Using deep learning to estimate surface normals from monocular RGB images is a common task. The resulting image generally looks like this:

RBG to surface normal map

My question is how can I use this map to actually draw a normal vector (arrow) for any given point on the image? For example, I want to draw a line on the countertop that points up.

Most relevant tidbit I found on the topic: "The RGB color channels (red, green, and blue) in a normal map correspond to the respective X, Y, and Z coordinates of surface normals."

But I don't get what this means. The values are standard RGB, i.e., for each coordinate, you get three numbers in range [0, 255]. Just by how color changes between surfaces, it is clearly related to normals (obviously) but when I tried quiver plots using matlab I couldn't get reasonable results.

TLDR: What is the relation between surface normal maps and actual normal vectors? How can I draw a 3d line given a point on the image which represents the normal vector perpendicular to that surface at that point?


1 Answer 1


Typically the normal vector, which has XYZ components in [−1, 1] is linearly mapped to the RGB range [0, 255]. You can retrieve the normal vector by reversing this mapping.

For completeness, the encoding is:
$$ r = \text{round}((0.5x + 0.5) \cdot 255) \\ g = \text{round}((0.5y + 0.5) \cdot 255) \\ b = \text{round}((0.5z + 0.5) \cdot 255) $$

Decoding is: $$ x = (r/255) \cdot 2 - 1 \\ y = (g/255) \cdot 2 - 1 \\ z = (b/255) \cdot 2 - 1 $$

  • $\begingroup$ Thank you. Is there a convention as to which channel corresponds to which axis? e.g., R=X, G=Y, B=Z etc $\endgroup$ Nov 11, 2020 at 21:11
  • $\begingroup$ Yes always R=X, G=Y, B=Z. There are different conventions about which ways the axes point, though, such as Y up versus Z up. $\endgroup$ Nov 11, 2020 at 21:29

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