Question

Match the following:

List I		List II
A	Let $P(x)$ be a cubic polynomial with zeroes $\alpha ,\beta ,\gamma$, if $\frac{P\left(\frac{1}{2}\right)+P\left(-\frac{1}{2}\right)}{P(0)}=100\text{ then }\sqrt{\frac{1}{\alpha \beta }+\frac{1}{\beta \gamma }+\frac{1}{\gamma \alpha }}=$	1	14
B	The root of the equation $x^2+2(a-3)x+9=0$ lie between -6 and 1 and $2,h_1$, $h_2,\dots ..h_{20},[a]$ are in H.P. and $2,a_1,a_2,\dots .a_{20}$, [a] are in A.P. where [a] denotes the integral part of $a$, then $a_3{h}_{18}$ is equal to	2	6
C	If the sum of all possible values of $x\in (0,2\pi )$ satisfying the equation 2 $\cos x\mathrm{cosec}x-4\cos x-\mathrm{cosec}x=-2$ is equal to $k\pi /2(k\in N)$, then the value of $k$ is	3	2
D	If $P\left(t^2,2t\right),t\in [0,2]$ is an arbitrary point on parabola $y^2=4x$. $Q$ is foot of perpendicular from focus $S$ on the tangent at $P$, then maximum area of triangle	4	5

• A. P= 1 ,Q= 3 ,R= 2 ,S= 4
• B. P=2 ,Q= 4 ,R=3 ,S=1
• C. P=3 ,Q= 1 ,R=4 ,S=2
• D. P=4 ,Q= 2,R= 1,S= 3

Answer 1

Answer: (A)

Correct answer is (a) P= 1 ,Q= 3 ,R= 2 ,S= 4