Category Archives: JEE Main
JEE Main 2018 Pulley Problem
JEE Main 2018 Circular Motion Potential Problem
A particle is moving in a circular path of radius a under the action of an attractive potential $U=-\frac {k}{2r^2}$. Its total energy is:
(1) $-\frac {k}{4a^2}$
(2) $\frac {k}{2a^2}$
(3) Zero
(4) $-\frac {3}{2} \frac {k}{a^2}$
[Based on JEE Main 2018]
Solution
Let the mass of the particle be m,
$P.E.=mU=-\frac {1}{2} \frac {mk}{r^2}$
$T.M.E.=\frac {1}{2} mv^2 +\left(-\frac {1}{2} \frac {mk}{r^2}\right)$
Where v is the speed of the particle.
$T.M.E.=\frac {1}{2} m \left(v^2 – \frac {k}{r^2}\right)$
$F=- \frac {d}{dr} \left(-\frac {1}{2} \frac {mk}{r^2}\right)=-\frac {mk}{r^3}$
Since F provides centripetal force,
$\left| { – \frac{{mk}}{{{r^3}}}} \right| = \frac{{m{v^2}}}{r},\therefore \frac{k}{{{r^2}}} = {v^2}$
Hence, T.M.E. = 0
Hence, Option (3).
JEE Main 2015 Adiabatic Expansion Mean Free Path Problem
Tangents to Curve $$y = \int\limits_0^x {|t|dt}$$
The intercepts on x-axis made by tangents to the curve, 
, which are parallel to the line y = 2x, are equal to:
(1) 
(2) 
(3) 
(4) 
[JEE Main 2013]
Continue reading Tangents to Curve $$y = \int\limits_0^x {|t|dt}$$
Parallel Circular Loops Magnetic Flux
A circular loop of radius 0.3 cm lies parallel to a much bigger circular loop of radius 20 cm. The centre of the small loop is on the axis of the bigger loop. The distance between their centres is 15 cm. If a current of 2.0 A flows through the smaller loop, then the flux linked with bigger loop is:
(1) 9.1 x 10-11 weber (2) 6 x 10-11 weber (3) 3.3 x 10-11 weber (4) 6.6 x 10-9 weber
[JEE Main 2013]
\(xMnO_4^ – + y{C_2}O_4^{2 – } + z{H^ + } \to xM{n^{2 + }} + 2yC{O_2} + \frac{z}{2}{H_2}O\)
Consider the following reaction:
The values of x, y and z in the reaction are, respectively:
(1) 5, 2 and 16 (2) 2, 5 and 8 (3) 2, 5 and 16 (4) 5, 2 and 8
[JEE Main 2013]