JEE Main 2026 Important Formulas – Free PDF Download

• Gather study materials before beginning preparations. 

• Make separate notes for the relevant formulas for each subject as you prepare for the exam. 

• These handy notes help with concentrating on the concepts. 

• It helps in exam time management.

• It makes calculation easier.

• Reduces the risk of errors.

Important Formulas of Physics for JEE Mains 2026

The JEE Main Physics section is considered as being a challenging section due to lengthy derivations and various topics. The physics section of the JEE Main 2026 exam covers various topics, including Mechanics, Electricity and Magnetism, Thermodynamics, Optics, and Modern Physics, as per the JEE Main Physics Syllabus 2026. Let us take a look at some important formulas for JEE Main 2026.

Kinematics Formulas:

• Average speed = Total distance/Total time

• Average velocity = Total displacement/Total time

• Acceleration = (Final velocity - Initial velocity) / Time taken

• Final velocity = (Initial velocity + Acceleration) × Time taken

• Displacement = (Initial velocity + Final velocity) / 2 × Time taken

Newton's Laws of Motion:

• $F = m \times a$ (Newton's Second Law of Motion)

• Force of friction $= \mu \times N$ (where $\mu$ is the coefficient of friction and N is the normal force)

• Weight $= m \times g$ (where g is the acceleration due to gravity)

• Impulse = force $\times$ time

• Law of Conservation of Momentum: Momentum before collision = Momentum after collision

Work, Energy, and Power Formulas:

• Work = force $\times$ displacement $\times$ $\cos \theta$

• Kinetic Energy $= 0.5 \times m \times v^2$

• Potential Energy $= m \times g \times h$

• Total Mechanical Energy = Kinetic Energy + Potential Energy

• Power = work done/time taken

Electric Charge and Fields Formulas:

• Electric Field = force per unit charge $= \dfrac{F}{Q}$

• Coulomb's Law: $F = \dfrac{k \times (q_1 \times q_2)}{r^2}$

• Electric Potential Energy $= q \times V$

• Electric Potential $= \dfrac{V}{d}$

Energy of electric dipole: $U = – \rho E$

Energy of a magnetic dipole: $U = – \mu B C$

Electric Charge: $Q = \pm ne$ (where $e = 1.60218 \times 10^{-29} C$), SI unit of Electric Charge is Coulomb ©

Coulomb’s Law: 

Electrostatic Force (F) $= k\left[\dfrac{q_1q_2}{r_2}\right]$ and,

In Vector Form :

$\vec{F} = k(q_1q_2) \times \dfrac{\vec{r}}{r^3}$, 

Where $q_1$ and $q_2$ are Charges on the Particle,

r = Separation between them,

$\vec {r}$ = Position Vector,

$k$ = Constant $= \dfrac{1}{4}\pi \epsilon_0 = 8.98755 \times 10^9Nm^2C^2$

Electric Current :

The current at Time $t : i = \underset{\Delta t \to 0}{lim} \dfrac{\Delta Q}{\Delta t} = \dfrac{dQ}{dT}$

Where $\Delta Q$ and $\Delta T$ = Charges crosses an Area in time $\Delta T$

SI unit of Current is Ampere (A) and 1A = 1 C/s

Average Current Density:

• $\vec{j} = \dfrac{\Delta i}{\Delta s}$

• $j = \underset{\Delta s \to 0}{lim}\dfrac{\Delta i}{\Delta s} = \dfrac{di}{dS}$

• $j = \dfrac{\Delta i}{\Delta S \cos \theta}$

Where, $\Delta S$ = Small Area,

$\Delta i$ = Current through the Area $\Delta S$,

P = Perpendicular to the flow of Charges,

$\theta$ = Angle Between the normal to the Area and the direction of the current.

