Is the floor function increasing or decreasing or both in the interval [0,1)

Annalise Wilson

Annalise Wilson

Open question

2022-08-22

Is the floor function increasing or decreasing or both in the interval [0,1)
I was attempting a quiz in which I encountered this question, Now the graph of the floor function is constant in the interval [0,1) so technically the function should be neither increasing nor decreasing, but the answer to the question is its both increasing and decreasing. So is the answer wrong or am I unaware of a concept?
Similarly, there was another question about the function f ( x ) = x 2 3 x + 2 in the interval [ 0 , i n f ] but the graph of the function comes down from 0 and there is a critical point at 1 and then goes up, so is decreasing and increasing in the interval [ 0 , i n f ) but the answer is its neither increasing nor decreasing, now one of my classmates gave me a line of reasoning that f ( x ) <= 0 a n d f ( x ) >= 0 in the inerval [ 0 , i n f ) which implies f ( x ) = 0 but I'm not really convinced with the argument because the graph clearly shows that the function is decreasing then increasing. So am I missing a concept here or the answers are wrong?

Answer & Explanation

Arjun Wright

Arjun Wright

Beginner2022-08-23Added 8 answers

Step 1
increasing function: x > y f ( x ) f ( y )
decreasing function: x > y f ( x ) f ( y )
strictly increasing function: x > y f ( x ) > f ( y )
strictly decreasing function: x > y f ( x ) < f ( y )
Step 2
A constant function is increasing and decreasing. But it is neither strictly increasing nor strictly decreasing.
For f ( x ) = x 2 3 x + 2, it is increasing on [ 1.5 , ) and decreasing on [0,1.5]. But it is neither increasing nor decreasing on [ 0 , ).

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