national council of teachers of mathematics nctm principles and process standards worksheet

... isoforms of Sp3 exist and that these different isoforms play different roles in the activation and repression of transcription [9]. In our hands, Sp1 generated a single band and Sp3 generated two bands ... progression of the cell cycle and the differentiation of cells [11,12]. The methylation of DNA plays a role in the regulation of gene expression [13,14], genomic imprinting [15] and inactivation of the ... 269) 2965 sites of initiation of transcription of Dnmt1 [24] might have been a mistake and that there is a single site only [23]. To understand the regulation of expression of the Dnmt1 gene...

... performance of the visual system. It is assumed to be a subjectively and objectively measurable criterion that is of particular value of ascertaining long- term adaptive processes of the visual ... may move out of the screen plane depending on the disparity of the object on the screen. This decoupling of convergence and accommodation is a potential source of visual discomfort and may result ... P-values of two ways ANOVA (“Camera baseline” and “Scene”) 113 Table 5-7 : P-values of two ways ANOVA (“DOF” and “Scene”) 113 Table 5-8 : Correlation coefficients among three pairs of subjective...

... parts of speech to special or exceptional words. Other words are split into affix and kernel parts and assigned a part of speech on the basis of the part -of- speech implications of the affixes and ... Summary The net result of the part -of- speech studies is an algorithm which, used in conjunction with a dictionary of less than one thousand words and an affix list of less than two hundred, ... accuracy. DETERMINATION OF PARTS OF SPEECH 55 DETERMINATION OF PARTS OF SPEECH 65 [Mechanical Translation and Computational Linguistics, vol.10, nos.3/4, September and December 1967] ...

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 5Of+ 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 5Of+ 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 5Of+ 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...

... rice left. (không phải là: There is not much of rice left.) A lot of - lots of Không có sự khác nhau nhiều giữa a lot of và lots of. A lot of và lots of đều mang tính chất thân mật, suồng sã, ... credit cards. A large amount of, a great deal of , a large number of Cách diễn đạt này mang tính tương đối trang trọng. Sau A large amount of và a great deal of là danh từ không đếm được. ... Không có sự khác nhau nhiều giữa a lot of và lots of. A lot of và lots of đều mang tính chất thân mật, suồng sã, đứng trước danh từ không đếm được, danh...

... or disability (11% of males and 7% of females) and looking after family or home (1% of males and 19% of females). Probably, this might explain some of the interaction. Policy and practice implications Based ... Health and Quality of Life Outcomes 2009, 7:50 http://www.hqlo.com/content/7/1/50 Page 4 of 11 (page number not for citation purposes) Table 1: Unadjusted mean and standard deviation of PCS-12 and ... quality of life (HRQOL) in a large sample of Australian chronically-ill patients and investigate the impact of characteristics of patients and their general practices on their HRQOL and to assess...

... Quality of life in parents of chronically ill children: standardized Regression Coefficients and Percentage of explained variance of the modified model. The model explains 21% and 20% of the ... Quality of life in parents of chron- ically ill children: standardized Regression Coefficients and Percent- age of Explained Variance of the Modified Model. Table showing the Predictive model of ... analyzed and inter- preted the data and drafted the manuscript. HM analyzed and interpreted data, drafted and revised the manuscript. HH supervised design and execution of the study and revised...

... reduction of the sexual activity aft er radiotherapy and a significant rise of sexual sym p- tom scores [11]. 4.2 Results of continence 4.2.1 Status of early and late continence 69.2% of all operated ... - Pre- and postoperative scores of the EORTC QLQ-C30 and QLQ-PR25. Health and Quality of Life Outcomes 2011 9:93. Submit your next manuscript to BioMed Central and take full advantage of: ã ... of other studies. This represents a reliable and comparable status of continence in our patients after retropubic prostatectomy. Loss of blood, body-mass index, age of the patient and state of...

... article as: Farin and Meder: Personality and the physician- patient relationship as predictors of quality of life of cardiac patients after rehabilitation. Health and Quality of Life Outcomes ... the model Farin and Meder Health and Quality of Life Outcomes 2010, 8:100 http://www.hqlo.com/content/8/1/100 Page 6 of 11 21. Julkunen J, Ahlstrom R: Hostility, anger, and sense of coherence as predictors ... fluctuated between 1.3% and 2.9% and is thus generally greater than the increase in explanation of variance by the characteristics of the disease. The relevance of this block of variables is mainly...

... implies that 0 ≤ u k k ≤ ε  ϕ ε on D and so 0 ≤ u 1 ≤ ε  ϕ ε on D. Thereby, the continuity of ϕ ε in every dense point of the boundary of D and the arbitrariness of ε guarantee that u 1 ∈ C 0 D. Finally, ... A. Khan, J. J. Nieto, and V. Otero-Espinar, “Existence and approximation of solution of three-point boundary value problems on time scale,” Journal of Difference Equations and Applications, vol. ... 1.1 arises in the study of gas dynamics and fluids mechanics, and in the study of relativistic mechanics, nuclear physics, and chemically reacting system see, e.g., 1 and the references therein...

... Cangul, 1 and Yilmaz Simsek 2 1 Department of Mathematics, Faculty of Arts and Science, University of Uludag, 16059 Bursa, Turkey 2 Department of Mathematics, Faculty of Arts and Science, University of ... He gave a different proof of complete sums of products of higher order q-Bernoulli polynomials. In 21, Jang et al. gave complete sums of products of Bernoulli polynomials and Frobenious Euler ... polynomials and numbers Here, we study on higher-order twisted h, q-Euler polynomials and numbers and complete sums of products of these polynomials and numbers, our method is similar to that of 11.For constructions...

... their fixed points, it is of theoretical and practical importance to compare the rate of convergence of these iterations, and to find out, if possible, which one of them converges faster. Recent works ... (4.3) (iv) The comparison of the fastness of first 10 iterates of the Krasnoselskij, Mann, and Ishikawa iterations to the fixed point x ∗ = 1isgiveninTable 4.1 with x 0 = 1.9, and α n = 1/(n +58)with 0 = ... L)  ·   x n −x ∗   . (3.7) 2 Comparison of fastness of the convergence Now, the interest of this paper is to compare the fastness of the convergence to the fixed point among the Krasnoselskij, Mann, and Ishikawa iterations...

... definitions of positive and negative semicycles of a solution of (1.5) relative to an equilibrium point ¯ x. A positive semicycle ofasolution{x n } of (1.5) consists of a “string” of terms {x l , x l+1 , ... Department of Mathematics, University of Rhode Island, Kingston, RI 02881-0816, USA E-mail address: senadak@pmf.unsa.ba M. R. S. Kulenovi ´ c: Department of Mathematics, University of Rhode Island, ... asymptotic behavior of solutions of (1.4). 5. Rate of convergence of (1.1) Consider (1.1) where the parameters α, β, γ, A, B,andC are nonnegative real numbers and the initial conditions x −1 and x −2 are...