The correct option is
C Semester 4
For number of students who pass over time to remain constant, we have to find the function that is constant.
Let's consider
Semester 1:
Year |
No. of students passing |
2010 |
10 |
2012 |
15 |
Number of students who pass has increased with respect to time (year).
∴ Semester 1 represents an increasing function.
Let's consider
Semester 2:
Year |
No. of students passing |
2012 |
15 |
2014 |
5 |
Number of students who pass has decreased with respect to time (year).
∴ Semester 2 represents a decreasing function.
Let's consider
Semester 3:
Year |
No. of students passing |
2014 |
5 |
2016 |
10 |
Number of students who pass has increased with respect to time (year).
∴ Semester 3 represents an increasing function.
Let's consider S
emester 4:
Year |
No. of students passing |
2016 |
10 |
2018 |
10 |
Number of students who pass has not changed with respect to time (year).
∴ Semester 4 represents a constant function.
Therefore, only Semester 4 represents the condition where the number of passing students is constant over time.