JEE Advanced 2015 Paper 2 Offline | Definite Integration Question 25 | Mathematics

The option(s) with the values of a and $$L$$ that satisfy the following equation is (are) $$${{\int\limits_0^{4\pi } {{e^t}\left( {{{\sin }^6}at + {{\cos }^4}at} \right)dt} } \over {\int\limits_0^\pi {{e^t}\left( {{{\sin }^6}at + {{\cos }^4}at} \right)dt} }} = L?$$$

$$a = 2,L = {{{e^{4\pi }} - 1} \over {{e^\pi } - 1}}$$

$$a = 2,L = {{{e^{4\pi }} + 1} \over {{e^\pi } + 1}}$$

$$a = 4,L = {{{e^{4\pi }} - 1} \over {{e^\pi } - 1}}$$

$$a = 4,L = {{{e^{4\pi }} + 1} \over {{e^\pi } + 1}}$$

JEE Advanced 2014 Paper 1 Offline

MCQ (More than One Correct Answer)

-0

Let $$f:\left( {0,\infty } \right) \to R$$ be given by $$f\left( x \right) $$= $$\int\limits_{{1 \over x}}^x {{{{e^{ - \left( {t + {1 \over t}} \right)}}} \over t}} dt$$. Then

$$f(x)$$ is monotonically increasing on $$\left[ {1,\infty } \right)$$

$$f(x)$$ is monotonically decreasing on $$(0,1)$$

$$f(x)$$ $$ + f\left( {{1 \over x}} \right) = 0$$, for all $$x \in \left( {0,\infty } \right)$$

$$f\left( {{2^x}} \right)$$ is an odd function of $$x$$ on $$R$$

JEE Advanced 2014 Paper 1 Offline

MCQ (More than One Correct Answer)

-0

Let a $$\in$$ R and f : R $$\to$$ R be given by f(x) = x⁵ $$-$$ 5x + a. Then,

f(x) has three real roots , if a > 4

f(x) has only one real root, if a > 4

f(x) has three real roots, if a < $$-$$4

f(x) has three real roots, if $$-$$4 < a < 4

IIT-JEE 2009 Paper 2 Offline

MCQ (More than One Correct Answer)

-2

If $${I_n} = \int\limits_{ - \pi }^\pi {{{\sin nx} \over {(1 + {\pi ^x})\sin x}}dx,n = 0,1,2,} $$ .... then

$${I_n} = {I_{n + 2}}$$

$$\sum\limits_{m = 1}^{10} {{I_{2m + 1}}} = 10\pi $$

$$\sum\limits_{m = 1}^{10} {{I_{2m}}} = 0$$

$${I_n} = {I_{n + 1}}$$

Questions Asked from MCQ (Multiple Correct Answer)

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