adplus-dvertising
frame-decoration

Question

Which of the following problems do not belong to Karp’s 21 NP-complete problems?

a.

Vertex Cover problems

b.

Knapsack

c.

0-1 integer programming

d.

None of the mentioned

Answer: (d).None of the mentioned

Engage with the Community - Add Your Comment

Confused About the Answer? Ask for Details Here.

Know the Explanation? Add it Here.

Q. Which of the following problems do not belong to Karp’s 21 NP-complete problems?

Similar Questions

Discover Related MCQs

Q. Which of the following problems were reduced to Knapsack?

Q. An exact cover problem can be represented using:

Q. For which of the following, greedy algorithm finds a minimal vertex cover in polynomial time?

Q. Hamilton circuit problem can have the following version/s as per the input graph:

Q. Hamilton Circuit problem is a special case of ____________

Q. Which of the following cannot solve Hamilton Circuit problem?

Q. State true or false:
Statement: Hamiltonian cycles through any fixed edge is always even, so if one such cycle is given, the second one must also exists.

Q. Fibonacci number falls in the category of _________ combinatorics.

Q. All set of polynomial questions which can be solved by a turing machine using a polynomial amount of space:

Q. PSPACE is strictly the super set of:

Q. Savitch theorem relates to which of the following:

Q. The class PSPACE is closed under the following operations:

Q. Correct the given order:
NL∈ P∈ NP∈ PH∈ PSPACE

Q. NL ∈ PSPACE ∈ EXPSPACE
The given relation involves which of the following theorems?

Q. Statement : All PSPACE problems can be reduced to PSPACE-complete problems.
State true or false:

Q. Without needing extra __________ we can simulate non deterministic turing machine using deterministic turing machine.

Q. Complement of all the problems in PSPACE is ________

Q. Which of the following PSPACE can be characterized into?

Q. A randomized algorithm uses random bits as input inorder to achieve a _____________ good performance over all possible choice of random bits.

Q. Which of the following options match the given statement:
Statement: The algorithms that use the random input to reduce the expected running time or memory usage, but always terminate with a correct result in a bounded amount of time.