As we don't know the value of Q = 1 or 0, so there can be 2 possible sequence.

Hence, modulo cannot be determined unless other information regarding initial value of Q given.

Correct Option: D

As we don't know the value of Q = 1 or 0, so there can be 2 possible sequence.

Hence, modulo cannot be determined unless other information regarding initial value of Q given.

NA

Correct Option: B

NA

In 4 × 1 MUX, A and B as select line, the truth table is

Output = F = I₀ – S₁ – S₂ + I₁ – S₂ S₁
F=I₀ – S₁ – S₂ + I₁ – S₁ S₂ + I₂ – S₁ S₂ + I₃ S₁S₂
= C – A – B + C – A B + – C A – B + – C A B
= C – A (B + – B) + – C A (– B + B)
= C – A + – C A
= C ⊕ A

Correct Option: B

In 4 × 1 MUX, A and B as select line, the truth table is

Output = F = I₀ – S₁ – S₂ + I₁ – S₂ S₁
F=I₀ – S₁ – S₂ + I₁ – S₁ S₂ + I₂ – S₁ S₂ + I₃ S₁S₂
= C – A – B + C – A B + – C A – B + – C A B
= C – A (B + – B) + – C A (– B + B)
= C – A + – C A
= C ⊕ A

Y = A + C + B + AC
= A (C + 1) + C + B
= A + B + C

Correct Option: B

Y = A + C + B + AC
= A (C + 1) + C + B
= A + B + C

3 × (8)³ + 7 × (8)² + 5 × 8¹ + 3 × 8º means 512, 64, 8 and 1 can be written as power of 8. The proceeding number is translatable to an octal number (3 7 5 3)₈ = (011 111 101 011)₂ Number of 1 = 9. Hence alternative (B) is the correct answer.

Correct Option: B

3 × (8)³ + 7 × (8)² + 5 × 8¹ + 3 × 8º means 512, 64, 8 and 1 can be written as power of 8. The proceeding number is translatable to an octal number (3 7 5 3)₈ = (011 111 101 011)₂ Number of 1 = 9. Hence alternative (B) is the correct answer.