For the rotation -293^(@), find the coterminal angle from 0^(@) <= theta < 360^(@), the quadrant, and the reference angle. The coterminal angle is ◻^(@), which lies in Quadrant ◻, with a reference angle of ◻^(@).

Add 360 degrees: To find the coterminal angle, add 360 degrees to -293 degrees until the result is between 0 and 360 degrees. -293 + 360 = 67 degrees.Check result: The coterminal angle is 67 degrees, which is between 0 and 360 degrees.Identify quadrant: 67 degrees lies in Quadrant I because it's between 0 and 90 degrees.Find reference angle: The reference angle for an angle in Quadrant I is the angle itself. So, the reference angle is 67 degrees.

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For the rotation
-293^(@), find the coterminal angle from
0^(@) <= theta < 360^(@), the quadrant, and the reference angle.
The coterminal angle is
◻^(@), which lies in Quadrant
◻, with a reference angle of
◻^(@).

For the rotation $-293^{\circ}$ , find the coterminal angle from 0^{\circ} \leq \theta<360^{\circ} , the quadrant, and the reference angle. $\newline$ The coterminal angle is $\square^{\circ}$ , which lies in Quadrant $\square$ , with a reference angle of $\square^{\circ}$ .

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Q. For the rotation

-293^{\circ}

, find the coterminal angle from

0^{\circ} \leq \theta<360^{\circ}

, the quadrant, and the reference angle.

\newline

The coterminal angle is

\square^{\circ}

, which lies in Quadrant

\square

, with a reference angle of

\square^{\circ}

Add $360$ degrees: To find the coterminal angle, add $360$ degrees to $-293$ degrees until the result is between $0$ and $360$ degrees. $\newline$ $-293 + 360 = 67$ degrees.
Check result: The coterminal angle is $67$ degrees, which is between $0$ and $360$ degrees.
Identify quadrant: $67^\circ$ lies in Quadrant I because it's between $0$ and $90$ degrees.
Find reference angle: The reference angle for an angle in Quadrant I is the angle itself. $\newline$ So, the reference angle is $67$ degrees.