New answers tagged homography
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.
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 ...
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 ...
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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