tex]\begin{gathered} \cot er\min al\text{ angle= 540 \degree-360\degree} \\ \text{ coterminal angle=180 \degree} \end{gathered}[/tex]so, 180 ° is a positive angle less than 360 ° that is coterminal with 19 pi/6
finally, let's convert the answer into radians, so
[tex]180\text{ \degree(}\frac{\pi\text{ radi}}{180\text{ \degree}}\text{)=}\pi\text{ radians}[/tex]therefore the answer is
[tex]180\text{ \degree or }\pi\text{ radians}[/tex]I hope this helpsy ou