Kirchhoff’s Law:

• Law of Conservation of Charge: $I_3 = I_1 + I_2$

Resistance:

• Resistivity: $\rho (T) = \rho (T_0)\left[1 + \alpha (T − T_0)\right]$

• $R (T) = R (T_0) \left[1 + \alpha (T−T_0)\right]$

Where, $\rho (T)$ and $\rho (T_0)$ are Resistivity at Temperature $T$ and     $T_0$ respectively,

$\alpha$ = Constant for given material.

Lorentz Force:

$\vec F = q\left[\vec E + (\vec v \times \vec B)\right]$

Where, E = Electric Field,

B = Magnetic Field,

q = Charge of Particle,

v = Velocity of Particle.

Magnetic Flux:

Magnetic Flux through Area $dS = \varphi = \vec{B} \cdot d\vec{S} = B \cdot dS \cos \theta$

Where, $d\vec{S}$ = Perpendicular vector to the surface and has a magnitude equal to are Ds,

$\vec{B}$ = Magnetic Field at an element,

$\theta$ = Angle Between $\vec{B}$ and $d\vec{S}$,

SI unit of Magnetic Flux is Weber (Wb).

Straight Line Equation of Motion (Constant Acceleration):

• $v = u + at$

• $s = ut + \dfrac{1}{2at^2}$

• $2as = v^2 − u^2$

Gravitational Acceleration Equation of Motion:

Motion in Upward Direction:

• $v = u - gt$

• $y = ut − \dfrac{1}{2gt^2}$

• $−2gy = v^2 − u^2$

Motion in Downward Direction:

• $v = u + gt$

• $y = ut + \dfrac{1}{2gt^2}$

• $2gy = v^2 − u^2$

Projectile Equation of Motion:

• Horizontal Range $(R) = \dfrac{u^2 \sin2θ}{g}$

• Time of Flight $(T) = \dfrac {2u \sin \theta}{g}$

• Maximum Height $(H) = \dfrac{u^2 \sin 2\theta}{2}$

Where, u = initial velocity,

v = final velocity,

a = constant acceleration,

t = time,

x = position of particle.

Laws of Gravity

Universal Law of Gravitation:

• Gravitational force $\vec{F} = G\left[\dfrac{Mm}{r^2}\right]^r$

Where, M and m = Mass of two Objects,

r = separation between the objects,

$\cap{r}$ = unit vector joining two objects,

G = Universal Gravitational Constant, $\left[G = 6.67 \times 10^{−11}Nm^2Kg^{-2}\right]$

Work Done by Constant Force:

• Work Done $W = \vec{F} \cdot \vec{S} = |\vec{F}| |\vec{S}| \cos \theta$,

Where, S = Displacement along a straight line,

F = applied force,

$\theta$ = Angle between S & F.

It is a scalar quantity and the Dimension of work is $\left[M^1 L^2 T^{-2}\right]$, SI unit of Work is the joule (J) and $1J = 1N \cdot m = Kgm^2s^{-2}$

Kinetic Friction:

• $f_k = \mu_k \cdot N$

• Maximum Static Friction (Limiting Friction): $f_{\text{max}} = \mu_s \cdot N$,

Where, N = Normal Force,

$\mu_k$ = Coefficient of Kinetic Friction,

$µ_s$ = Coefficient of Static Friction.

Simple Harmonic Motion:

• Force $(F) = – k x$ and $k = \omega^2 m$

Where, k = Force Constant,

m = Mass of the Particle,

x = Displacement and $\omega^2$ = Positive Constant.

Torque: 

The torque or vector moment or moment vector (M) of a force (F) about a point (P) is defined as:

• $M = r \times F$

Where, r is the vector from the point P to any point A on the line of action L of F.

These are few of the key formulas for JEE Main 2026 Physics. To gain confidence and perform well in the exam, it is important to grasp their applications and practise various types of questions based on them.

Important Formulas of Chemistry for JEE Main 2026

Chemistry is considered a simple subject in comparison. Maximum marks can be obtained from this section with proper preparation. Here are some important JEE Main Chemistry Formulas according to the latest JEE Main Chemistry Syllabus 2026.

