Suppose Quaternion q=a+bi+cj+dk
, the matrix4 of q is:
 a b d c
 b a c d
d c a b
 c d b a
how does this matrix come from?
Suppose
how does this matrix come from? 


Your question could use a little more clarification. However, this matrix seems to be expressing the rules of quaternion multiplication. Consider two complex numbers c_{1} = a_{1} + b_{1}i and c_{2} = a_{2} + b_{2}i. If you multiply them, you get c_{3} = c_{1}c_{2} = (a_{1}a_{2}b_{1}b_{2}) + (a_{2}b_{1}+a_{1}b_{2})i, because you need to cross multiply the real parts and the imaginary parts. You could encode this in matrix/vector form:
The quaternion rules are an extension of the complex. The same idea holds. 

