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Major arc CBD measures 300°. Which is the radian measure of its corresponding central angle? radians radians radians radians

Major arc CBD measures 300°. Which is the radian measure of its corresponding central angle? radians radians radians radians
asked 101k views
2 votes
Major arc CBD measures 300°. Which is the radian measure of its corresponding central angle? radians radians radians radians

asked
User Cumhur Ata
by
7.6k points

2 Answers

3 votes
we know there are 180° in π radians, so how many degrees in 300° then?


\bf \begin{array}{ccll} degr ees&radians\\ \text{\textemdash\textemdash\textemdash}&\text{\textemdash\textemdash\textemdash}\\ 180&\pi \\ 300&r \end{array}\implies \cfrac{180}{300}=\cfrac{\pi }{r}\implies r=\cfrac{300\pi }{180}\implies \cfrac{5\pi }{3}
answered
User Kevin Joymungol
by
8.3k points
3 votes

Answer:


(5)/(3)\pi\ radians

Explanation:

we know that

If the measures of the major arc CBD is equal to
300 degrees

then

the measure of its corresponding central angle is equal to
300 degrees

so

Convert degrees to radians

Remember that


180\°=\pi \ radians

so by proportion

Convert
300\° to radians


(\pi)/(180)(radians)/(degrees) =(x)/(300)(radians)/(degrees)\\ \\x=300\pi /180\\ \\x=(5)/(3)\pi\ radians

answered
User Payam Shakibafar
by
8.0k points
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