MAT1856S/ APM466S

Mathematical Theory of Finance - Assignment 2

Due March 8, 2021

Gasoline prices are at p0 = $1/litre today, and each week i the price

can go up by 10% to pi+1 = pi · 1.1 with probability 50%, or down to

pi+1 = pi/1.1 also with probability 50%.

Mr. Hamilton drives a car and each week consumes 50 litres of gasoline.

He purchases price protection insurance in the form of a 4-upswing option

with strike price $1, which works as follows:

1 . On a given week, he can exercise one purchase option for 50 litres

(no more nor less) at a fixed price of $1/litre.

2 . He can exercise this purchase option a maximum of 4 times in a given

year.

On the other hand, Ms. Curie runs a refinery, and produces 50,000

litres of gasoline every week, that she sells at market prices. She will pur￾chase a price protection program in the form of a 4-downswing option which

works as follows:

1 . On a given week, she can exercise one sell option for 50,000 litres (no

more nor less) at a fixed price of $1/litre.

2 . She can exercise this purchase option a maximum of 4 times in a

given year.

In both cases, using recombining trees, calculate the price of the price

protection plan in each case, as well as the optimal exercise nodes in the

option trees.