Pivot Point Calculator
| Result | Classic | Woodie's | Camarilla | Fibonacci | Demark's |
|---|---|---|---|---|---|
| Resistance 4 | - | - | - | - | |
| Resistance 3 | - | - | |||
| Resistance 2 | - | ||||
| Resistance 1 | |||||
| Pivot Point | - | - | |||
| Support 1 | |||||
| Support 2 | - | ||||
| Support 3 | - | - | |||
| Support 4 | - | - | - | - |
Pivot Point Calculator Rules
Classic Pivots
Pivot Point (P) = (High + Low + Close)/3
S1 = P * 2 - High
S2 = P - (High - Low)
S3 = Low - 2(High - P)
R1 = P * 2 - Low
R2 = P + (High - Low)
R3 = High + 2(P - Low)
Woodie's Pivots
R2 = P + (H - L)
R1 = (2 * P) - LOW
P = (HIGH + LOW + (CLOSE * 2)) / 4
S1 = (2 * P) - HIGH
S2 = P - (H - L)
Camarilla Pivots
R4 = ((High - Low) * 1.1) / 2 + Close
R3 = ((High - Low) * 1.1) / 4 + Close
R2 = ((High - Low) * 1.1) / 6 + Close
R1 = ((High - Low) * 1.1) / 12 + Close
S1 = Close - ((High - Low) * 1.1) / 12
S2 = Close - ((High - Low) * 1.1) / 6
S3 = Close - ((High - Low) * 1.1) / 4
S4 = Close - ((High - Low) * 1.1) / 2
Fibonacci Pivots
Pivot Point (P) = (High + Low + Close)/3
Support 1 (S1) = P - (0.382 * (High - Low))
Support 2 (S2) = P - (0.6182 * (High - Low))
Support 3 (S3) = P - (1 * (High - Low))
Resistance 1 (R1) = P + (0.382 * (High - Low))
Resistance 2 (R2) = P + (0.6182 * (High - Low))
Resistance 3 (R3) = P + (1 * (High - Low))
Demark's Pivots
If Close < Open, then X = High + (2 * Low) + Close
If Close > Open, then X = (2 * High) + Low + Close
If Close = Open, then X = High + Low + (2 * Close)
Support 1 (S1) = X/2 - High
Resistance 1 (R1) = X/2 - Low
Option Calculator | Black Scholes model | Option Greeks | NiftyTrader
Option Greeks Option Greeks are option sensitivity measures. The Greek is used in the name because these are denoted by Greek letters. Option price is a function of many variables such as time to maturity, underlying volatility, spot price of underlying asset, strike price and interest rate, option trader needs to know how the changes.
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