ࡱ> MOLn[ M3bjbj ΐΐ0*2& & ii   8ED 00EE[[j$j$j$90;0;0;0;0;0;01h4R;0j$X#j$j$j$;0ii[WP0T(T(T(j$Bi[90T(j$90T(T(V.@A/|  %r-/ %0f0009/x4'64/4/tj$j$T(j$j$j$j$j$;0;0T(j$j$j$0j$j$j$j$4j$j$j$j$j$j$j$j$j$& /: CHAPTER 5 SECURITY-MARKET INDICATOR SERIES Answers to Questions Q1 : Discuss briefly several uses of of security market indexes. The purpose of market indicator series is to provide a general indication of the aggregate market changes or market movements. More specifically, the indicator series are used to derive market returns for a period of interest and then used as a benchmark for evaluating the performance of alternative portfolios. A second use is in examining the factors that influence aggregate stock price movements by forming relationships between market (series) movements and changes in the relevant variables in order to illustrate how these variables influence market movements. A further use is by technicians who use past aggregate market movements to predict future price patterns. Finally, a very important use is in portfolio theory, where the systematic risk of an individual security is determined by the relationship of the rates of return for the individual security to rates of return for a market portfolio of risky assets. Here, a representative market indicator series is used as a proxy for the market portfolio of risky assets. Q.3: Explain how a market weigted index is price weigted? In such a case, would you expect a $100 stcok to be more important than a $25 stcok? Give an exacmple. A price-weighted series is an unweighted arithmetic average of current prices of the securities included in the sample - i.e., closing prices of all securities are summed and divided by the number of securities in the sample. A $100 security will have a greater influence on the series than a $25 security because a 10 percent increase in the former increases the numerator by $10 while it takes a 40 percent increase in the price of the latter to have the same effect. Q.4 Explain how to compute a value-weighted index? A value-weighted index begins by deriving the initial total market value of all stocks used in the series (market value equals number of shares outstanding times current market price). The initial value is typically established as the base value and assigned an index value of 100. Subsequently, a new market value is computed for all securities in the sample and this new value is compared to the initial value to derive the percent change which is then applied to the beginning index value of 100. Q.5 Explain how a price-weighted index adjust for stock splits Given a four security series and a 2-for-1 split for security A and a 3-for-1 split for security B, the divisor would change from 4 to 2.8 for a price-weighted series. Stock Before Split Price After Split Prices A $20 $10 B 30 10 C 20 20 D 30 30 Total 100/4 = 25 70/x = 25 x = 2.8 The price-weighted series adjusts for a stock split by deriving a new divisor that will ensure that the new value for the series is the same as it would have been without the split. The adjustment for a value-weighted series due to a stock split is automatic. The decrease in stock price is offset by an increase in the number of shares outstanding. Before Split Stock Price/Share # of Shares Market Value A $20 1,000,000 $20,000,000 B 30 500,000 15,000,000 C 20 2,000,000 40,000,000 D 30 3,500,000 105,000,000 Total $180,000,000 The $180,000,000 base value is set equal to an index value of 100. After Split Stock Price/Share # of Shares Market Value A $10 2,000,000 $20,000,000 B 10 1,500,000 15,000,000 C 20 2,000,000 40,000,000 D 30 3,500,000 105,000,000  Total $180,000,000 which is precisely what one would expect since there has been no change in prices other than the split. Q.6 Describe an unweighted price index and describe you would construct such an index. Assume a 20% price change in GM ($40/share; 50 millions shares outstanding) and Coors Brewing ($25/share and 15 million shares outstanding). Explain which stocks change will have the greater impact on this index. In an unweighted price indicator series, all stocks carry equal weight irrespective of their price and/or their value. One way to visualize an unweighted series is to assume that equal dollar amounts are invested in each stock in the portfolio, for example, an equal amount of $1,000 is assumed to be invested in each stock. Therefore, the investor would own 25 shares of GM ($40/share) and 40 shares of Coors Brewing ($25/share). An unweighted price index that consists of the above three stocks would be constructed as follows: Stock Price/Share # of Shares Market Value GM $ 40 25 $1,000 Coors 25 40 1,000 Total $2,000 A 20% price increase in GM: Stock Price/Share # of Shares Market Value GM $ 48 25 $1,200 Coors 25 40 1,000 Total $2,200 A 20% price increase in Coors: Stock Price/Share # of Shares Market Value GM $ 40 25 $1,000 Coors 30 40 1,200 Total $2,200 Therefore, a 20% increase in either stock would have the same impact on the total value of the index (i.e., in all cases the index increases by 10%. An alternative treatment is to compute percentage changes for each stock and derive the average of these percentage changes. In this case, the average would be 10% (20% - 10%)). So in the case of an unweighted price-indicator