## New answers tagged homography

0

Assuming we have rotation (R) and translation (t) matrices, following code segment can be used to transform a set of coordinates (assume x,y,z coordinates are stored in data).
data = R * data;
data = [data(1,:) + t(1); data(2,:) + t(2); data(3,:) + t(3)];
Please provide us more details about your code and inputs if this is not clear.

0

If you have all the information (camera intrinsics) you can do it the way FooBar answered.
But you can use the information that the points lie on a plane even more directly with a homography (no need to calculate rays etc):
Compute the homography between the image plane and the ground plane.
Unfortunately you need 4 point correspondences, but there are ...

0

This is possible.
Let's assume (or state) that the table is the z=0-plane and that your first box is at the origin of this plane. This means that green corners of the left box have the (table-)coordinates (0,0,0),(1,0,0),(0,0,1) and (1,0,1). (Your box has the size 1).
You also have the pixel coordinates of these points. If you give these 2d and 3d-values ...

3

No, you need to multiply the matrices to get the cascaded effect. I won't go into the math, but applying a transformation to coordinates is a matter of performing a matrix multiplication. If you are however curious as to know why that is, I refer you to this good Wikipedia article on cascading matrix transformations. Given a coordinate X and a ...

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