Is there a simple formula where you take IV index for a specific asset and derive that number from it. Thanks for any responses.
I dunno abt other assets, but people in my neck of the woods use a notion of "daily breakeven", which is just the annual vol divided by sqrt(252).
I didn't get that, what annual vol ? Does that mean I should take the iv index for options one year out from now and divide it by sqrt(252) to get the ''daily breakeven'' for that stock.
What about options with one month till expiration. Is it the same way , IV index for that specific month divided by 16 to get the market perception for a single day move.
IV for that month divided by sqrt(21 -number of trading days) , so that would be divided by like 4.5.
1) ?..... you're describing "sigma", the average daily expected price range, i.e. implied volatility times price divided by the square root of 256. For simplicity sake, 256 is used for the number of market days. The square root of 256 equals 16. 2) For a "simplified" calculation for crude oil futures, sigma would be (16%) times ($100/barrel) divide by 16 equals $1.00/barrel expected fluctuation for the day's range. 3) You need to exercise some "caution" when the market falls short of or greatly exceeds the "number". :eek:
I crudely use a .16 vol as representing about a 1% move on average per day. So a stock with a .32 IVOL on the ATM options is expected to move around 2%/day. 1245
What happens then ? Say the market exceeds the expected move, IV is revised on the upside and which option strike should gain most in price(not IV)?. I would say the ATM because of their highest vega exposure