Options pricing ( calculation of option premium)

Option Value: Bounds
UPPER AND LOWER BOUNDS
FOR THE VALUE OF CALL OPTION
VALUE OF UPPER LOWER
CALL OPTION BOUND (S0) BOUND ( S0 – E)
STOCK PRICE
0 E

Factors Determining The Option Value
• EXERCISE PRICE
• EXPIRATION DATE
• STOCK PRICE
• STOCK PRICE VARIABILITY
• INTEREST RATE
C0 = f [S0 , E, 2, t , rf ]
+ - + + +

Binomial Model
Option Equivalent Method - 1
A SINGLE PERIOD BINOMIAL (OR 2 - STATE) MODEL
• S CAN TAKE TWO POSSIBLE VALUES NEXT YEAR, uS OR
dS (uS > dS)
• B CAN BE BORROWED .. OR LENT AT A RATE OF r, THE
RISK-FREE RATE .. (1 + r) = R
• d < R > u
• E IS THE EXERCISE PRICE
Cu = MAX (u S - E, 0)
Cd = MAX (dS - E, 0)

Binomial Model
Option Equivalent Method - 1
PORTFOLIO
 SHARES OF THE STOCK AND B RUPEES OF BORROWING
STOCK PRICE RISES :  uS - RB = Cu
STOCK PRICE FALLS :  dS - RB = Cd
Cu - Cd SPREAD OF POSSIBLE OPTION PRICE
 = =
S (u - d) SPREAD OF POSSIBLE SHARE PRICES
dCu - uCd
B =
(u - d) R
SINCE THE PORTFOLIO (CONSISTING OF  SHARES AND B
DEBT) HAS THE SAME PAYOFFAS THAT OFA CALL OPTION,
THE VALUE OF THE CALL OPTION IS
C =  S - B

Illustration
S = 200, u = 1.4, d = 0.9
E = 220, r = 0.10, R = 1.10
Cu = MAX (u S - E, 0) = MAX (280 - 220, 0) = 60
Cd = MAX (dS - E, 0) = MAX (180 - 220, 0) = 0
Cu - Cd 60
 = = = 0.6
(u - d) S 0.5 (200)
dCu - uCd 0.9 (60)
B = = = 98.18
(u - d) R 0.5 (1.10)
0.6 OF A SHARE + 98.18 BORROWING … 98.18 (1.10) = 108 REPAYT
PORTFOLIO CALL OPTION
WHEN u OCCURS 1.4 x 200 x 0.6 - 108 = 60 Cu = 60
WHEN d OCCURS 0.9 x 200 x 0.6 - 108 = 0 Cd = 0
C =  S - B = 0.6 x 200 - 98.18 = 21.82

Binomial Model Risk-Neutral Method
WE ESTABLISHED THE EQUILIBRUIM PRICE OF THE
CALL OPTION WITHOUT KNOWING ANYTHING
ABOUT THE ATTITUDE OF INVESTORS TOWARD
RISK. THIS SUGGESTS … ALTERNATIVE METHOD …
RISK-NEUTRAL VALUATION METHOD
1. CALCULATE THE PROBABILITY OF RISE IN A
RISK NEUTRAL WORLD
2. CALCULATE THE EXPECTED FUTURE VALUE ..
OPTION
3. CONVERT .. IT INTO ITS PRESENT VALUE USING
THE RISK-FREE RATE

Pioneer Stock
1. PROBABILITY OF RISE IN A RISK-NEUTRAL WORLD
RISE 40% TO 280
FALL 10% TO 180
EXPECTED
RETURN = [PROB OF RISE x 40%] + [(1 - PROB OF RISE) x - 10%]
= 10% p = 0.4
2. EXPECTED FUTURE VALUE OF THE OPTION
STOCK PRICE Cu = RS. 60
STOCK PRICE Cd = RS. 0
0.4 x RS. 60 + 0.6 x RS. 0 = RS. 24
3. PRESENT VALUE OF THE OPTION
RS. 24
= RS. 21.82
1.10

Black-Scholes Model
E
C0 = S0 N (d1) - N (d2)
ert
N (d) = VALUE OF THE CUMULATIVE
NORMAL DENSITY FUNCTION
S0 1
ln E + r + 2 2 t
d1 =
  t
d2 = d1 -   t
r = CONTINUOUSLY COMPOUNDED RISK - FREE
ANNUAL INTEREST RATE
 = STANDARD DEVIATION OF THE CONTINUOUSLY
COMPOUNDED ANNUAL RATE OF RETURN ON
THE STOCK

Black-Scholes Model
Illustration
S0 = RS.60 E = RS.56  = 0.30
t = 0.5 r = 0.14
STEP 1 : CALCULATE d1 AND d2
S0 2
ln E + r + 2 t
d1 =
  t
.068 993 + 0.0925
= = 0.7614
0.2121
d2 = d1 -   t
= 0.7614 - 0.2121 = 0.5493
STEP 2 : N (d1) = N (0.7614) = 0.7768
N (d2) = N (0.5493) = 0.7086
STEP 3 : E 56
= = RS. 52.21
ert e0.14 x 0.5
STEP 4 : C0 = RS. 60 x 0.7768 - RS. 52.21 x 0.7086
= 46.61 - 37.00 = 9.61

Assumptions
• THE CALL OPTION IS THE EUROPEAN OPTION
• THE STOCK PRICE IS CONTINUOUS AND IS
DISTRIBUTED LOGNORMALLY
• THERE ARE NO TRANSACTION COSTS AND
TAXES
• THERE ARE NO RESTRICTIONS ON OR
PENALTIES FOR SHORT SELLING
• THE STOCK PAYS NO DIVIDEND
• THE RISK-FREE INTEREST RATE IS KNOWN AND
CONSTANT

Adjustment For Dividends Short-Term Options
Divt
ADJUSTED STOCK PRICE = S = S - 
(1 + r)t
E
VALUE OF CALL = S N (d1) - N (d2)
ert
S 2
ln E + r + 2 t
d1 =
  t

Adjustment For Dividends – 2 Long-Term Options
C = S e -yt N (d1) - E e -rt N (d2)
S 2
ln E + r - y + 2 t
d1 =
  t
d2 = d1 -   t y - dividend yield
THE ADJUSTMENT
• DISCOUNTS THE VALUE OF THE STOCK TO THE PRESENT
AT THE DIVIDEND YIELD TO REFLECT THE EXPECTED
DROP IN VALUE ON ACCOUNT OF THE DIVIDEND PAYMENTS
• OFFSETS THE INTEREST RATE BY THE DIVIDEND YIELD TO
REFLECT THE LOWER COST OF CARRYING THE STOCK

Put – Call Parity - Revisited
JUST BEFORE EXPIRATION
C1 = S1 + P1 - E
IF THERE IS SOME TIME LEFT
C0 = S0 + P0 - E e -rt
THE ABOVE EQUATION CAN BE USED TO
ESTABLISH THE PRICE OF A PUT OPTION &
DETERMINE WHETHER THE PUT - CALL PARITY IS
WORKING

Options pricing ( calculation of option premium)

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