Skip to main content

Options cheatsheet

Options Greeks Cheat Sheet

Implied Volatility (IV)

What it is: The market's expectation of how much the stock price will move over the next year, expressed as a percentage.

Value What it means
0–20% Low volatility — stock expected to be calm
20–50% Normal range for most stocks
50–80% High volatility — big moves expected
80%+ Extreme volatility — options are expensive

Your WD put: IV = 93% → Market expects massive swings. Options are pricey.


Delta (Δ)

What it is: How much the option's price moves when the stock moves $1.

Value What it means
0.00 to +1.00 Calls — rises when stock rises
0.00 to −1.00 Puts — falls when stock rises
±0.50 Roughly 50/50 chance of expiring in the money
±0.80–1.00 Deep in the money — moves almost like the stock
±0.01–0.10 Far out of the money — very unlikely to profit

Your WD put: Delta = −0.0805 → For every $1 WD rises, your put loses ~$0.08. For every $1 WD falls, your put gains ~$0.08.


Gamma (Γ)

What it is: How much delta itself changes when the stock moves $1. Think of it as delta's sensitivity.

Value What it means
High (0.05+) Delta changes rapidly — option is very sensitive to price moves
Low (0.001–0.005) Delta barely changes with price moves
Near expiration Gamma spikes dramatically

Your WD put: Gamma = 0.0002 → If WD drops $1, delta moves from −0.0805 to about −0.0807. Very small — you're far out of the money.


Theta (Θ)

What it is: How much value the option loses each day just from time passing, assuming the stock price stays flat. Always negative for buyers.

Value What it means
−0.01 to −0.05 Slow decay — often far from expiration
−0.05 to −0.20 Moderate decay
−0.20+ Fast decay — usually near expiration or high IV

Your WD put: Theta = −0.1049 → You lose ~$10.49 per day (×100 shares per contract) just from time passing. Over 30 days = ~$314 lost to time decay alone.


Vega (ν)

What it is: How much the option's price changes when IV moves 1%.

Value What it means
High (0.50+) Very sensitive to volatility changes
Low (0.01–0.10) Less affected by volatility shifts
Long options You benefit when IV rises
Short options You benefit when IV falls

Example: If your option has a Vega of 0.30 and IV jumps from 93% to 94%, the option gains $0.30 in value (×100 = $30 per contract).


Rho (ρ)

What it is: How much the option's price changes when interest rates move 1%. Usually the least important Greek for short-term traders.

Value What it means
Positive (calls) Rising rates slightly increase call value
Negative (puts) Rising rates slightly decrease put value
Near zero Short-dated options barely affected

Quick Reference: Your WD Put ($300 Strike, Jan 2028)

Greek Your Value Plain English
IV 93% Market expects huge moves — option is expensive
Delta −0.0805 Gains ~$8 per contract for every $1 WD falls
Gamma 0.0002 Delta barely changes — you're far out of the money
Theta −0.1049 Loses ~$10.49/day per contract from time alone
Contract cost $6,200 $62 quote × 100 shares

Key Concepts to Remember

  • One contract = 100 shares. Always multiply the quoted price by 100 to get your actual cost.
  • Out of the money (OTM): The stock price hasn't reached your strike yet. For puts, this means the stock is above your strike price.
  • In the money (ITM): Your option has intrinsic value. For puts, this means the stock is below your strike.
  • Time decay accelerates as expiration approaches — the last 30 days are the fastest decay period.
  • IV crush: After major news events (earnings, etc.), IV often drops sharply, taking option prices with it even if the stock moves in your favour.