Sorry to be annoying, but I am doing a little bit of work at the moment, and am trying to simplify the following piece of boolean algebra so that I can construct the circuit :
A'.B'.C.D + A'.B.C.D' + A'.B.C.D + A.B'.C'.D + A.B'.C.D + A.B.C'.D + A.B.C.D' + A.B.C.D
So far I have gotten it to :
(C.D) + (B.C) + (A.C'.D)
Is this correct ?
...but I know there is more that I can do ! Can anyone help me out please ? I want to get the best possible minimization, I'm just finding it a little difficult to figure out.
The steps I have went through so far are :
A'.B'.C.D + A'.B.C.D' + A'.B.C.D + A+B'+C'+D + A.B'+C+D + A.B.C'.D + A.B.C.D' + A.B.C.D = A.A'(B'.C.D) + A.A'(B.C.D') + A.A'(B.C.D) + B.B'(A.C'.D) = (B.C.D) + (B'.C.D) + (B.C.D) + (B.C.D') + (A.C'.D) = (C.D) + (B.C) + (A.C'.D)
Can I do any more ?
Thank you very much ! :)