List of top Questions asked in JEE Main- 2026

Pre-exponential factors of two different reactions of same order are identical. Let activation energy of first reaction exceed the activation energy of second reaction by 20 kJ mol$^{-1}$. If $k_1$ and $k_2$ are the rate constants of first and second reaction respectively at 300 K, then $\ln \frac{k_{2}}{k_{1}}$ will be___. (nearest integer) [$R=8.3 \text{ J K}^{-1} \text{ mol}^{-1}$]

One mole each of $A_2(g)$ and $B_2(g)$ are taken in a 1 L closed flask and allowed to establish the equilibrium at 500 K: $A_{2}(g)+B_{2}(g) \rightleftharpoons 2AB(g)$. The value of x (missing enthalpy of $B_2$ or related parameter) is ______ . (Nearest integer)}

Consider the reactions: 1. $NaCl+K_{2}Cr_{2}O_{7}+H_{2}SO_{4} \rightarrow A + ...$ 2. $A + NaOH \rightarrow B + ...$ 3. $B + H_{2}SO_{4}+H_{2}O_{2} \rightarrow C + ...$ In the product 'C', X is the number of $O_{2}^{2-}$ units, Y is the total number of oxygen atoms, and Z is the oxidation state of Cr. The value of $X+Y+Z$ is__.

The pH and conductance of a weak acid (HX) was found to be 5 and $4\times10^{-5}$ S, respectively. The conductance was measured under standard condition using a cell where the electrode plates having a surface area of 1 cm$^2$ were at a distance of 15 cm apart. The value of the limiting molar conductivity ($\Lambda_m^\circ$) is___ S cm$^2$ mol$^{-1}$ (nearest integer) (Given: degree of dissociation $\alpha \ll 1$)

Find the volume flow rate in the venturi meter given below in which water is flowing.

Find the concentration of $ \mathrm{X^{2-}} $ at equilibrium in $0.1\,\mathrm{M}$ $ \mathrm{H_2X} $. Given: \[ K_{a1} = 2.5 \times 10^{-7}, \qquad K_{a2} = 1 \times 10^{-13} \]

A rectangle is formed by the lines $ x = 0,\ y = 0,\ x = 3,\ y = 4 $. A line perpendicular to $ 3x + 4y + 6 = 0 $ divides the rectangle into two equal parts. Then the distance of the line from the point $ \left(-1,\frac{3}{2}\right) $ is:

The value of \[ \frac{{}^{100}C_{50}}{51} + \frac{{}^{100}C_{51}}{52} + \cdots + \frac{{}^{100}C_{100}}{101} \] is:

If $S=\{1,2,....,50\}$, two numbers $\alpha$ and $\beta$ are selected at random find the probability that product is divisible by 3 :

In the following configuration of charges. Find the net dipole moment of the system :

Find the number of matrices $A$ of order $3\times 2$ whose elements are from the set $\{\pm2,\pm1,0\}$, if $\mathrm{Tr}(A^TA)=5$.

An experiment is performed for comparing EMF of two cells using a potentiometer. For 1st cell, balancing length was achieved at 200 cm and for 2nd cell it was 150 cm. If least count of measurement of length of potentiometer wire is 1cm, the percentage error in the ratio of emf of two cells is :

A complex number 'z' satisfy both $|z-6|=5$ & $|z+2-6i|=5$ simultaneously. Find the value of $z^3 + 3z^2 - 15z + 141$.

$1\,\text{g}$ of $ \mathrm{AB_2} $ is dissolved in $50\,\text{g}$ of a solvent such that $ \Delta T_f = 0.689\,\text{K} $. When $1\,\text{g}$ of $ \mathrm{AB} $ is dissolved in $50\,\text{g}$ of the same solvent, $ \Delta T_f = 1.176\,\text{K} $. Find the molar mass of $ \mathrm{AB_2} $. Given $ K_f = 5\,\text{K kg mol}^{-1} $. $(\textit{Report to nearest integer.})$ Both $ \mathrm{AB_2} $ and $ \mathrm{AB} $ are non-electrolytes.

For the given set of measurements, find the relative error. \[ 20.00,\ 19.75,\ 18.25,\ 17.01 \]

If $ A = \{1,2,3,4,5,6\} $ and $ B = \{1,2,3,\ldots,9\} $, then the number of strictly increasing functions $ f : A \to B $ such that $ f(i) \neq i $ for all $ i = 1,2,3,4,5,6 $ is:

A conducting rod of mass $ m $ and length $ l $ is moving on an infinite pair of conducting rails as shown. Conducting rails are connected to a resistance $ R $ at one end. Motion is in the vertical plane and horizontal magnetic field in the region is $ B $. Find the terminal speed of the rod.