Explore a vast range of topics and get informed answers at IDNLearn.com. Get timely and accurate answers to your questions from our dedicated community of experts who are here to help you.
Sagot :
To determine which portfolio has the higher total weighted mean amount of money, let's go through the given investments and their respective Rate of Return (ROR) step by step.
1. Calculate Weighted Returns for Portfolio 1:
For each investment in Portfolio 1:
- Tech Company Stock: \[tex]$2300 2.35% = \$[/tex]2300 0.0235 = \[tex]$54.05 - Government Bond: \$[/tex]3100 1.96% = \[tex]$3100 0.0196 = \$[/tex]60.76
- Junk Bond: \[tex]$650 10.45% = \$[/tex]650 0.1045 = \[tex]$67.925 - Common Stock: \$[/tex]1800 -2.59% = \[tex]$1800 -0.0259 = -\$[/tex]46.62
Summing these results gives the total weighted return for Portfolio 1:
[tex]\[ 54.05 + 60.76 + 67.925 - 46.62 = \$136.115 \][/tex]
2. Calculate Weighted Returns for Portfolio 2:
For each investment in Portfolio 2:
- Tech Company Stock: \[tex]$1575 2.35% = \$[/tex]1575 0.0235 = \[tex]$37.0125 - Government Bond: \$[/tex]2100 1.96% = \[tex]$2100 0.0196 = \$[/tex]41.16
- Junk Bond: \[tex]$795 10.45% = \$[/tex]795 0.1045 = \[tex]$83.0775 - Common Stock: \$[/tex]1900 -2.59% = \[tex]$1900 -0.0259 = -\$[/tex]49.21
Summing these results gives the total weighted return for Portfolio 2:
[tex]\[ 37.0125 + 41.16 + 83.0775 - 49.21 = \$112.04 \][/tex]
3. Comparison:
- Total weighted return for Portfolio 1: \[tex]$136.115 - Total weighted return for Portfolio 2: \$[/tex]112.04
Portfolio 1 has a higher total weighted mean amount of money than Portfolio 2.
4. Difference Between the Portfolios:
[tex]\[ 136.115 - 112.04 = \$24.075 \][/tex]
Therefore, Portfolio 1 has the higher total weighted mean amount of money by \[tex]$24.08 (rounded to two decimal places). The correct statement is: Portfolio 1 has the higher total weighted mean amount of money by $[/tex]\[tex]$24.08$[/tex].
1. Calculate Weighted Returns for Portfolio 1:
For each investment in Portfolio 1:
- Tech Company Stock: \[tex]$2300 2.35% = \$[/tex]2300 0.0235 = \[tex]$54.05 - Government Bond: \$[/tex]3100 1.96% = \[tex]$3100 0.0196 = \$[/tex]60.76
- Junk Bond: \[tex]$650 10.45% = \$[/tex]650 0.1045 = \[tex]$67.925 - Common Stock: \$[/tex]1800 -2.59% = \[tex]$1800 -0.0259 = -\$[/tex]46.62
Summing these results gives the total weighted return for Portfolio 1:
[tex]\[ 54.05 + 60.76 + 67.925 - 46.62 = \$136.115 \][/tex]
2. Calculate Weighted Returns for Portfolio 2:
For each investment in Portfolio 2:
- Tech Company Stock: \[tex]$1575 2.35% = \$[/tex]1575 0.0235 = \[tex]$37.0125 - Government Bond: \$[/tex]2100 1.96% = \[tex]$2100 0.0196 = \$[/tex]41.16
- Junk Bond: \[tex]$795 10.45% = \$[/tex]795 0.1045 = \[tex]$83.0775 - Common Stock: \$[/tex]1900 -2.59% = \[tex]$1900 -0.0259 = -\$[/tex]49.21
Summing these results gives the total weighted return for Portfolio 2:
[tex]\[ 37.0125 + 41.16 + 83.0775 - 49.21 = \$112.04 \][/tex]
3. Comparison:
- Total weighted return for Portfolio 1: \[tex]$136.115 - Total weighted return for Portfolio 2: \$[/tex]112.04
Portfolio 1 has a higher total weighted mean amount of money than Portfolio 2.
4. Difference Between the Portfolios:
[tex]\[ 136.115 - 112.04 = \$24.075 \][/tex]
Therefore, Portfolio 1 has the higher total weighted mean amount of money by \[tex]$24.08 (rounded to two decimal places). The correct statement is: Portfolio 1 has the higher total weighted mean amount of money by $[/tex]\[tex]$24.08$[/tex].
We appreciate your participation in this forum. Keep exploring, asking questions, and sharing your insights with the community. Together, we can find the best solutions. Your questions find answers at IDNLearn.com. Thanks for visiting, and come back for more accurate and reliable solutions.