An Open Right membership function is characterized by: An infinite extension to the right It extends infinitely to the left Being symmetric around the peak None of the above

What characterizes an Open Left membership function? It has a sharp peak on the left side It extends infinitely to the left It has a gradual slope on the left side None of the above

Which of the following is a disadvantage of using Open Right membership functions? Lack of expressiveness Difficulty in implementation Limited applicability Potential for uncertainty on the right side None of the above

Given an Open Left membership function with a peak at x = 4, if the degree of membership at x = 2 is 1.0, what is the degree of membership at x = 1? 0.2 0.4 1.0 None of the above

If you have two Left-Right membership functions with parameters [1, 4, 6] and [3, 2, 7], which function has a wider right region? [1, 4, 6] [3, 2, 7] Both have the same right region width None of the above

For a generalized bell shaped membership function specified by three parameters [a,b,c], which of the following statements are true? Parameter a defines the shape of the curve Parameter a defines the width of the membership function Parameter a defines the centre of the membership function None of the above