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JEE-MAIN SERIES
Mathematics

Integrals Of Some Particular Functions

18 previous year questions.

Volume: 18 Ques
Yield: Medium

High-Yield Trend

5
2023
7
2019
1
2018
3
2017
2
2013

Chapter Questions
18 MCQs

01
PYQ 2013
medium
mathematics ID: jee-main
If then, is equal to:
1
2
3
4
02
PYQ 2013
medium
mathematics ID: jee-main
If the integral where is an arbitrary constant, then is equal to:
1
2
3
4
03
PYQ 2017
medium
mathematics ID: jee-main
The integral is equal to : (where is a constant of integration)
1
2
3
4
04
PYQ 2017
medium
mathematics ID: jee-main
Let , where is a constant of integration, then the ordered pair is equal to :
1
2
3
4
05
PYQ 2017
medium
mathematics ID: jee-main
The integral is equal to :
1
2
2
4
3
-1
4
-2
06
PYQ 2018
medium
mathematics ID: jee-main

If f(x) = ∫x0 t(sin x-sin t)dt then

1
2
3
4
07
PYQ 2019
medium
mathematics ID: jee-main
is equal to : (where is a constant of integration)
1
2
3
4
08
PYQ 2019
medium
mathematics ID: jee-main
Let , where g is a non-zero even function. If , then equals-
1
2
3
4
09
PYQ 2019
medium
mathematics ID: jee-main
equal to :
1
2
3
4
10
PYQ 2019
medium
mathematics ID: jee-main
If and then the value of integral is :
1
2
3
4
11
PYQ 2019
medium
mathematics ID: jee-main
If , where C is a constant of integration, then the function is equal to-
1
2
3
4
12
PYQ 2019
medium
mathematics ID: jee-main
If , for a suitable chosen integer and a function , where is a constant of integration then equals :
1
2
3
4
13
PYQ 2019
easy
mathematics ID: jee-main
The number of integral values of m for which the equation has no real root is :
1
infinitely many
2
2
3
3
4
1
14
PYQ 2023
easy
mathematics ID: jee-main
The integral is equal to
1

2

3

4

15
PYQ 2023
hard
mathematics ID: jee-main
If constant, then is equal to_______
16
PYQ 2023
medium
mathematics ID: jee-main
Let If , then is equal to
1
2
3
4
17
PYQ 2023
medium
mathematics ID: jee-main
The value of is :
1
2
3
4
18
PYQ 2023
medium
mathematics ID: jee-main
If , then is equal to

About Integrals Of Some Particular Functions - JEE-MAIN

Integrals Of Some Particular Functions is a vital chapter for JEE-MAIN 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

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Review the topic breakdown to see which sub-topics within Integrals Of Some Particular Functions carry the most weight. Then, tackle the questions iteratively to solidify your understanding.