Difference between revisions of "Math 116: Essentials of Calculus"
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== Desired Learning Outcomes == | == Desired Learning Outcomes == | ||
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− | + | <div style="-moz-column-count:2; column-count:2;"> | |
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+ | # Review of Algebra (4 lectures) | ||
+ | # * Determine the graph of a line given two points, a point and a slope, the general form of a line, the slope-intercept form of a line | ||
+ | # * Determine the slope of a line given two coordinate points, the equation of a line given the slope and a point, equation of a line given two points, and the x- & y-intercept of a line | ||
+ | # * Find the secant line of a function on an interval, and use that to understand the average rate of change of a function | ||
+ | # * Approximate the tangent line at a point, and use that to understand the instantaneous rate of change of a function | ||
+ | # Limits and Derivatives (4 lectures) | ||
+ | # * Determine the limit of standard functions, e.g., polynomials, rational functions, exponentials, logarithms | ||
+ | # * Determine the limits of more complicated functions composed of simpler functions. | ||
+ | # * Define the derivative, take derivatives of polynomials using definition | ||
+ | # * Derive the differentiation rules for polynomials, exponentials, logarithms | ||
+ | # Product, Quotient, and Chain Rules (2 lectures) | ||
+ | # * Derive the product, quotient, and chain rules | ||
+ | # * Use the product, quotient, and chain rules to compute complicated derivatives composed of simpler functions | ||
+ | # Optimization and Applications (4 lectures) | ||
+ | # * State the derivative rules for local extreme | ||
+ | # * Use the derivative rules to find the local extrema of a function on an interval. Then find the global maximum (or minimum) of a function on an interval | ||
+ | # * Use the derivative to solve problems in business, e.g., maximize profits, minimize costs, etc. | ||
+ | # * Use Newton's method for root finding to locate local extrema. | ||
+ | |||
+ | </div> | ||
Revision as of 18:49, 28 January 2011
Contents
Catalog Information
Title
Essentials of Calculus
(Credit Hours:Lecture Hours:Lab Hours)
(1:1:0)
Offered
Fall, Winter
Prerequisite
Math 110
Description
This course gives a brief overview of differential calculus. Topics covered include limits, derivatives, and applications of differentiation to optimization of functions.
Desired Learning Outcomes
- Review of Algebra (4 lectures)
- * Determine the graph of a line given two points, a point and a slope, the general form of a line, the slope-intercept form of a line
- * Determine the slope of a line given two coordinate points, the equation of a line given the slope and a point, equation of a line given two points, and the x- & y-intercept of a line
- * Find the secant line of a function on an interval, and use that to understand the average rate of change of a function
- * Approximate the tangent line at a point, and use that to understand the instantaneous rate of change of a function
- Limits and Derivatives (4 lectures)
- * Determine the limit of standard functions, e.g., polynomials, rational functions, exponentials, logarithms
- * Determine the limits of more complicated functions composed of simpler functions.
- * Define the derivative, take derivatives of polynomials using definition
- * Derive the differentiation rules for polynomials, exponentials, logarithms
- Product, Quotient, and Chain Rules (2 lectures)
- * Derive the product, quotient, and chain rules
- * Use the product, quotient, and chain rules to compute complicated derivatives composed of simpler functions
- Optimization and Applications (4 lectures)
- * State the derivative rules for local extreme
- * Use the derivative rules to find the local extrema of a function on an interval. Then find the global maximum (or minimum) of a function on an interval
- * Use the derivative to solve problems in business, e.g., maximize profits, minimize costs, etc.
- * Use Newton's method for root finding to locate local extrema.
Prerequisites
Math 110
Minimal learning outcomes
Textbooks
Possible textbooks for this course include (but are not limited to):