Ideal Gas Law: $PV = nRT$

Kinetic Energy of Gas Molecules: $KE = \left(\dfrac{3}{2}\right)RT$

$T(K) = T^\circ C + 273.15$

Molarity: $(M) = \dfrac{\text{No. of Moles of Solutes}}{\text{Volume of Solution in Liters}}$

Unit: $\text{mole}/{L}$

Molality: $(m)= \dfrac{\text{No. of Moles of Solutes}}{\text{Mass of solvent in kg}}$

Molecular Mass $= 2 \times$ vapor density

Atomic number = No. of protons in the nucleus = No. of electrons in the nucleus

Mass number = No. of protons + No. of neutrons C $= v \lambda$

Boyle’s Law: $P_1V_1 = P_2V_2$  (at constant T and n)

Charles’s Law: $\dfrac{V_1}{T_1} = \dfrac{V_2}{T_2}$ (at constant P and n)

Avogadro's Law: $\dfrac{V}{n}$ = constant, where V is the volume and n is the number of moles.

Dalton's Law of Partial Pressures: $P(\text{total}) = P_1 + P_2 + P_3 + …$, where P(total) is the total pressure and $P_1, P_2, P_3$ etc. are the partial pressures of individual gases in the mixture.

Enthalpy: $H = U + pV$

First Law of Thermodynamics: $\Delta U = q + W$

Ohm’s Law: $V = RI$

Faraday’s Laws:

• Faraday’s First Law of Electrolysis:

$M = Zit$

Z = Atomic Mass / n $\times$ F

• Faraday’s Second Law of Electrolysis:

$\dfrac{M_1}{M_2} = \dfrac{E_1}{E_2}$

Freundlich Adsorption Isotherm: $\left[\dfrac{x}{m}\right] - Kp^{\left(\dfrac{1}{n}\right)}; n \geq 1$

Henry's Law: $S = kH \times P$,

Where S is the solubility of a gas in a liquid, P is the partial pressure of the gas above the liquid, and kH is the Henry's law constant.

Nernst Equation: $E = E^\circ - \left(\dfrac{RT}{nF}\right)lnQ$,

Where E is the cell potential, $E^\circ$ is the standard cell potential, R is the gas constant, T is the temperature, n is the number of electrons transferred, F is the Faraday constant, and Q is the reaction quotient.

Henderson-Hasselbalch Equation: $pH = pKa + log\left(\dfrac{[A^{-}]}{[HA]}\right)$

Where pH is the negative logarithm of the hydrogen ion concentration, pKa is the acid dissociation constant, $[A^{-}]$ is the concentration of the conjugate base, and $[HA]$ is the concentration of the acid.

Beer-Lambert Law: $A = \epsilon bc$

Where A is the absorbance, $\epsilon$ is the molar absorptivity, b is the path length, and c is the concentration.

Important Formulas of Mathematics for JEE Mains 2026

If you focus well on your board exams, you will breeze through your Mathematics course. Formulas are extremely important in the preparation of the mathematics portion. Below are a few of the Maths Formulas for JEE Mains to help you prepare for your exams according to the JEE Main Maths Syllabus 2026

Complex Number:

• General form of Complex numbers: $x + i$, where ‘x’ is Real part and ‘i’ is an Imaginary part.

