JEE Main 2021 (Online) 26th August Morning Shift | Definite Integration Question 142 | Mathematics

Let f : (a, b) $$\to$$ R be twice differentiable function such that $$f(x) = \int_a^x {g(t)dt} $$ for a differentiable function g(x). If f(x) = 0 has exactly five distinct roots in (a, b), then g(x)g'(x) = 0 has at least :

twelve roots in (a, b)

five roots in (a, b)

seven roots in (a, b)

three roots in (a, b)

JEE Main 2021 (Online) 27th July Morning Shift

MCQ (Single Correct Answer)

-1

Out of Syllabus

The value of $$\mathop {\lim }\limits_{n \to \infty } {1 \over n}\sum\limits_{j = 1}^n {{{(2j - 1) + 8n} \over {(2j - 1) + 4n}}} $$ is equal to :

$$5 + {\log _e}\left( {{3 \over 2}} \right)$$

$$2 - {\log _e}\left( {{2 \over 3}} \right)$$

$$3 + 2{\log _e}\left( {{2 \over 3}} \right)$$

$$1 + 2{\log _e}\left( {{3 \over 2}} \right)$$

JEE Main 2021 (Online) 27th July Morning Shift

MCQ (Single Correct Answer)

-1

The value of the definite integral

$$\int\limits_{ - {\pi \over 4}}^{{\pi \over 4}} {{{dx} \over {(1 + {e^{x\cos x}})({{\sin }^4}x + {{\cos }^4}x)}}} $$ is equal to :

$$ - {\pi \over 2}$$

$${\pi \over {2\sqrt 2 }}$$

$$ - {\pi \over 4}$$

$${\pi \over {\sqrt 2 }}$$

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