Free Homework's Help 24/7: Stock Valuation

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Sunday, 3 August 2014

Kaleb Konstruction, Inc., has the following mutually exclusive projects available. The company has historically used a three-year cutoff for projects. The required return is 11 percent.

Year	Project F		Project G
0	–$	139,000	–$	209,000
1		58,000		38,000
2		52,000		53,000
3		62,000		92,000
4		57,000		122,000
5		52,000		137,000

Required:

(a)

Calculate the payback period for both projects. (Do not round intermediate calculations. Round your answers to 2 decimal places (e.g., 32.16).)

	Payback period
Project F	years
Project G	years

(b)

Calculate the NPV for both projects. (Do not round intermediate calculations. Round your answers to 2 decimal places (e.g., 32.16).)

	Net present value
Project F	$
Project G	$

(c)	Which project should the company accept?

	Project G

Explanation:

(a)

The payback period for each project is:

F: 2 + ($29,000 / $62,000) = 2.47 years

G: 3 + ($26,000 / $122,000) = 3.21 years

The payback criterion implies accepting project F because it pays back sooner than project G. Project G does not meet the minimum payback of three years.

(b)

The NPV for each project is:

F: NPV = – $139,000 + $58,000 / 1.11 + $52,000 / 1.11² + $62,000 / 1.11³ + $57,000 / 1.11⁴

+ $52,000 / 1.11⁵

NPV = $69,197.62

G: NPV = – $209,000 + $38,000 / 1.11 + $53,000 / 1.11² + $92,000 / 1.11³

+ $122,000 / 1.11⁴ + $137,000 / 1.11⁵

NPV = $97,187.84

The NPV criterion implies we should accept project G because project G has a higher NPV than project F.

(c)

Even though Project G does not meet the payback period of three years, it does provide the largest increase in shareholder wealth, therefore, choose Project G. Payback period should generally be ignored in this situation.

Calculator Solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

Project F		Project G
CFo	–$139,000	CFo	–$209,000
C01	$58,000	C01	$38,000
F01	1	F01	1
C02	$52,000	C02	$53,000
F02	1	F02	1
C03	$62,000	C03	$92,000
F03	1	F03	1
C04	$57,000	C04	$122,000
F04	1	F04	1
C05	$52,000	C05	$137,000
F05	1	F05	1
I = 11		I = 11
NPV CPT		NPV CPT
$69,197.62		$97,187.84

Kerron Company is presented with the following two mutually exclusive projects. The required return for both projects is 19 percent. Year Project M Project N 0 –$140,000 –$355,000 1 63,500 152,500 2 81,500 180,000 3 72,500 137,500 4 58,500 110,000

Kerron Company is presented with the following two mutually exclusive projects. The required return for both projects is 19 percent.

Year	Project M	Project N
0	–$140,000	–$355,000
1	63,500	152,500
2	81,500	180,000
3	72,500	137,500
4	58,500	110,000

Required:
(a)	What is the IRR for each project? (Do not round intermediate calculations. Enter your answers as a percentage rounded to 2 decimal places (e.g., 32.16).)

	IRR
Project M	%
Project N	%

(b)

What is the NPV for each project? (Do not round intermediate calculations. Round your answers to 2 decimal places (e.g., 32.16).)

	NPV
Project M	$
Project N	$

(c)	Which, if either, of the projects should the company accept?

	Project M

Explanation: (a)

The IRR for each project is:

M:	$140,000 = $63,500 / (1 + IRR) + $81,500 / (1 + IRR)² + $72,500 / (1 + IRR)³ + $58,500 / (1 + IRR)⁴

Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:

IRR = 34.47%

N:	$355,000 = $152,500 / (1 + IRR) + $180,000 / (1 + IRR)² + $137,500 / (1 + IRR)³ + 110,000 / (1 + IRR)⁴

Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:

IRR = 24.61%

The IRR decision rule implies we accept project M because the IRR for M is greater than the IRR for N.

(b)

The NPV for each project is:

M:	NPV = – $140,000 + $63,500 / 1.19 + $81,500 / 1.19² + $72,500 / 1.19³ + $58,500 / 1.19⁴
	NPV = $43,108.55

N:	NPV = – $355,000 + $152,500 / 1.19 + $180,000 / 1.19² + $137,500 / 1.19³ + $110,000 / 1.19⁴
	NPV = $36,709.17

The NPV criterion implies we accept project M because project M has a higher NPV than project N.

(c)

Accept project M since the NPV is higher. IRR cannot be used to rank mutually exclusive projects.

