develop responses to the essential question listed below. How can a Greatest Common Factor be separated from an expression? By simplifying the equation . By breaking them up by dividing them up What methods can be used to rewrite square trinomials and difference of squares binomials as separate factors? distribution in what conditions can a factored expression be factored further? Greatest Common Factor A greatest common factor of two or more terms is the largest factor that all terms have in common
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all of these equations we are finding the factor for the answer. We are using grouping‚ GCF‚ prime factor‚ and perfect square as well in these set equations. Page 345 - 346 #52. Using (45) as the product and (18) as the sum. 18z + 45 + z^2 Equation (z + 15)(z + 3) Answer Breaking it down using the FOIL method to verify the answer: z * z = z^2 This is a perfect square. 15 * z = 15z z * 3 = 3z 15 * 3 = 45 In this equation to get the answer we need to use the GCF (Greatest Common Factor)
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learn to factor quadratics‚ there are three other formulas that they usually introduce at the same time. The first is the "difference of squares" formula. Remember from your translation skills that "difference" means "subtraction". So a difference of squares is something that looks like x2 – 4. That’s because 4 = 22‚ so you really have x2 – 22‚ a difference of squares. To factor this‚ do your parentheses‚ same as usual: x2 – 4 = (x )(x ) You need factors of –4 that add up to zero‚ so use
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dsprice/dlivarea = 2*212.611LIVAREA = 425.22LIVAREA i) If livarea= 1500 square feet‚ then dprice/dlivarea= 425.22*15= $6378.3 If livarea= 1600 square feet‚ the dprice/dlivarea= 425.22*16= $6803.52 The marginal effect of an additional 100 square feet of living area for a home is $425.22. j) The quadratic model fits better k) gen lnprice=ln(price) reg lnsprice livarea l) ln(SPRICE) = 10.697 + 0.056*LIVAREA m) Every additional square meter in the living area increases the selling price by about
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Review of Algebra 2 s REVIEW OF ALGEBRA Review of Algebra q q q q q q q q q q q q q q q Here we review the basic rules and procedures of algebra that you need to know in order to be successful in calculus. Arithmetic Operations The real numbers have the following properties: a b b a ab a b c a b ab c ab ac In particular‚ putting a b and so b c b c ba c (Commutative Law) (Associative Law) (Distributive law) ab c a bc 1 in the
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Architectural Programming Introduction Architectural programming began when architecture began. Structures have always been based on programs: decisions were made‚ something was designed‚ built and occupied. In a way‚ archaeologists excavate buildings to try to determine their programs. Today‚ we define architectural programming as the research and decision-making process that identifies the scope of work to be designed. Synonyms include "facility programming‚" "functional and operational requirements
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b. correlation equation c. estimated regression equation d. regression model ANS: A 6. a. b. c. d. ANS: C 7. a. b. c. d. In regression analysis‚ the unbiased estimate of the variance is coefficient of correlation coefficient of determination mean square error slope of the regression equation The model developed from sample data that has the form of is known as regression equation correlation equation estimated regression equation regression model In regression analysis‚ the model in the form is called
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A Report on PATH PLANNING OF MOBILE ROBOT By |Names of the students |ID Nos. |Disciplines | |Rohit Ginoria |2006A4PS228P |B.E. (Hons.)Mechanical Engineering | Prepared in partial fulfilment of Lab. Oriented Project Under the guidance
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ELE374 Fourier Analysis and Synthesis of Waveforms. By Anthony Njuguna EE08U122 – 080947424 Anthony Njuguna ee08u122 Abstract Many applications in communication and systems are concerned with propagation of signals through networks. The resultant output signal is dependent on the properties of both the input signal and the processes acting on the signal. This is a laboratory Report will be focusing on using Fourier series to analyze waveforms and the synthesis of waveforms. The report highlights
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size. Bob would like to know which size of pizza has the lowest cost per square inch. a. Identify the inputs and outputs for this problem. Inputs: diameter and cost of each of three different size pizzas Output: size of pizza with the lowest cost per square inch b. Identify the processing needed to convert the inputs to the outputs. Area of each pizza in square inches = pi * (diameter / 2) 2 Cost per square inch = cost / area c. Design an algorithm in pseudocode to solve this
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