JEE Advanced 2021 Paper 2 Online | JEE Advanced Year Wise Previous Years Questions

JEE Advanced 2021 Paper 2 Online

Numerical

-0

Ozonolysis of ClO₂ produces an oxide of chlorine. The average oxidation state of chlorine in this oxide is __________.

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JEE Advanced 2021 Paper 2 Online

MCQ (More than One Correct Answer)

-2

Let

$${S_1} = \left\{ {(i,j,k):i,j,k \in \{ 1,2,....,10\} } \right\}$$,

$${S_2} = \left\{ {(i,j):1 \le i < j + 2 \le 10,i,j \in \{ 1,2,...,10\} } \right\}$$,

$${S_3} = \left\{ {(i,j,k,l):1 \le i < j < k < l,i,j,k,l \in \{ 1,2,...,10\} } \right\}$$ and

$${S_4} = \{ (i,j,k,l):i,j,k$$ and $$l$$ are distinct elements in {1, 2, ...., 10}.

If the total number of elements in the set S_r is n_r, r = 1, 2, 3, 4, then which of the following statements is(are) TRUE?

n₁ = 1000

n₂ = 44

n₃ = 220

$${{{n_4}} \over {12}} = 420$$

JEE Advanced 2021 Paper 2 Online

MCQ (More than One Correct Answer)

-2

Consider a triangle PQR having sides of lengths p, q and r opposite to the angles P, Q and R, respectively. Then which of the following statements is (are) TRUE?

$$\cos P \ge 1 - {{{p^2}} \over {2qr}}$$

$$\cos R \ge \left( {{{q - r} \over {p + q}}} \right)\cos P + \left( {{{p - r} \over {p + q}}} \right)\cos Q$$

$${{q + r} \over p} < 2{{\sqrt {\sin q\sin R} } \over {\sin P}}$$

If p < q and p < r, then $$\cos Q > {p \over r}$$ and $$\cos R > {p \over q}$$

JEE Advanced 2021 Paper 2 Online

MCQ (More than One Correct Answer)

-2

Let $$f:\left[ { - {\pi \over 2},{\pi \over 2}} \right] \to R$$ be a continuous function such that $$f(0) = 1$$ and $$\int_0^{{\pi \over 3}} {f(t)dt = 0} $$. Then which of the following statements is(are) TRUE?

The equation $$f(x) - 3\cos 3x = 0$$ has at least one solution in $$\left( {0,{\pi \over 3}} \right)$$

The equation $$f(x) - 3\sin 3x = - {6 \over \pi }$$ has at least one solution in $$\left( {0,{\pi \over 3}} \right)$$

$$\mathop {\lim }\limits_{x \to 0} {{x\int_0^x {f(t)dt} } \over {1 - {e^{{x^2}}}}} = - 1$$

$$\mathop {\lim }\limits_{x \to 0} {{\sin x\int_0^x {f(t)dt} } \over {{x^2}}} = - 1$$

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