Test Series

Take Zigya Full and Sectional Test Series. Time it out for real assessment and get your results instantly.

Test Yourself

Practice and master your preparation for a specific topic or chapter. Check you scores at the end of the test.

JEE Mathematics Solved Question Paper 2004

Multiple Choice Questions

If y = 2^x . 3^{2x - 1}, then $\frac{d^{2} y}{{dx}^{2}}$ is equal to :

$(\log (2)) (\log (3))$
$(\log (18))$
$(\log {(18)}^{2}) y^{2}$
$(\log (18)) y$

2.
If the volume of a sphere is increasing at a constant rate, then the rate at which its radius is increasing, is

a constant

proportional to the radius

inversely proportional to the radius

inversely proportional to the surface area

inversely proportional to the surface area

$Given that, \frac{dV}{dt} = k ∵ V = \frac{4}{3} {πR}^{3} On differentiating w . r . t . t, we get \frac{dV}{dt} = 4 {πR}^{2} \frac{dR}{dt} \Rightarrow \frac{dR}{dt} = \frac{k}{4 {πR}^{2}} [∵ from Eq . (i)]$

Thus, Rate of increasing radius is inversely proportional to its surface area.

The length of the subtangent to the curve x² + xy + y² = 7 at (1, - 3) is :

3
5
$\frac{3}{5}$
15

If y = x + x² + x³ + ... to $\infty$ where $|x| < 1$ , then for $|y| < 1$ , $\frac{dx}{dy}$ is equal to :

y + y² + y³ + ... to $\infty$
1 - y + y² - y³ + ... to $\infty$
1 - 2y + 3y²- ... to $\infty$
1 + 2y + 3y² + ... to $\infty$

Twenty two metres are available to fence a flower bed in the form of a circular sector. If the flower bed should have the greatest possible surface area, the radius of the circle must be :

If $y = \sqrt{\sin (x) + \sqrt{\sin (x) + \sqrt{\sin (x) + . . . \infty}}}$ , then $\frac{dy}{dx}$ is equal to :

$\frac{\cos (x)}{2 y - 1}$
$\frac{- \cos (x)}{2 y - 1}$
$\frac{\sin (x)}{1 - 2 y}$
$\frac{- \sin (x)}{1 - 2 y}$

Given f(0) = 0 and f(x) = $\frac{1}{(1 - e^{- \frac{1}{x}})}$ for $x \neq 0$ . Then only one of the following statements on f (x) is true. That is f(x), is :