Calculator Solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

Project M
CFo	–$140,000	CFo	–$140,000
C01	$63,500	C01	$63,500
F01	1	F01	1
C02	$81,500	C02	$81,500
F02	1	F02	1
C03	$72,500	C03	$72,500
F03	1	F03	1
C04	$58,500	C04	$58,500
F04	1	F04	1
CPT IRR		I = 19
34.47%		NPV CPT
		$43,108.55

Project N
CFo	–$355,000	CFo	–$355,000
C01	$152,500	C01	$152,500
F01	1	F01	1
C02	$180,000	C02	$180,000
F02	1	F02	1
C03	$137,500	C03	$137,500
F03	1	F03	1
C04	$110,000	C04	$110,000
F04	1	F04	1
CPT IRR		I = 19
24.61%		NPV CPT
		$36,709.17

Problem 8-9 Calculating NPV [LO 4] Consider the following cash flows: Year Cash Flow 0 –$ 32,000 1 14,200 2 17,500 3 11,600

Problem 8-9 Calculating NPV [LO 4]

Consider the following cash flows:

Year	Cash Flow
0		–$	32,000
1			14,200
2			17,500
3			11,600

Requirement 1:

What is the NPV at a discount rate of zero percent? (Do not round intermediate calculations.)

Net present value

Requirement 2:

What is the NPV at a discount rate of 10 percent? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)

Net present value

Requirement 3:

What is the NPV at a discount rate of 20 percent? (Do not round intermediate calculations. Negative amount should be indicated by a minus sign.Round your answer to 2 decimal places (e.g., 32.16).)

Net present value

Requirement 4:

What is the NPV at a discount rate of 30 percent? (Do not round intermediate calculations. Negative amount should be indicated by a minus sign. Round your answer to 2 decimal places (e.g., 32.16).)

Net present value

Explanation:

The NPV of a project is the PV of the outflows plus the PV of the inflows. At a zero discount rate (and only at a zero discount rate), the cash flows can be added together across time. So, the NPV of the project at a zero percent required return is:

NPV = – $32,000 + 14,200 + 17,500 + 11,600

NPV = $11,300

The NPV at a 10 percent required return is:

NPV = – $32,000 + $14,200 / 1.10 + $17,500 / 1.10² + $11,600 / 1.10³

NPV = $4,087.15

The NPV at a 20 percent required return is:

NPV = – $32,000 + $14,200 / 1.20 + $17,500 / 1.20² + $11,600 / 1.20³

NPV = –$1,300.93

And the NPV at a 30 percent required return is:

NPV = – $32,000 + $14,200 / 1.30 + $17,500 / 1.30² + $11,600 / 1.30³

NPV = – $5,441.97

Notice that as the required return increases, the NPV of the project decreases. This will always be true for projects with conventional cash flows. Conventional cash flows are negative at the beginning of the project and positive throughout the rest of the project.

Calculator solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

CFo	–$32,000	CFo	–$32,000
C01	$14,200	C01	$14,200
F01	1	F01	1
C02	$17,500	C02	$17,500
F02	1	F02	1
C03	$11,600	C03	$11,600
F03	1	F03	1
I = 0%		I = 10%
NPV CPT		NPV CPT
$11,300.00		$4,087.15

CFo	–$32,000	CFo	–$32,000
C01	$14,200	C01	$14,200
F01	1	F01	1
C02	$17,500	C02	$17,500
F02	1	F02	1
C03	$11,600	C03	$11,600
F03	1	F03	1
I = 20%		I = 30%
NPV CPT		NPV CPT
–$1,300.93		–$5,441.97

Problem 8-8 Calculating IRR [LO 3] Consider the following cash flows: Year Cash Flow 0 –$ 32,000 1 14,200 2 17,500 3 11,600

Problem 8-8 Calculating IRR [LO 3]

Consider the following cash flows:

Year	Cash Flow
0		–$	32,000
1			14,200
2			17,500
3			11,600

Required:

What is the IRR of the above set of cash flows? (Do not round intermediate calculations. Enter your answer as a percentage rounded to 2 decimal places (e.g., 32.16).)

Internal rate of return

Explanation:

The IRR is the interest rate that makes the NPV of the project equal to zero. So, the equation that defines the IRR for this project is:

0 = – $32,000 + $14,200 / (1 + IRR) + $17,500 / (1 + IRR)² + $11,600 / (1 + IRR)³

Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:

IRR = 17.32%

Calculator solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

CFo	–$32,000
C01	$14,200
F01	1
C02	$17,500
F02	1
C03	$11,600
F03	1
IRR CPT
17.32%

Problem 8-7 Calculating NPV and IRR [LO 3, 4] A project that provides annual cash flows of $2,800 for nine years costs $9,200 today. Requirement 1: At a required return of 11 percent, what is the NPV of the project? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)

Problem 8-7 Calculating NPV and IRR [LO 3, 4]

A project that provides annual cash flows of $2,800 for nine years costs $9,200 today.

Requirement 1:

At a required return of 11 percent, what is the NPV of the project? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)

NPV

Requirement 2:

At a required return of 27 percent, what is the NPV of the project? (Do not round intermediate calculations. A negative amount should be indicated by a minus sign. Round your answer to 2 decimal places (e.g., 32.16).)

