Answer: $4.24
Explanation:
According to the Put-Call Parity, the value would be expressed by;
Put Price = Call price - Stock price + Exercise price *e^-(risk free rate *T)
T is 90 days out of 365 so = 90/365
= 2.65 - 26 + 28 * 2.71 ^ (-0.06 * 90/365)
= $4.24
Answer:
-22.42
Explanation:
Given,
Stock = $26, Call = $2.65, Exercise price = $28, Risk-free rate = 6%, Time = 0.24657 (90 / 365)
The put-call parity formula is [tex]$ C+Ke^{-rT} = P+S_0 $[/tex] where:
C = Call Price, K = Exercise Price, r = Risk-Free Rate, T = Time to Expiration,
P = Put Price, and [tex]$S_0$[/tex] = Stock Price
Subtracting [tex]$S_0$[/tex] from both sides, we get
[tex]$ P=C+Ke^{-rT} -S_0 $[/tex]
[tex]$P= 2.65 + 28 e^{-(6)(0.24657)}-26 $[/tex]
[tex]$P= 2.65 + 28 e^{-(1.47942)}-26 $[/tex]
[tex]$P= 2.65 + (28) (0.033157)-26 $[/tex]
= -22.42
