1
JEE Advanced 2022 Paper 1 Online
Numerical
+3
-0 Let $$\alpha$$ be a positive real number. Let $$f: \mathbb{R} \rightarrow \mathbb{R}$$ and $$g:(\alpha, \infty) \rightarrow \mathbb{R}$$ be the functions defined by

$$f(x)=\sin \left(\frac{\pi x}{12}\right) \quad \text { and } \quad g(x)=\frac{2 \log _{\mathrm{e}}(\sqrt{x}-\sqrt{\alpha})}{\log _{\mathrm{e}}\left(e^{\sqrt{x}}-e^{\sqrt{\alpha}}\right)} .$$

Then the value of $$\lim \limits_{x \rightarrow \alpha^{+}} f(g(x))$$ is
2
JEE Advanced 2022 Paper 1 Online
Numerical
+3
-0 In a study about a pandemic, data of 900 persons was collected. It was found that

190 persons had symptom of fever,

220 persons had symptom of cough,

220 persons had symptom of breathing problem,

330 persons had symptom of fever or cough or both,

350 persons had symptom of cough or breathing problem or both,

340 persons had symptom of fever or breathing problem or both,

30 persons had all three symptoms (fever, cough and breathing problem).

If a person is chosen randomly from these 900 persons, then the probability that the person has at most one symptom is ____________.
3
JEE Advanced 2022 Paper 1 Online
Numerical
+3
-0 Let $$z$$ be a complex number with a non-zero imaginary part. If

$$\frac{2+3 z+4 z^{2}}{2-3 z+4 z^{2}}$$

is a real number, then the value of $$|z|^{2}$$ is _________.
4
JEE Advanced 2022 Paper 1 Online
Numerical
+3
-0 Let $$\bar{z}$$ denote the complex conjugate of a complex number $$z$$ and let $$i=\sqrt{-1}$$. In the set of complex numbers, the number of distinct roots of the equation

$$\bar{z}-z^{2}=i\left(\bar{z}+z^{2}\right)$$

is _________.
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