• Sum of nth root of unity = zero

• Product of nth root of unity $= (–1)n–1$

• Cube roots of unity: $1, \omega, \omega^2$

• $|z_1 + z_2| \leq |z_1|+|z_2|; |z_1 + z_2| \geq |z_1| - |z_2|; |z_1 - z_2| \geq |z_1| - |z_2|$

• If three complex numbers $z_1, z_2, z_3$ are collinear then,

• $\begin{vmatrix} z_1& \bar{z_1} & 1 \\ z_2  & \bar{z_2} & 1 \\ z_3 & \bar{z_3} & 1 \end{vmatrix} = 0$

• If $\arg \cos\alpha = \arg \sin\alpha = 0, \arg \cos 2\alpha = \arg \sin 2\alpha = 0$,

• $\arg \cos 2n\alpha = \arg \sin 2n\alpha = 0$

• $\arg \cos 2\alpha = \arg \sin 2\alpha = \dfrac{3}{2}$

• $\arg \cos 3\alpha = 3 \cos (\alpha + \beta + \gamma)$

• $\arg \sin 3\alpha = 3\sin (\alpha + \beta + \gamma)$

• $\arg \cos (2\alpha – \beta – \gamma) = 3$

• $\arg \sin (2\alpha – \beta – \gamma) = 0$

• $a^3 + b^3 + c^3 – 3abc = (a + b + c) (a + b\omega + c\omega^2) (a + b\omega^2 + c\omega)$

Quadratic Equation:

• Standard form of Quadratic equation: $ax^2 + bx + c = 0$

• General equation: $x = \dfrac{-b \pm \sqrt{(b^2 - 4ac)}}{2a}$

• Sum of roots $= -\dfrac{b}{a}$

• Product of roots discriminate $= b^2 – 4ac$

• If $\alpha, \beta$ are roots then Quadratic equation is $x^2 – x(\alpha + \beta) + \alpha \beta = 0$

• Number of terms in the expansion: $(x+a)^n$ is $n+1$

• Any three non coplanar vectors are linearly independent

• A system of vectors $\bar{a_1}, \bar{a_2},….\bar{a_n}$ are said to be linearly dependent, If there exist, $x_1\bar{a_1} + x_2\bar{a_2} + …. + x_na_n=0$ at least one of $x_i \neq 0$, where $i = 1, 2, 3….n$ and determinant $= 0$

• a, b, c are coplanar then $\left[abc\right]=0$

• If i, j, k are unit vectors then $\left[i j k\right] = 1$

• If a, b, c are vectors then $\left[a+b, b+c, c+a\right] = 2\left[abc\right]$

• $(1 + x)^{n – 1}$ is divisible by $x$ and $(1 + x)^n – nx –1$ is divisible by $x^2$

• If ${}^{n}C_{r} - 1, {}^{n}C_{r}, {}^{n}C_{r}+1$ are in A.P, then $(n–2r)^2 = n + 2$

Trigonometric Identities:

• $\sin^2(x) + \cos^2(x) = 1$

• $1 + \tan^2(x) = \sec^2(x)$

• $1 + \cot^2(x) = \text{cosec}^2(x)$

Limits:

• Limit of a constant function: $\lim c = c$

• Limit of a sum or difference: $\lim (f(x) \pm g(x)) = \lim f(x) \pm \lim g(x)$

• Limit of a product: $\lim (f(x)g(x)) = \lim f(x) \times \lim g(x)$

• Limit of a quotient: $\lim \left(\dfrac{f(x)}{g(x)}\right) = \dfrac{\lim f(x)}{\lim g(x)}$ if $\lim g(x) \neq 0$

Derivatives:

• Power Rule: $\dfrac{d}{dx}(x^n) = nx^{(n-1)}$

• Sum/Difference Rule: $\dfrac{d}{dx}\left(f(x) \pm g(x)\right) = f'(x) \pm g'(x)$

• Product Rule: $\dfrac{d}{dx}\left(f(x)g(x)\right) = f'(x)g(x) + f(x)g'(x)$

• Quotient Rule: $\dfrac{d}{dx}\left(\dfrac{f(x)}{g(x)}\right) = \dfrac{\left[g(x)f'(x) - f(x)g'(x)\right]}{g^2(x)}$

Integration:

