Answer:
The simplified expressions are (x + y·z' + t) and x·(x + y' + z) respectively.
Step-by-step explanation:
The expressions provided are:
[tex](i)\ x+((y\times (z')) +t)\\\\(ii)\ x\times((x+(y'))+z)[/tex]
(i)
Simplify the first expression with as few symbols as possible:
[tex]x+((y\times (z')) +t)=x+(yz'+t)[/tex]
[tex]=x+yz'+t[/tex]
(ii)
Simplify the second expression with as few symbols as possible:
[tex]x\times((x+(y'))+z)=x\times ((x+y')+z)[/tex]
[tex]=x (x+y'+z)[/tex]
Thus, the simplified expressions are (x + y·z' + t) and x·(x + y' + z) respectively.
