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how to find reference angle in radians

Author

Sarah Parker

Updated on June 20, 2026

In order to find its reference angle, we first need to find its corresponding angle between 0° and 360°. This is easy to do. We just keep subtracting 360 from it until it’s below 360. For instance, if our angle is 544°, we would subtract 360° from it to get 184° (544° – 360° = 184°).

How do you find the reference angle in negative radians?

To find the reference angle of a negative angle, we have to add 360° or 2π to it as many times as required to find its coterminal angle. For example, to find the reference angle of -1000°, we will add 360° three times to it. It implies, – 1000° + 3(360°) = -1000° + 1080° = 80°.

What is the reference angle of 2.2 radians?

Since 2.2° is in the first quadrant, the reference angle is 2.2° .

What is the reference angle of 150?

Looking at a graph, a 150° angle lies in quadrant II, therefore the reference angle is θ’ = 180° – 150° = 30°.

What is the reference angle of 210?

The reference angle is found by calculating the difference between θ and the x-axis. In this problem, 210 is closest to 180, so 210∘−180∘=30∘ .

What is the reference angle of 570?

Subtract 360° 360 ° from 570° 570 ° . The resulting angle of 210° 210 ° is positive, less than 360° 360 ° , and coterminal with 570° 570 ° .

What is the reference angle of 300?

360 – 300 = 60 degrees. The reference angle for 300 is 60 degrees.

What is the reference angle of 3.5 radians?

Since 3.5° is in the first quadrant, the reference angle is 3.5° .

What is the reference angle for 15pi 4?

Since π4 is in the first quadrant, the reference angle is π4 .

What is the reference angle in degrees for 31π 6?

The reference angle is 7π6 .

What is the reference angle in radians of the angle that measures 270?

Reference angle for 270°: 90° (π / 2)

What is the reference angle of 135?

135′ is in the second quadrant, so our reference angle is 180′-135 “, or 45′ .

What is the reference angle for 225?

Since the angle 180° is in the third quadrant, subtract 180° from 225° .

What is the reference angle of 200?

Subtract 180 degrees from the angle, which is 200 degrees. You find that 200 – 180 = 20, so the reference angle is 20 degrees.

What is the reference angle of 315?

Let us subtract the given angle from 360∘ to find the reference angle or 315∘ . So, the reference angle is 360∘−315∘=45∘ . ∴ We have found the reference angle for 315 degrees as 45∘ .