COMEDK-UGET SERIES Mathematics
Integral
22 previous year questions.
Volume: 22 Ques
Yield: High
High-Yield Trend
2
2021 3
2015 5
2014 2
2013 1
2012 3
2011 1
2010 2
2009 3
2008 Chapter Questions 22 MCQs
01
PYQ 2008
medium
mathematics ID: comedk-u
If denotes the greatest integer function, then
1
2
3
4
02
PYQ 2008
easy
mathematics ID: comedk-u
1
2
3
4
03
PYQ 2008
medium
mathematics ID: comedk-u
If then
1
2
3
4
04
PYQ 2009
medium
mathematics ID: comedk-u
1
2
3
4
05
PYQ 2009
medium
mathematics ID: comedk-u
1
2
3
4
06
PYQ 2010
medium
mathematics ID: comedk-u
1
0
2
-1
3
2
4
1
07
PYQ 2011
easy
mathematics ID: comedk-u
1
2
3
4
08
PYQ 2011
medium
mathematics ID: comedk-u
Let and be differentiable functions on (0, 2] such that Then at is
1
0
2
2
3
10
4
5
09
PYQ 2011
medium
mathematics ID: comedk-u
1
2
3
4
10
PYQ 2012
medium
mathematics ID: comedk-u
If then is equal to
1
2
3
4
11
PYQ 2013
medium
mathematics ID: comedk-u
If then is equal to
1
2
3
4
12
PYQ 2013
medium
mathematics ID: comedk-u
The intercepts on made by tangents to the curve, , which are parallel to the line , are equal to
1
2
3
4
13
PYQ 2014
medium
mathematics ID: comedk-u
The value of depends on the
1
value of b
2
value of c
3
value of a
4
value of a and b
14
PYQ 2014
easy
mathematics ID: comedk-u
The interval I such that is given by
1
2
3
4
15
PYQ 2014
medium
mathematics ID: comedk-u
is equal to
1
2
3
4
16
PYQ 2014
medium
mathematics ID: comedk-u
1
2
0
3
1
4
17
PYQ 2014
easy
mathematics ID: comedk-u
The solution of is
1
2
3
4
18
PYQ 2015
medium
mathematics ID: comedk-u
1
2
3
4
19
PYQ 2015
medium
mathematics ID: comedk-u
If then =
1
2
3
4
20
PYQ 2015
easy
mathematics ID: comedk-u
1
2
3
4
21
PYQ 2021
medium
mathematics ID: comedk-u
The integral is:
1
2
2
3
3
0
4
5
22
PYQ 2021
medium
mathematics ID: comedk-u
The integral is equal to:
1
2
3
4
About Integral - COMEDK-UGET
Integral is a vital chapter for COMEDK-UGET aspirants. Mastering the concepts covered in this chapter is essential for securing a top rank.
By rigorously practicing the previous year questions associated with this chapter, you can identify high-yield topics, understand the examiner's perspective, and boost your confidence during the actual exam.
Frequently Asked Questions
Why focus on Integral PYQs?
Analyzing PYQs for this specific chapter reveals the most frequently tested concepts and the typical complexity of questions, allowing you to tailor your study plan efficiently.
How to best use this analysis?
Review the topic breakdown to see which sub-topics within Integral carry the most weight. Then, tackle the questions iteratively to solidify your understanding.