# Students at the End of This GradeTerm Paper

Pages: 3 (944 words)  ·  Bibliography Sources: 4  ·  File: .docx  ·  Level: College Senior  ·  Topic: Education - Mathematics

for \$19.77
Students at the end of this grade level must be able to investigate and solve step and piecewise functions. This means that they must be able to write absolute value functions as piecewise functions. Piecewise functions that students must be able to explain include domain, range, vertex, axis of symmetry, intercepts, extrema, and points of discontinuity. Students must show the ability to solve absolute value equations and inequalities analytically and graphically.

Standard 2: Students must be able to explore exponential functions. This includes the ability to extend properties of exponents to include all integer exponents. They must also be able to solve exponential equations and inequalities of relative simplicity both analytically and graphically. Students must demonstrate an understanding and ability to use basic exponential functions to model reality.

Standard 3: Students must be able to solve quadratic equations and inequalities in one variable. This involves finding real and complex solutions to mathematical equations by means of processes such as factoring, square roots, and the application of the quadratic formula. They must be able to analyze the nature of roots by means of technology and the discriminant. They must be able to describe their solutions by means of linear inequalities.

Standard 4: Students must be able to explore inverses of functions. This includes a discussion of functions and their inverses, by means of concepts such as one-to-oneness, domain, and range. Students must demonstrate an ability to determine the inverses of linear, quadratic and power functions, including restricted domains. They must also be familiar with the use of graphs to determine functions and their inverses. Composition must be used to verify the relationship between functions and their inverses.

Standard 1: Students must be able to analyze a higher degree of polynomial function graphs. This means that they must be able to graph simple polynomial functions and understand the effects of elements such as degree, lead coefficient, and multiplicity of real zeros on the graph. Students must also be able to determine the symmetry of polynomial functions in terms of their nature as even, odd, or neither. They must also demonstrate an ability to explain polynomial functions by referring to elements such as domain and range, intercepts, zeros, relative and absolute extreme, and end behavior.

Standard 2: Students at the end of this grade level must show an ability to explore and understand logarithmic functions as inverses of exponential functions. This includes the definition and understanding of nth root functions, as well as extending the properties of exponents to include rational exponents. Students must be able to extend the laws of exponents in order to understand and use the properties of logarithms.

Standard 3: Students must be able to penetrate various equations and inequalities by finding real and complex roots of higher degree polynomial equations. They must demonstrate an ability… [END OF PREVIEW] . . . READ MORE

### Two Ordering Options:

1.  Buy full paper (3 pages)

- or -

2.  Write a NEW paper for me!✍🏻

#### Student Unit Assessment: Making Healthy Choices Pre Discussion and Results Chapter…

Cite This Term Paper:

APA Format

Students at the End of This Grade.  (2010, July 14).  Retrieved January 26, 2020, from https://www.essaytown.com/subjects/paper/students-end-grade/66870

MLA Format

"Students at the End of This Grade."  14 July 2010.  Web.  26 January 2020. <https://www.essaytown.com/subjects/paper/students-end-grade/66870>.

Chicago Format

"Students at the End of This Grade."  Essaytown.com.  July 14, 2010.  Accessed January 26, 2020.