Consider the following sum of products expression, F
\(F=ABC+\bar A\bar B C+A\bar BC+\bar ABC+\bar A\bar B\bar C\)
The equivalent product of sums expression is
1
\(F = \left( {A + \bar B + C} \right)\left( {\bar A + B + C} \right)\left( {\bar A + \bar B + C} \right)\)
2
\(F = \left( {A + \bar B + \bar C} \right)\left( {A + B + C} \right)\left( {\bar A + \bar B + \bar C} \right)\)
3
\(F = \left( {\bar A + B + \bar C} \right)\left( {A + \bar B + \bar C} \right)\left( {A + B + C} \right)\)
4
\(F = \left( {\bar A + \bar B + C} \right)\left( {A + B + \bar C} \right)\left( {A + B + C} \right)\)