NPV

Requirement 3:

At what discount rate would you be indifferent between accepting the project and rejecting it? (Do not round intermediate calculations. Enter your answer as a percentage rounded to 2 decimal places (e.g., 32.16).)

Discount rate

Explanation:

The NPV of a project is the PV of the outflows plus the PV of the inflows. Since the cash inflows are an annuity, the equation for the NPV of this project at an 11 percent required return is:

NPV = – $9,200 + $2,800(PVIFA_{11%, 9})

NPV = $6,303.73

At an 11 percent required return, the NPV is positive, so we would accept the project.

The equation for the NPV of the project at a 27 percent required return is:

NPV = – $9,200 + $2,800(PVIFA_{27%, 9})

NPV = –$36.22

At a 27 percent required return, the NPV is negative, so we would reject the project.

We would be indifferent to the project if the required return was equal to the IRR of the project, since at that required return the NPV is zero. The IRR of the project is:

0 = – $9,200 + $2,800(PVIFA_{IRR, 9})

IRR = .2686, or 26.86%

Calculator Solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

CFo	–$9,200	CFo	–$9,200	CFo	–$9,200
C01	$2,800	C01	$2,800	C01	$2,800
F01	9	F01	9	F01	9
I = 11%		I = 27%		IRR CPT
NPV CPT		NPV CPT		26.86%
$6,303.73		–$36.22

A firm evaluates all of its projects by applying the IRR rule. Year Cash Flow 0 –$ 158,000 1 58,000 2 81,000 3 65,000

A firm evaluates all of its projects by applying the IRR rule.

Year	Cash Flow
0	–$	158,000
1		58,000
2		81,000
3		65,000

Requirement 1:

What is the project's IRR? (Do not round intermediate calculations. Enter your answer as a percentage rounded to 2 decimal places (e.g., 32.16).)

Internal rate of return

Requirement 2:
If the required return is 15 percent, should the firm accept the project?

No

Explanation:

The IRR is the interest rate that makes the NPV of the project equal to zero. So, the equation that defines the IRR for this project is:

0 = – $158,000 + $58,000 / (1 + IRR) + $81,000 / (1 + IRR)² + $65,000 / (1 + IRR)³

Using a spreadsheet, financial calculator, or trial and error to find the root of the equation, we find that:

IRR = 13.66%

Since the cash flows are conventional and the IRR is lower than the required return, we would not accept the project.

Calculator Solution:

Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.

CFo	–$158,000
C01	$58,000
F01	1
C02	$81,000
F02	1
C03	$65,000
F03	1
IRR CPT
13.66%

Thursday, 31 July 2014

Gontier Corporation stock currently sells for $64.58 per share. The market requires a return of 10 percent on the firm’s stock.

Required:

If the company maintains a constant 5.75 percent growth rate in dividends, what was the most recent dividend per share paid on the stock? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)

Dividend per share

Explanation:

We are given the stock price, the dividend growth rate, and the required return, and are asked to find the dividend. Using the constant dividend growth model, we get:

P₀ = D₀ (1 + g) / (R – g)

Solving this equation for the dividend gives us:

D₀ = P₀(R – g) / (1 + g)

D₀ = $64.58(0.10 – 0.0575) / (1 + 0.0575)

D₀ = $2.60

Antiques ‘R’ Us is a mature manufacturing firm. The company just paid a dividend of $12.10, but management expects to reduce the payout by 4.5 percent per year, indefinitely.

Required:

If you require a return of 11 percent on this stock, what will you pay for a share today? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)


Current share price	$

Explanation:

The constant growth model can be applied even if the dividends are declining by a constant percentage, just make sure to recognize the negative growth. So, the price of the stock today will be:

P₀ = D₀ (1 + g) / (R – g)

P₀ = $12.10(1 – 0.0450) / [(.11 – (–.0450)]

P₀ = $74.55

Hot Wings, Inc., has an odd dividend policy. The company has just paid a dividend of $9.25 per share

Hot Wings, Inc., has an odd dividend policy. The company has just paid a dividend of $9.25 per share and has announced that it will increase the dividend by $7.25 per share for each of the next four years, and then never pay another dividend.

Required:

If you require a return of 14 percent on the company’s stock, how much will you pay for a share today? (Do not round intermediate calculations. Round your answer to 2 decimal places (e.g., 32.16).)


Current share price	$

Explanation:

The price of a stock is the PV of the future dividends. This stock is paying four dividends, so the price of the stock is the PV of these dividends discounted at the required return. So, the price of the stock is:

P₀ = $16.50 / 1.14 + $23.75 / 1.14² + $31.00 / 1.14³ + $38.25 / 1.14⁴

P₀ = $76.32