series, a 20% price increase in GM would have the same impact on the index as a 20% price increase of Coors Brewing. CHAPTER 5 Answers to Problems 1(a). Base = ($12 x 500) + ($23 x 350) + ($52 x 250) = $6,000 + $8,050 + $13,000 = $27,050 Day 1 = ($12 x 500) + ($23 x 350) + ($52 x 250) = $6,000 + $8,050 + $13,000 = $27,050 Index1 = ($27,050/$27,050) x 10 = 10 Day 2 = ($10 x 500) + ($22 x 350) + ($55 x 250) = $5,000 + $7,700 + $13,750 = $26,450 Index2 = ($26,450/$27,050) x 10 = 9.778 Day 3 = ($14 x 500) + ($46 x 175) + ($52 x 250) = $7,000 + $8,050 + $13,000 = $28,050 Index3 = ($28,050/$27,050) x 10 = 10.370 Day 4 = ($13 x 500) + ($47 x 175) + ($25 x 500) = $6,500 + $8,225 + $12,500 = $27,225 Index4 = ($27,225/$27,050) x 10 = 10.065 Day 5 = ($12 x 500) + ($45 x 175) + ($26 x 500) = $6,000 + $7,875 + $13,000 = $26,875 Index5 = ($26,875/$27,050) x 10 = 9.935 1(b). The market values are unchanged due to splits and thus stock splits have no effect. The index, however, is weighted by the relative market values. 3. Price-weighted index (PWI)2008 = (20 + 80+ 40)/3 = 46.67 To accounted for stock split, a new divisor must be calculated: (20 + 40 + 40)/X = 46.67 X = 2.143 (new divisor after stock split) Price-weighted index2009 = (32 + 45 + 42)/2.143 = 55.53 VWI2008 = 20(100,000,000) + 80(2,000,000) + 40(25,000,000) = 2,000,000,000 + 160,000,000 + 1,000,000,000 = 3,160,000,000 assuming a base value of 100 and 1998 as base period, then (3,160,000,000/3,160,000,000) x 100 = 100 VWI2003 = 32(100,000,000) + 45(4,000,000) + 42(25,000,000) = 3,200,000,000 + 180,000,000 + 1,050,000,000 = 4,430,000,000 assuming a base value of 100 and 2008 as period, then (4,430,000,000/3,160,000,000) x 100 = 1.4019 x 100 = 140.19 3(b). Percentage change in PWI = (55.53 - 46.67)/46.67 = 18.99% Percentage change in VWI = (140.19 - 100)/100 = 40.19% 3(c). The percentage change in VWI was much greater than the change in the PWI because the stock with the largest market value (K) had the greater percentage gain in price (60% increase). Q. 5 You are given the following information regarding prices of a sample of stocks. Period t Period t+1 A $ 60 $ 80 B 20 35 C 18 25 Sum $ 98 $140 Construct a price-weighted indec for these stocks, and compute the percentage change in the index for the period from T to T+1 Construct a value-weighted index for these stocks, and compute the percentage change in the index for the period from T to T+1 Brifly discuss the differences in the results for the two stocks. 5(a). Given a three security series and a price change from period t to t+1, the percentage change in the series would be 42.85 percent. Period t Period t+1 A $ 60 $ 80 B 20 35 C 18 25 Sum $ 98 $140 Divisor 3 3 Average 32.67 46.67  5(b). Period t Stock Price/Share # of Shares Market Value A $60 1,000,000 $ 60,000,000 B 20 10,000,000 200,000,000 C 18 30,000,000 540,000,000 Total $800,000,000 Period t+1 Stock Price/Share # of Shares Market Value A $80 1,000,000 $ 80,000,000 B 35 10,000,000 350,000,000 C 25 30,000,000 750,000,000 Total $1,180,000,000  5(c). The percentage change for the price-weighted series is a simple average of the differences in price from one period to the next. Equal weights are applied to each price change. The percentage change for the value-weighted series is a weighted average of the differences in price from one period t to t+1. These weights are the relative market values for each stock. Thus, Stock C carries the greatest weight followed by B and then A. Because Stock C had the greatest percentage increase and the largest weight, it is easy to see that the percentage change would be larger for this series than the price-weighted series. 6. Given the data in problem 5, construct an eqaul-weighted index by assuming $1,000 is invested in eacg stock. What is the percentage change in wealth for this portfolio? Compute the percentage of price change for each of the stocks in Problem 5. Compute the arithmetic mean of these percentage chnages. Discuss how this answer compares to the answer in part a. Compute the geometric mean of these percentage chnages. Discuss how this answer compares to the answer in part b. 6(a). Period t Stock Price/Share # of Shares Market Value A $60 16.67 $ 1,000,000 B 20 50.00 1,000,000 C 18 55.56 1,000,000 Total $3,000,000 Period t+1 Stock Price/Share # of Shares Market Value A $80 16.67 $ 1,333.60 B 35 50.00 1,750.00 C 25 55.56 1,389.00 Total $4,470.60  6(b).  The answers are the same (slight difference due to rounding). This is what you would expect since Part A represents the percentage change of an equal-weighted series and Part B applies an equal weight to the separate stocks in calculating the arithmetic average. 6(c). Geometric average is the nth root of the product of n items.  The geometric average is less than the arithmetic average. This is because variability of return has a greater affect on the arithmetic average than the geometric average. 6(c). December 31, 2002 Stock Price/Share # of Shares Market Value K $20 50.0 $1,000.00 M 80 12.5 1,000.00 R 40 25.0 1,000.00 Total $3,000.00 December 31, 2003 Stock Price/Share # of Shares Market Value K $32 50.0 $1,600.00 M 45 25.5* 1,125.00 R 42 25.0 1,050.00 Total $3,775.00 (*Stock-split two-for-one during the year.)  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