Question
a.
smallest previous integer
b.
greatest previous integer
c.
smallest following integer
d.
none of the mentioned
Posted under Discrete Mathematics
Engage with the Community - Add Your Comment
Confused About the Answer? Ask for Details Here.
Know the Explanation? Add it Here.
Q. A ceil function map a real number to __________
Similar Questions
Discover Related MCQs
Q. A function f(x) is defined as f(x) = x – [x], where [.] represents GIF then __________
View solution
Q. Floor(2.4) + Ceil(2.9) is equal to __________
View solution
Q. For some integer n such that x < n < x + 1, ceil(x) < n.
View solution
Q. For some number x, Floor(x) <= x <= Ceil(x).
View solution
Q. If x, and y are positive numbers both are less than one, then maximum value of floor(x + y) is?
View solution
Q. If x, and y are positive numbers both are less than one, then maximum value of ceil(x + y) is?
View solution
Q. If X = Floor(X) = Ceil(X) then __________
View solution
Q. Let n be some integer greater than 1,then floor((n-1)/n) is 1.
View solution
Q. For an inverse to exist it is necessary that a function should be __________
View solution
Q. If f(x) = y then f⁻¹(y) is equal to __________
View solution
Q. A function f(x) is defined from A to B then f⁻¹ is defined __________
View solution
Q. If f is a function defined from R to R, is given by f(x) = 3x – 5 then f⁻¹(x) is given by __________
View solution
Q. For some bijective function inverse of that function is not bijective.
View solution
Q. f(x) is a bijection than f⁻¹(x) is a mirror image of f(x) around y = x.
View solution
Q. If f is a function defined from R to R, is given by f(x) = x² then f⁻¹(x) is given by?
View solution
Q. For any function fof⁻¹(x) is equal to?
View solution
Q. The solution to f(x) = f⁻¹(x) are __________
View solution
Q. Let f(x) = x then number of solution to f(x) = f⁻¹(x) is zero.
View solution
Suggested Topics
Are you eager to expand your knowledge beyond Discrete Mathematics? We've curated a selection of related categories that you might find intriguing.
Click on the categories below to discover a wealth of MCQs and enrich your understanding of Computer Science. Happy exploring!