since wo and wi are equal, we have wo+wi = 2cos(t)n, how is cos(t) = (wi*n) in this case?
shreyaskompalli
Is this perfect specular reflection ever possible in actual nature/real life? It seems like this is an ideal concept that real objects can approximate but never truly achieve; is this the case?
ML2000-LT
The figure on the left was not exactly accurate. The better way for representing n, would be to extend the entirety to the diagonal of the resulting figure, then we now the exact length would be 2costheta times n perp.
since wo and wi are equal, we have wo+wi = 2cos(t)n, how is cos(t) = (wi*n) in this case?
Is this perfect specular reflection ever possible in actual nature/real life? It seems like this is an ideal concept that real objects can approximate but never truly achieve; is this the case?
The figure on the left was not exactly accurate. The better way for representing n, would be to extend the entirety to the diagonal of the resulting figure, then we now the exact length would be 2costheta times n perp.