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Which of the following degree measures is equal to
4pi radians?
(The number of degrees of arc in a circle is 360 . The number of radians of arc in a circle is
2pi.)
Choose 1 answer:
(A)
180^(@)
(B)
360^(@)
(c)
720^(@)
(D)
1,440^(@)

Which of the following degree measures is equal to $4 \pi$ radians? $\newline$ (The number of degrees of arc in a circle is $360$ . The number of radians of arc in a circle is $2 \pi$ .) $\newline$ Choose $1$ answer: $\newline$ (A) $180^{\circ}$ $\newline$ (B) $360^{\circ}$ $\newline$ (C) $720^{\circ}$ $\newline$ (D) $1,440^{\circ}$

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Find trigonometric ratios using a Pythagorean or reciprocal identity

Full solution

Q. Which of the following degree measures is equal to

4 \pi

radians?

\newline

(The number of degrees of arc in a circle is

360

. The number of radians of arc in a circle is

2 \pi

.)

\newline

Choose

1

answer:

\newline

(A)

180^{\circ}

\newline

(B)

360^{\circ}

\newline

(C)

720^{\circ}

\newline

(D)

1,440^{\circ}

Convert radians to degrees: Convert radians to degrees using the conversion factor that $2\pi$ radians is equal to $360$ degrees. $\newline$ Calculate the degree measure equivalent to $4\pi$ radians. $\newline$ $4\pi$ radians * \frac{360^{\circ}}{2\pi \) radians} = \( 2 * 360^{\circ}
Calculate degree measure for $4$ π radians: Complete the calculation to find the degree measure. $\newline$ $2 * 360^{\circ} = 720^{\circ}$

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