Identify the quadrant in which the angle $ heta $ lies

To identify the quadrant in which the angle $ \theta $ lies, follow these steps:

1. If $ 0 \leq \theta < \frac{\pi}{2} $, then the angle is in the first quadrant.

2. If $ \frac{\pi}{2} \leq \theta < \pi $, then the angle is in the second quadrant.

3. If $ \pi \leq \theta < \frac{3\pi}{2} $, then the angle is in the third quadrant.

4. If $ \frac{3\pi}{2} \leq \theta < 2\pi $, then the angle is in the fourth quadrant.

To find the quadrant in which the angle $ heta $ lies:

1. If $ 0 leq heta < frac{pi}{2} $, it

To identify the quadrant of the angle $ heta $:

1. $ 0 leq heta < frac{pi}{2} $ is first quadrant.

2. $ frac{pi}{2} leq heta < pi $ is second quadrant.

3. $ pi leq heta < frac{3pi}{2} $ is third quadrant.

4. $ frac{3pi}{2} leq heta < 2pi $ is fourth quadrant.

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