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.
Also, Check:
Trading and Investment Terminology
in App