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Computer Science Engineering (CSE) Exam  >  Computer Science Engineering (CSE) Tests  >  Test: Minimization of Boolean Functions - 2 - Computer Science Engineering (CSE) MCQ

Test: Minimization of Boolean Functions - 2 - Computer Science Engineering (CSE) MCQ


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10 Questions MCQ Test - Test: Minimization of Boolean Functions - 2

Test: Minimization of Boolean Functions - 2 for Computer Science Engineering (CSE) 2024 is part of Computer Science Engineering (CSE) preparation. The Test: Minimization of Boolean Functions - 2 questions and answers have been prepared according to the Computer Science Engineering (CSE) exam syllabus.The Test: Minimization of Boolean Functions - 2 MCQs are made for Computer Science Engineering (CSE) 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Minimization of Boolean Functions - 2 below.
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Test: Minimization of Boolean Functions - 2 - Question 1
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Find the simplified expression A’BC’+AC’.

Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 1
- To simplify the expression A'BC' + AC', start by factoring out C':
- C'(A'B + A)
- Next, notice that A'B + A can be simplified using the Consensus Theorem:
- A'B + A = A + B
- Therefore, you can rewrite the expression as:
- C'(A + B)
- This leads us to the final simplified expression:
- (A + B)C'
- The correct answer is option 3: (A + B)C'.
Test: Minimization of Boolean Functions - 2 - Question 2
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Simplify the expression XZ’ + (Y + Y’Z) + XY.

Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 2

Given: X Z’ + (Y + Y’Z) + XY
= XZ’ + (Y + Z) + XY
= XZ’ + Y + Z + XY
= (XZ’ + Z) + (Y + XY)
= (X + Z) + Y (1 + X)
= X + Y + Z.

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Test: Minimization of Boolean Functions - 2 - Question 3
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If an expression is given that x+x’y’z=x+y’z, find the minimal expression of the function F(x,y,z) = x+x’y’z+yz?

Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 3

We have, x+x’y’z+yz
= x+y’z+yz [since, x+x’y’z=x+y’z]
= x+z(y’+y)
= x + z.

Test: Minimization of Boolean Functions - 2 - Question 4
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The minimised form of Boolean logic expression (A’B’C’ + A’BC’ + A’BC + ABC’) can be reduced to
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 4

Y = A’B’C’ + A’BC’ + A’BC + ABC’

After simplification we get

Y = A'C' (B' + B) + A’BC + ABC’

Y = A'C' + A’BC + ABC’

Y = A' (C' + BC) + ABC'

Y = A' (C' + B) (C' + C) + ABC'

Y = A'C' + A'B + ABC'

Y= A'C' + B (A' + AC')

Y = A'C' + B (A' + A) (A' + C')

Y = A'C' + A'B + BC'

Test: Minimization of Boolean Functions - 2 - Question 5
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Evaluate the expression: (X + Z)(X + XZ’) + XY + Y.
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 5

(X + Z)(X + XZ’) + XY + Y [Original Expression]
= (x + z)X(1 + Z’) + XY + Y [Distributive]
= (X + Z)X + XY + Y [Complement, Identity]
= (X+Z)X + Y(X+1) [ Distributive]
= (X+Z)X + Y [Idempotent]
= XX + XZ + Y [Distributive]
= X + XZ + Y [Identity]
= X(1+Z) + Y
= X + Y [Idempotent].

Test: Minimization of Boolean Functions - 2 - Question 6
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What is the simplification value of MN(M + N’) + M(N + N’)?
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 6

Given: MN(M + N’) + M(N + N’)
= MN(M+N’) + M.1
= MNM + MNN’ + M
= MN + 0 +M
= M(N + 1)
= M.

Test: Minimization of Boolean Functions - 2 - Question 7
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Find the simplified term Y’ (X’ + Y’) (X + X’Y)?
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 7

Given: Y’ (X’ + Y’) (X + X’Y)
= Y’(X’ + Y’)(X + Y)
= (X’Y’ + Y’)(X + Y)
= (XX’Y’ + X’Y’Y + XY’ + YY’)
= XY’.

Test: Minimization of Boolean Functions - 2 - Question 8
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Simplify the following Boolean expression.
E(E + F) + DE + D(E + F)
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 8

E(E + F) + DE + D(E + F)

=E.E + E.F + D.E + D.E + D.F

=E + E.F + D.E + D.F

=E (1+F) + D.E + D.F         As per Annulment Law : 1 + A = 1

=E + D.E + D.F                   As per Identity Law : A.1 =  A

=E(1+D) + D.F

=E + D.F  ( Answer )

Test: Minimization of Boolean Functions - 2 - Question 9
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Simplify the expression: XY’ + X’ + Y’X’.
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 9

Given XY’+X’+Y’X’ = Y’(X+X’) + X’ = Y’.1 + X’ = X’ + Y’ = (XY)’ [De Morgan’s law].

Test: Minimization of Boolean Functions - 2 - Question 10
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Minimize the following Boolean expression using Boolean identities.
F(A,B,C) = (A+BC’)(AB’+C)
Detailed Solution for Test: Minimization of Boolean Functions - 2 - Question 10

Given, F(A,B,C) = (A+BC’)(AB’+C)
= (AAB’ + BC’AB’ + AC + BC’C)
= (AB’ + 0 + AC + 0)
= A(B’ + C).

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