Justin Edelstein Page. 117 7) FV= PV (1+r)t Solving for t‚ we get: t=(FV/PV)/ (1+r) Double Money FV= $2$1(1.07)t T= 2/1.07 T=10.24 Years Quadruple Money FV= $4=$1(1.07)t T=4/1.07 T=20.49 Years 8) FV= PV(1+r)t R=(FV/PV)1/t-1 R=(6‚450/1)1/116-1 R=7.86% 10) PV=FV/(1+r)t PV= 750‚000‚000/ (1.08)25 PV=$109‚513‚428.68 15) FV=PV(1+r)t R=(FV/PV)1/t-1 R=(10‚311‚500/12‚377‚500)1/4-1 R=-.0446 or -4.46% Page. 153 1) PV=FV/(1+r) PV @10%= $950/1.10+$730/1.102+$1‚420/1.103+$1‚780/1
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Week 2 Text Problem Set Candy Wungnema FIN/571 February 5‚ 2013 Kathleen O’Keefe Week 2 Text Problem Set Chapter 5 4. Define the following terms: bond indenture‚ par value‚ principal‚ maturity‚ call provision‚ and sinking fund. • Bond indenture: A contract for a bond defining specified terms for interest and borrowed capital to be repaid to the lender. • Par value: “Specifies the amount of money that must be repaid at the end of the bond’s life‚ which is also called face value
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something for $80 and sells it again for $90‚ so he makes again a profit of $10. Conclusion: The man makes an overall profit of $10 + $10 = $20. You can also look at the problem as follows: The total expenses are $60 + $80 = $140 and the total earnings are $70 + $90 = $160. The overall profit is therefore $160 - $140 = $20. 2. 100 Km/hr because that is the top speed of the bus. 3. The man had to reply the number of characters in the word the Doorman was asking. He should have replied "Three"
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questions: a. How do you interpret the intercept‚ and the coefficient of the factors? First‚ the P value for this model is less than .05 so this model is significant. Then we can figure out the P value for each factor is significant‚ which means Factor 1‚ 2‚ 3 and 4 do have some effects on Price. Price=110.70+48.5*F1+33.49*F2+57.20*F3-8.30*F4 It means every unit increased on factor1‚ the price of this house would be increase 48.5 units as well. If the value of factor2 (section and age) increase one unit
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ATILIM UNIVERSITY DEPARTMENT OF MATHEMATICS Math 211 - Discrete Mathematics with Applications 2010-2011 Fall Semester Problem Set I Prepared by Mehmet TURAN O−‚ Ω−‚ Θ− Notations 1. Let f and g be real valued functions defined on the same set of nonnegative real numbers. (a) Prove that if g(x) is O(f (x))‚ then f (x) is Ω(g(x)). (b) Prove that if f (x) is O(g(x)) and c is any nonzero ral number‚ then cf (x) is O(cg(x)). (c) Prove that if f (x) is O(h(x)) and g(x) is O(k(x))‚ then f (x) + g(x) is
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The Fundamentals of Written English‚ Comm. 117 Progressive Outline from Friday 25th January 2013 to Friday 3rd May 2013 Session One: Friday 25th January 2013‚ City Campus at Bretton Hall Building (BHB)‚ Room 330‚ from 5pm to 8pm‚ CRN: 26368 Objectives: to improve our critical thinking‚ to advance grammatical techniques that will enhance our essay writing skills and to more fully appreciate the values we learn daily and how they are still dominated by Eurocentric principles. 1/ Explain course
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“The Mats” I.SETTINGS: a.Place:Nana Emilia’s Houseb.Time: The time setting for the action is in the afternoon. This storyhappened somewhat between 1950’s up to the present time. There is nospecific season for the said story but the story evolves in the evening.II. CHARACTERS: a.Protagonist: Mr. Angeles b.Antagonist: Himself III. PLOT: a.Exposition: The story is started by Mr. Angeles who is coming home for hisperiodic inspection trip. Then he had written in Mariveles to Nana Emiliathat
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Microeconomics (Fall 2014) Simon Bowmaker Problem Set 6 Submit at lecture (Monday‚ November 10) Write your answers on separate sheets of paper. Please include: your name your recitation teacher’s name day and time of the recitation NB: if your recitation takes place on Monday morning‚ you must submit your assignment to your teacher at the beginning of the recitation. 1. Assume a monopolist faces the following market demand: Q = 100 - 2P. The monopolist’s total cost function is TC = 5+8Q2. What
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73-240 | Recitation A Problem Set 1 Problem 1: Nominal GDP‚ Real GDP‚ Price Indices‚ and Inflation A. Nominal GDP in Year 1 = $430 Nominal GDP in Year 2 = $617.50 Growth Rate of Nominal GDP = 44% B. RGDP(1) in Year 1 = $430 RGDP(1) in Year 2 = $410 RGDP(1) growth = -4.65% RGDP(2) in Year 1 = $655 RGDP(2) in Year 2 = $617.50 RGDP(2) growth = -5.73% The answer differs depending on which base year you use because the relative prices of the goods in comparison to each other (price
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Beer’s Law Problem Set Spring 2013 1. Calculate the absorbances corresponding to the following values of the percentage of transmitted light: (Provide your final answer with three decimal places) a. 95% b. 88% c. 71% d. 50% e. 17.5% f. 1% 2. A solution of a compound (1.0mM) was placed in a spectrophotometer cuvette of light path 1.05cm. The light transmission was 18.4% at 470nm. Determine the molar extinction coefficient. Include units in your answer. 3. The molar extinction coefficient of reduced
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