- On 8/15/2019, a 3-year forward contract, expiring 8/15/2022, on a non-dividend-paying stock was entered into when the stock price was $55 and the risk-free interest rate was 10.8% per annum with continuous compounding. 1 year later, on 8/15/2020, the stock price becomes $58. What is the "delivery" price of the forward contract entered into on 8/15/2019?
Round your answer to the nearest 2 decimal points. For example, if your answer is $12.345, then enter "12.35" in the answer box.
- Several months ago, XYZ entered into a long forward contract on an asset with no income. XYZ agreed to pay $30 to seller at maturity.
Today, the contract matures in 9 months. The risk-free rate with continuous compounding is 8.5% per annum, the underlying asset price is $38.55.
Calculate the value of the above forward contract.
Round your answer to the nearest 2 decimal points. For example, if your answer is $12.345, then enter "12.35" in the answer box.
the "delivery" price of the forward contract entered into on 8/15/2019 = S0 x erf x t = 55 x e0.108 x 3 = $ 76.05
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the value of the above forward contract = S0 - PV(K) = 38.55 -
30 x e-0.085 x 9/12 = $ 10.40
- On 8/15/2019, a 3-year forward contract, expiring 8/15/2022, on a non-dividend-paying stock was entered into...
On 8/15/2019, a 3-year forward contract, expiring 8/15/2022, on a non-dividend-paying stock was entered into when the stock price was $50 and the risk-free interest rate was 10.5% per annum with continuous compounding. 1 year later, on 8/15/2020, the stock price becomes $57. What is the "delivery" price of the forward contract entered into on 8/15/2019?
Several months ago, XYZ entered into a long forward contract on an asset with no income. XYZ agreed to pay $30 to seller at maturity. Today, the contract matures in 9 months. The risk-free rate with continuous compounding is 8.5% per annum, the underlying asset price is $38.55. Calculate the value of the above forward contract. Round your answer to the nearest 2 decimal points. For example, if your answer is $12.345, then enter "12.35" in the answer box.
1. A 1 year long forward contract an a non-dividend paying stock is entered into when the stock price is $39 and the risk-free rate of interest is 6.5% per annum with continuous compounding (a) What is the forward price? (b) Six months later; the price of the stock is $42.50 and the risk-free interest rate is still 6.5%. What is the forward price?
A one-year long forward contract on a non-dividend-paying stock is entered into when the stock price is $56 and the risk-free rate (with continuous compounding) is 8%.` (1) What are the forward price and the initial value of the forward contract? (2) Five months later, the price of the stock is $60 and the risk-free rate is still 8%. What are the forward price and the value of the forward contract?
Exercise 3. A short forward contract on a dividend-paying stock was entered some time ago. It currently has 9 months to maturity. The stock price and the delivery price is s25 and $24 respectively. The risk-free interest rate with continuous compounding is 8% per annum. The underlying stock is expected to pay a dividend of $2 per share in 2 months and an another dividend of $2 in 6 months. (a) What is the (initial) value of this forward contract?...
1- Forward price is the value of the forward contract.(true or false) 2- Calculate the present value of $100 in 5 years. Assume 6.1% interest rate with continuous compounding. Round your answer to the nearest 2 decimal points. For example, if your answer is $12.345, then enter "12.35" in the answer box.
A one-year long forward contract on a gas portfolio is entered into when the gas portfolio price is $3 and the risk-free rate of interest is 3% per annum with continuous compounding. What are the forward price and the initial value of the forward contract? Six months later, the price of the gas portfolio is $2.6 and the risk-free interest rate is still 3%. What are the forward price and the value of the forward contract?
Consider a six-month forward contract on a non-dividend paying stock. Assume the current stock price is $50 and the risk-free interest rate is 7.84% per annum with continuous compounding. Suppose the price of this six-month forward price is $53.50. Show that it creates an arbitrage opportunity? Write down the complete strategy for an arbitrageur --- you must list down all the actions that are required now and later and demonstrate how arbitrageur earns a risk-less profit.
On June 15, you took a long forward contract (delivery on December 15) on a dividend-paying stock when the stock price was $30 and the risk-free interest rate (with discrete compounding) is 12% per annum. The amount of the dividends were known as $0.75 on Aug 15, and Nov 15. It is now September 15 and the current stock price and the risk-free interest rate are, respectively, $31 and 10%. What is the value of your long forward position now?...
Suppose that you enter into a six-month forward contract on a non-dividend-paying stock when the stock price is $30 and the risk-free interest rate (with quarterly compounding) is 12% per annum. a) What is equivalent continuously compounding rate? b) What is the forward price?