These are from my BIT notes. I think it isn't illegal to Post Here
1 reduce the following Boolean products to either 0 or a fundamental product:
a. xyx’z
b. xyzy
c. xyz’yx
2 Express E(x,y,z)=(x’+y)’+x’y in its complete sum-of-products form.
3 Let E = xy ’+ xyz’ + x’yz’. Find
a. The prime implicants of E
b. A minimal sum of E
4 Let E = xy + y’t + x’yz’ + xy’zt’. Find
a. The prime implicants of E
b. A minimal sum of E
I know the Laws but don't understand how to Apply them to those and Solve them. I didn't do math for A/L so I don't know much about them.
Sorry for Asking Stupid questions from Genius people like you Are.
Thanks
Can any one Explain Me how to Solve these Boolean Questons?
Re: Can any one Explain Me how to Solve these Boolean Questons?
Again, it is not good to submit your questions here. But I'll answer to give you a start.
Note that I can't remember all these. Please refer to your definition.
= 0.y.z
= 0
= x.y.z
= x.y.z'
= x . y' + x' . y this is the sum of product.
FYI:
Note that this is the function of XOR gate denoted by x ? y. See Exclusive disjunction.
= xy' + yz' (x + x')
= xy' + yz'
Prime implicants of E are xy', yz'
Minimal sum of product = xy' + yz'
(Please verify this.. I can't remember these to be honest)
Note that I can't remember all these. Please refer to your definition.
x.y.x’.z = x.x'.y.za. xyx’z
= 0.y.z
= 0
x.y.z.y = x.y.y.zb. xyzy
= x.y.z
x.y.z’.y.x = x.x.y.y.z'c. xyz’yx
= x.y.z'
E(x,y,z) = (x’+y)’+x’y2 Express E(x,y,z)=(x’+y)’+x’y in its complete sum-of-products form.
= x . y' + x' . y this is the sum of product.
FYI:
Note that this is the function of XOR gate denoted by x ? y. See Exclusive disjunction.
E = xy’+ xyz’ + x’yz’3 Let E = xy ’+ xyz’ + x’yz’. Find
a. The prime implicants of E
b. A minimal sum of E
= xy' + yz' (x + x')
= xy' + yz'
Prime implicants of E are xy', yz'
Minimal sum of product = xy' + yz'
(Please verify this.. I can't remember these to be honest)
Re: Can any one Explain Me how to Solve these Boolean Questons?
Thanks You Very Much.
These are Easy than I Thought
These are Easy than I Thought