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JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced PDF Download

[JEE Main MCQs]

Q1: The integral JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced is equal to : (where C is a constant of integration)
(a) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(b) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(c) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(d) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
Ans:
(c)
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q2: The integralJEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanceddx is equal to (where c is a constant of integration)
(a) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(b) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(c) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(d) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
Ans:
(a)
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q3: The integralJEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advancedis equal to : (where c is a constant of integration)
(a) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(b) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(c) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(d) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
Ans:
(b)
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
Here C is integral constant.

Q4: The value of the integral
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(a) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(b) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(c) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
(d) JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
Ans: 
(c)
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q5: If JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advancedwhere c is a constant of integration, then the ordered pair (a, b) is equal to :
(a) (-1, 3)
(b) (1, 3)
(c) (1, -3)
(d) (3, 1)
Ans:
(b)
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
put sin x + cos x = t
⇒ (cos x – sin x) dx = dt
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
∴ a = 1 and b = 3

[JEE Main Numericals]

Q6: If JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advancedαloge|1 + tan x| + βloge|1-tanx +tan2x|+ γtan-1JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced+ C when C is constant of integration, then the value of l8(α + β  + γ2) is ___.
Ans:
3
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q7: If JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced (ux + v loge(4ex + 7e–x))+ C, where C is a constant of integration, then u + v is equal to __________.
Ans:
7
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
⇒ u + v = 7

Q8: If JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced+ C , x > 0 where C is the constant of integration, then the value of 9 (√3a + b) is equal to _____________.
Ans:
15
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q9: If JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advancedand f(1) = 1/K , then the value of K is
Ans: 
4
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

Q10: For real numbers α, β, γ and δ, if
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
where C is an arbitrary constant, then the value of 10 (α + βγ + δ) 10  is equal to __________.
Ans:
6
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced
JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced

The document JEE Main Previous Year Questions (2021): Indefinite Integral | Chapter-wise Tests for JEE Main & Advanced is a part of the JEE Course Chapter-wise Tests for JEE Main & Advanced.
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FAQs on JEE Main Previous Year Questions (2021): Indefinite Integral - Chapter-wise Tests for JEE Main & Advanced

1. What is the concept of indefinite integral in JEE Main?
Ans. The concept of indefinite integral in JEE Main refers to finding the antiderivative of a function. It involves finding a function whose derivative is equal to the given function, up to a constant term. It is denoted by ∫f(x)dx and represents a family of functions.
2. How is the definite integral different from the indefinite integral in JEE Main?
Ans. The definite integral in JEE Main involves finding the area under the curve of a function between two given limits. It is denoted by ∫[a, b]f(x)dx. On the other hand, the indefinite integral is used to find the antiderivative of a function without any specific limits of integration.
3. How can I solve indefinite integral problems in JEE Main?
Ans. To solve indefinite integral problems in JEE Main, you can follow these steps: 1. Identify the given function and determine if it is a standard function or requires any special techniques. 2. Apply the rules of integration, such as the power rule, product rule, quotient rule, etc., to find the antiderivative. 3. Don't forget to add the constant of integration (C) at the end of the solution. 4. Simplify the expression if possible.
4. What are some common techniques used to solve indefinite integrals in JEE Main?
Ans. Some common techniques used to solve indefinite integrals in JEE Main include: 1. Power rule: Used for integrating functions of the form x^n, where n is any real number except -1. 2. Substitution method: Involves substituting a variable with a new variable to simplify the integral. 3. Integration by parts: Applies the product rule of differentiation in reverse to find the integral. 4. Trigonometric identities: Used to simplify integrals involving trigonometric functions. 5. Partial fractions: Used to decompose a rational function into simpler fractions for integration.
5. Can I use a calculator to solve indefinite integrals in JEE Main?
Ans. No, the use of calculators is not allowed in JEE Main examination. You are expected to solve indefinite integrals manually using the given techniques and rules of integration. It is important to practice solving problems without relying on calculators to effectively prepare for the exam.
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