Quine Mccluskey Method Question & Answers July 12, 2022 By WatElectronics This article lists 50 Quine Mccluskey Method MCQs for Engineering Students. The Quine Mccluskey Method Questions & Answers below include solutions and links to the relevant topic. This is helpful for users who are preparing for their exams and interviews, or professionals who would like to brush up on the fundamentals of the Quine Mccluskey Method. Another name for the Quine McCluskey method is a tabular method. In a Karnaugh map method, we can go up to a maximum of five or six variables, but it is not easy to automate on a computer. We need a more systematic procedure for larger functions, for that we use the quine McCluskey method and this method is sometimes called a tabular method. Quine McCluskey proposes the systematic procedure required for larger functions, it is proposed by quine McCluskey, it uses a tabular structure sometimes that the reason it is also called a tabular method. The main advantage of this method is, that it can be automated easily and it is also suitable for hand computation. The two K-variable terms can be combined into a single (K-1) variable term, for example, A’B’C’D denoted by 0 methods of describing a 001, AB’C’D denoted by 1001 then after combining will get –001. The symbol which we use ‘-’ is used to indicate the absence of literal. The advantages of tabular presentation are that it makes it easy to analyze the data and represent the data and it is also easy to compare the data. 1). Which one of the following is a binary value for min term one? 0000 0001 0010 0011 None Hint 2). How many variables are there in f (W, X, Y, Z) = summation (2, 6, 8, 9, 10, 11, 14, 15) Boolean function? One Two Three Four None Hint 3). How many min terms are there in the f (W, X, Y, Z) = summation (2, 6, 8, 9, 10, 11, 14, 15) Boolean function? One Two Eight Four None Hint 4). What is the standard from of DeSTIN? Deep Spatio Temporal Interface Network Deep Simple Temporal Interface Network Deep Single Temporal Interface Network None of the above None Hint 5). What is the standard from of KNN? K-Nearest Neighbor K-Nearest Nearest K- Neighbor Neighbor None of the above None Hint 6). If X=Y=Z=0 then the maxterms that is sum terms is ______________? M0=X+Y+Z=max(X, Y, Z) M0=X.Y.Z=max (X, Y, Z) M0=X.Y+Z=max (X, Y, Z) None of the above None Hint 7). Which one of the following is also known as disjunctive canonical form? Min terms Max terms Both a and b None of the above None Hint 8). The F=ABCDEG is an example for __________? SOP POS Both a and b None of the above None Hint 9). In the given Boolean function F=ABC+DEG, which one of the following is an input variable? F ABC DEG None of the above None Hint 10). Which one of the following is a binary value for min term two? 0000 0001 0010 0011 None Hint Quine Mccluskey Method MCQs for Quiz 11). What is the standard from of DBN? Deep Belief Network Deep Best Network Deep Boolean Network None of the above None Hint 12). In the sum of products, the output of ___________ gate gives the output function? OR NAND AND None of the above None Hint 13). Which one of the following is represented by m? SOP POS Both a and b None of the above None Hint 14). In sum of products, we have to consider the rows which have the outputs ____________? One Zero Both a and b None of the above None Hint 15). The method which describes the Boolean expression using product terms or min terms is known as ______________? POS SOP Both a and b None of the above None Hint 16). In which one of the following, the final expression is obtained by adding the relevant product terms? POS SOP Both a and b None of the above None Hint 17). In _____________, we write the sum terms for each input combination that gives low output? POS SOP Both a and b None of the above None Hint 18). In the sum of products, if the input is ______________ then it has to be inverted? Zero One Two None of the above None Hint 19). In the given Boolean function F=ABC+DEG, which one of the following is an input variable? F ABC DEG Both b and c None Hint 20). Which one of the following is a binary value for min term three? 0000 0001 0010 0011 None Hint Quine Mccluskey Method MCQs for Interviews Read more about Quine-McCluskey-Method 21). What is the full form of DML? Deep Machine Learning Deep Min Learning Deep Material Learning None of the above None Hint 22). What is the gull form of SOP? Sum of Products Sum of Probability Sum on Products None of the above None Hint Read more about SOP and POS 23). The F=(A+B+C).(D+E+G) is an example for __________? SOP POS Both a and b None of the above None Hint 24). In the product of sum, if the input is ______________ then it has to be inverted? Zero One Two None of the above None Hint 25). Which one of the following is a binary value for min term nine? 0000 0001 0111 1001 None Hint 26). Which one of the following is also known as conjunctive canonical form? Min terms Max terms Both a and b None of the above None Hint 27). In the product of sum, the output of ___________ gate gives the output function? OR NAND AND None of the above None Hint 28). Which one of the following is represented by M? SOP POS Both a and b None of the above None Hint 29). What is the full form of POS? Product of Sums Probability of Sums Product of Summation None of the above None Hint 30). Which one of the following is a binary value for min term seven? 0000 0001 0111 0011 None Hint Quine Mccluskey Method MCQs for Students 31). What is the full form of PDF? Probability Density Function Probability Deep Function Proportional Density Function None of the above None Hint 32). In product of sums, we have to consider the rows which have the outputs ____________? One Zero Both a and b None of the above None Hint 33). A method which describes the Boolean expression using sum terms or max terms is known as ______________? POS SOP Both a and b None of the above None Hint 34). If A=0, B=0, and C=0 then the min term is represented by ______________? A’.B.C A’.B’.C’ A.B.C’ A.B’.C None Hint 35). Which one of the following is a binary value for min term eleven? 0000 0001 0111 1011 None Hint 36). If A=1, B=0, and C=1 then the min term is represented by ______________? A’.B.C A’.B’.C’ A.B.C’ A.B’.C None Hint 37). In ____________ will get a final term by adding he product terms? SOP POS Both a and b None of the above None Hint 38). If the input variable 'A' value is one then the variable is represented by ____________? A A’ A^2 A^0 None Hint 39). If A=0, B=1, and C=0 then the max term is represented by ______________? A’+B+C A’+B’+C’ A+B+C’ A+B’+C None Hint 40). Which one of the following is a binary value for min term eight? 0000 0001 0111 1000 None Hint 41). If A=1, B=1, and C=1 then the max term is represented by ______________? A’+B+C A’+B’+C’ A+B+C’ A+B’+C None Hint 42). If A=1, B=0, and C=0 then the max term is represented by ______________? A’+B+C A’+B’+C’ A+B+C’ A+B’+C None Hint 43). If A=0, B=0, and C=1 then the max term is represented by ______________? A’+B+C A’+B’+C’ A+B+C’ A+B’+C None Hint 44). If A=0, B=1, and C=1 then the min term is represented by ______________? A’.B.C A’.B’.C’ A.B.C’ A.B’.C None Hint 45). Which one of the following is a binary value for min term fifteen? 0000 0001 0111 1111 None Hint 46). In how many ways Boolean expression can be done? One Two Three Four None Hint 47). If the input variable A value is zero then the variable is represented by ____________? A A’ A^2 A^0 None Hint 48). If A=1, B=1, and C=0 then the min term is represented by ______________? A’.B.C A’.B’.C’ A.B.C’ A.B’.C None Hint 49). In _____________, for each input combination we write the product terms that gives high output? POS SOP Both a and b None of the above None Hint 50). In which one of the following the final expression is obtained by multiplying the relevant sum terms? POS SOP Both a and b None of the above None Hint Please fill in the comment box below. Time's up