For a price of $102, Andrea will sell you a share which just paid a dividend of $10 yesterday, and is expected to pay dividends every year forever, growing at a rate of 5% pa.
So the next dividend will be ##10(1+0.05)^1=$10.50## in one year from now, and the year after it will be ##10(1+0.05)^2=11.025## and so on.
The required return of the stock is 15% pa.
For certain shares, the forward-looking Price-Earnings Ratio (##P_0/EPS_1##) is equal to the inverse of the share's total expected return (##1/r_\text{total}##). For what shares is this true?
Use the general accounting definition of 'payout ratio' which is dividends per share (DPS) divided by earnings per share (EPS) and assume that all cash flows, earnings and rates are real rather than nominal.
A company's forward-looking PE ratio will be the inverse of its total expected return on equity when it has a:
Which one of the following will increase the Cash Flow From Assets in this year for a tax-paying firm, all else remaining constant?
Question 452 limited liability, expected and historical returns
What is the lowest and highest expected share price and expected return from owning shares in a company over a finite period of time?
Let the current share price be ##p_0##, the expected future share price be ##p_1##, the expected future dividend be ##d_1## and the expected return be ##r##. Define the expected return as:
##r=\dfrac{p_1-p_0+d_1}{p_0} ##
The answer choices are stated using inequalities. As an example, the first answer choice "(a) ##0≤p<∞## and ##0≤r< 1##", states that the share price must be larger than or equal to zero and less than positive infinity, and that the return must be larger than or equal to zero and less than one.
An investor bought a 10 year 2.5% pa fixed coupon government bond priced at par. The face value is $100. Coupons are paid semi-annually and the next one is in 6 months.
Six months later, just after the coupon at that time was paid, yields suddenly and unexpectedly fell to 2% pa. Note that all yields above are given as APR's compounding semi-annually.
What was the bond investors' historical total return over that first 6 month period, given as an effective semi-annual rate?
Question 657 systematic and idiosyncratic risk, CAPM, no explanation
A stock's required total return will decrease when its:
Use the below information to value a levered company with constant annual perpetual cash flows from assets. The next cash flow will be generated in one year from now, so a perpetuity can be used to value this firm. Both the operating and firm free cash flows are constant (but not equal to each other).
Data on a Levered Firm with Perpetual Cash Flows | ||
Item abbreviation | Value | Item full name |
##\text{OFCF}## | $100m | Operating free cash flow |
##\text{FFCF or CFFA}## | $112m | Firm free cash flow or cash flow from assets (includes interest tax shields) |
##g## | 0% pa | Growth rate of OFCF and FFCF |
##\text{WACC}_\text{BeforeTax}## | 7% pa | Weighted average cost of capital before tax |
##\text{WACC}_\text{AfterTax}## | 6.25% pa | Weighted average cost of capital after tax |
##r_\text{D}## | 5% pa | Cost of debt |
##r_\text{EL}## | 9% pa | Cost of levered equity |
##D/V_L## | 50% pa | Debt to assets ratio, where the asset value includes tax shields |
##t_c## | 30% | Corporate tax rate |
What is the value of the levered firm including interest tax shields?
Question 784 boot strapping zero coupon yield, forward interest rate, term structure of interest rates
Information about three risk free Government bonds is given in the table below.
Federal Treasury Bond Data | ||||
Maturity | Yield to maturity | Coupon rate | Face value | Price |
(years) | (pa, compounding annually) | (pa, paid annually) | ($) | ($) |
1 | 0% | 2% | 100 | 102 |
2 | 1% | 2% | 100 | 101.9703951 |
3 | 2% | 2% | 100 | 100 |
Based on the above government bonds' yields to maturity, which of the below statements about the spot zero rates and forward zero rates is NOT correct?
A one year European-style call option has a strike price of $4.
The option's underlying stock currently trades at $5, pays no dividends and its standard deviation of continuously compounded returns is 47% pa.
The risk-free interest rate is 10% pa continuously compounded.
Use the Black-Scholes-Merton formula to calculate the option price. The call option price now is:
Question 950 future, backwardation