In 1–2 sentences, describe how to determine the sign for tanθ in each quadrant of the coordinate plane.

To determine the sign of \( \tan \theta \) in each quadrant of the coordinate plane, recall that \( \tan \theta = \frac{\sin \theta}{\cos \theta} \): in the first quadrant (0 to 90 degrees), both sine and cosine are positive, so \( \tan \theta \) is positive; in the second quadrant (90 to 180 degrees), sine is positive and cosine is negative, making \( \tan \theta \) negative; in the third quadrant (180 to 270 degrees), both sine and cosine are negative, so \( \tan \theta \) is positive; and in the fourth quadrant (270 to 360 degrees), sine is negative while cosine is positive, resulting in \( \tan \theta \) being negative.