Option Greeks, explained for Indian traders

The Greeks measure how an option's price reacts to movement, time, volatility and interest rates. Master them and you stop guessing why a position made or lost money. Each guide below has a plain-English explanation, an original diagram, the formula, a Nifty worked example and an FAQ.

What are the option Greeks? The option Greeks are a set of risk measures showing how an option's price changes with the underlying price (Delta), the rate of that change (Gamma), the passage of time (Theta), implied volatility (Vega) and interest rates (Rho), plus second-order cross-effects (Vanna, Charm, Vomma).

Delta Δ

First-order

Delta measures how much an option's price is expected to change when the underlying moves by ₹1 — and doubles as a rough probability of the option finishing in-the-money.

Sensitivity of option price to a ₹1 move in the underlying

Gamma Γ

Second-order

Gamma measures how fast Delta changes when the underlying moves — it is the acceleration behind an option's directional exposure, and it peaks for at-the-money options close to expiry.

Rate of change of Delta for a ₹1 move in the underlying

Theta Θ

First-order

Theta measures how much value an option loses each day purely from the passage of time — the daily 'rent' an option buyer pays and an option seller collects.

How much an option's value decays with one day's passage of time

Vega ν

First-order

Vega measures how much an option's price changes when implied volatility moves by one percentage point — it is your exposure to the market's expectation of future movement, not to the movement itself.

Sensitivity of option price to a 1% change in implied volatility

Rho ρ

First-order

Rho measures how much an option's price changes when interest rates move by one percentage point — the least influential Greek for short-dated Indian options, but meaningful for long-dated positions.

Sensitivity of option price to a 1% change in interest rates

Vanna

Second-order

Vanna measures how an option's Delta shifts when implied volatility changes — equivalently, how Vega shifts when the underlying moves — a cross-Greek that matters most for skew-sensitive and Delta-hedged positions.

How Delta changes with volatility (and Vega changes with price)

Charm

Second-order

Charm measures how much an option's Delta changes as one day passes — the 'Delta decay' that quietly re-shapes your directional exposure over time, especially near expiry.

How Delta changes with the passage of time (Delta decay)

Vomma

Second-order

Vomma measures how much an option's Vega changes when implied volatility moves — the convexity of your volatility exposure, which makes long-Vega positions gain Vega as volatility rises.

How Vega changes with implied volatility (volatility convexity)

How the Greeks fit together

Think of Delta as speed and Gamma as acceleration; Theta as the clock draining value; Vega as your exposure to the market's fear gauge (India VIX); and Rho as the quiet background rate effect. The second-order Greeks — Vanna, Charm and Vomma — describe how the first-order Greeks themselves shift as volatility and time change. Together they turn options from a black box into a set of measurable, manageable risks.

Frequently asked questions

What are the option Greeks?
The option Greeks are risk measures that describe how an option's price responds to different factors: Delta (price), Gamma (Delta's change), Theta (time), Vega (volatility) and Rho (interest rates), plus second-order Greeks like Vanna, Charm and Vomma.
Which Greeks matter most for Nifty options?
For weekly and monthly Nifty and Bank Nifty options, Delta, Theta and Vega matter most, with Gamma critical near expiry. Rho is usually negligible for these short-dated contracts.
In what order should a beginner learn the Greeks?
Start with Delta, then Theta and Vega, then Gamma. Rho matters only for long-dated positions. Learn the second-order Greeks — Vanna, Charm and Vomma — once the first-order ones are second nature.
Educational content only — not investment advice. Greek values across this site are illustrative and computed from a Black-Scholes model. See our Risk Disclosure.