Câmeras

Panoramic Cameras

Cycles supports three types of panoramic cameras; Equirectangular, Fisheye, and Mirror Ball. Note that these cannot be displayed in non-rendered modes in the viewport, i.e. Solid mode; they will only work for the final render.

Equirectangular

Render a panoramic view of the scenes from the camera location and use an equirectangular projection, always rendering the full 360° over the X axis and 180° over the Y axis.

This projection is compatible with the environment texture as used for world shaders, so it can be used to render an environment map. To match the default mapping, set the camera object rotation to (90, 0, -90) or pointing along the positive X axis. This corresponds to looking at the center of the image using the default environment texture mapping.

Latitude Min, Max

Limits of the vertical field of view angles.

Longitude Min, Max

Limits of the horizontal field of view angles.

Fisheye

Fisheye lenses are typically wide angle lenses with strong distortion, useful for creating panoramic images for e.g. dome projection, or as an artistic effect.

The Fisheye Equisolid lens will best match real cameras. It provides a lens focal length and field of view angle, and will also take the sensor dimensions into account.

The Fisheye Equidistant lens does not correspond to any real lens model; it will give a circular fisheye that does not take any sensor information into account but rather uses the whole sensor. This is a good lens for full-dome projections.

Lens

Lens focal length in millimeters.

Field of View (campo de visão)

Field of view angle, going to 360 and more to capture the whole environment.

Fisheye Lens Polynomial

Match a real world camera by specifying the coordinates of a 4th degree polynomial.

The projection works as follows. Pixels in the image are mapped to positions \((x, y)\) on the camera sensor in mm. A position on the sensor is mapped to a direction with spherical coordinates \((1, \theta, \phi)\) in radians as follows:

\[\begin{split}& r = \sqrt{x^2 + y^2}\\ & \theta = k_0 + k_1 r + k_2 r^2 + k_3 r^3 + k_4 r^4\\ & \phi = acos(x/r)\end{split}\]

Incoming light from this direction is then projected onto the corresponding pixel.

This can be used to model both fisheye and perspective cameras.

Mirror Ball

Render as if taking a photo of a reflective mirror ball. This can be useful in rare cases to compare with a similar photo taken to capture an environment.