• $\int{x^n }dx = \dfrac{x^{n+1}}{n+1} + c$ where $n \neq -1$

• $\int \dfrac{1}{x} dx = \log_{e}\left | x \right | + c$

• $\int e^x dx = e^x + c$

• $\int a^x dx = \dfrac{a^{x}}{\log_{e}a} + c$

• $\int \sin x dx = - \cos x + c$

• $\int \cos x dx = \sin x + c$

• $\int \sec^2x dx = \tan x + c$

• $\int \text{cosec}^2x dx = - \cot x + c$

• $\int \sec x tan x dx = \sec x + c$

• $\int \text{cosec }x \cot x dx = –{cosec }x + c$

• $\int \cot x dx = \log |\sin x|+c$

• $\int \tan x dx = -\log ∣\cos x∣ + c$

• $\int \sec x dx = log ∣\sec x + \tan x∣ + c$

• $\int \text{cosec }x dx = log ∣\text{cosec }x – \cot x∣ + c$

• $\int \dfrac{1}{\sqrt{a^{2} - x^{2}}} dx = \sin^{-1} \left(\dfrac{x}{a}\right) + c$

• $\int - \dfrac{1}{\sqrt{a^{2} - x^{2}}} dx = \cos^{-1} \left(\dfrac{x}{a}\right) + c$

• $\int \dfrac{1}{{a^{2} + x^{2}}} dx = \dfrac{1}{a} \tan^{-1} \left(\dfrac{x}{a}\right) + c$

• $\int - \dfrac{1}{{a^{2} + x^{2}}} dx = \dfrac{1}{a} \cot^{-1} \left(\dfrac{x}{a}\right) + c$

• $\int \dfrac{1}{x\sqrt{x^{2} - a^{2}}} dx = \dfrac{1}{a} \sec^{-1} \left(\dfrac{x}{a}\right) + c$

• $\int - \dfrac{1}{x\sqrt{x^{2} - a^{2}}} dx = \dfrac{1}{a} \text{cosec}^{-1} \left(\dfrac{x}{a}\right) + c$

Tricks to Remember Formulas for JEE Main 2026

• Draw simple diagrams, flowcharts, or mind maps to connect related formulas. Visual cues help you recall complex concepts faster.

• Understand the idea behind each formula instead of memorising it blindly. When you know the logic, remembering becomes easier.

• Use the formulas while solving different types of questions. Frequent practice makes them stick naturally in your memory.

• Split long or complex formulas into smaller parts and learn each part step-by-step.

• Create fun phrases or short stories to link formulas with keywords, especially useful for Chemistry.

• Explaining a formula aloud or teaching a friend strengthens your understanding.

• Spend a few minutes every day revising all the formulas you’ve studied. Consistent review improves long-term memory.

• Arrange formulas by topics like mechanics, calculus, or thermodynamics to revise them more efficiently.

• Vedantu’s JEE Main formula sheets collect all key formulas in one place, making revision faster and more organised.

Benefits of Vedantu Resources for JEE Main 2026

Vedantu provides everything a JEE aspirant needs - live classes, structured study material, personalised doubt-solving, and expert guidance. Students get access to:

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These resources help you revise smarter, strengthen your concepts, and improve your exam performance with confidence.

Conclusion

Preparing for JEE Main 2026 becomes much easier when you follow a planned approach, revise formulas regularly, and stay updated with the latest exam pattern. Using structured formula sheets, solving mock tests, and strengthening concepts through consistent practice will help you improve both speed and accuracy. Stay focused, stay confident, and rely on the right study resources- every bit of effort you put in now will bring you closer to achieving your JEE Main goals.

Important Study Materials Links for JEE Exams 2026

JEE Exams 2026, having the right study materials is crucial for success. The JEE Main and Advanced exams require a strong grasp of Physics, Chemistry, and Mathematics, as well as thorough practice with exam-style questions.

Access to quality resources, including sample papers, practice tests, and detailed notes, helps students review key topics and practice effectively.