**Block Category:** Transcendental

**Input:** Real scalars.

**Description:** The atan2 block computes the
four-quadrant inverse tangent of the input signals. The atan2 block uses the
signs of both input signals to determine the sign of the output signal. The
output is an angle in radians. For fixed-point implementation, use the fxAtan2 block.

**Label:** Indicates a user-defined block label that appears when
**View > Block Labels** is activated.

**1. Computation of tan ^{-1}(**

This equation is realized as:

To convert radians to degrees, the angle in radians is multiplied by (180/π) = 57.2958.

Since the atan2 block uses the value of
*x*_{1}, the signs of *x*_{1} and
*x*_{2}, and the ratio *x*_{1}/*x*_{2} in
computing the inverse tangent, the result depends on all these parameters. In
the current case, since the ratio is infinity, atan2 computes the inverse
correctly to be π/2 radians, or 90^{o}. Also, in the current case,
*x*_{1} can be any positive value, since its ratio with 0 will be
infinity, regardless of its value.

**2. Computation of tan ^{-1}(-1): quadrant
dependency**

Using the same configuration in the above example,
tan^{-1}(-1) is realized as:

Here, the angle obtained is -0.7854 radians, or
-45^{o}, because the atan2 block determines that the angle lies in the
fourth quadrant. However, it is immediately apparent that the same ratio of -1
can be obtained by flipping the signs on *x*_{1} and
*x*_{2}:

In this case, the atan2 block uses the relative
signs of *x*_{1} and *x*_{2} to determine that the
angle lies in the second quadrant, and yields an angle of 180 - 45 =
135^{o}, or 2.356 radians.