Difference between revisions of "MAT1213"

Latest revision as of 14:28, 31 March 2023

The textbook for this course is Calculus (Volume 1) by Gilbert Strang, Edwin Herman, et al.

A comprehensive list of all undergraduate math courses at UTSA can be found here.

The Wikipedia summary of calculus and its history.

Topics List

Date	Sections	Topics
Week 1	2.2	The Limit of a Function
Week 1 & 2	2.3	The Limit Laws
Week 2	2.4	Continuity
Week 3	4.6	Limits at Infinity and Asymptotes
Week 3 & 4	3.1	Defining the Derivative
Week 4	3.2	The Derivative as a Function
Week 5	3.3	Differentiation Rules
Week 5	3.4	Derivative as a rate of change
Week 5	3.5	Derivatives of the Trigonometric Functions
Week 6	3.6	The Chain Rule
Week 6	3.7	Derivatives of Inverse Functions
Week 6/7	3.8	Implicit Differentiation
Week 8	3.9	Derivatives of Exponential and Logarithmic Functions
Week 9	4.1	Related Rates
Week 9	4.3	Maxima and Minima
Week 10	4.4	Mean Value Theorem
Week 10	4.5	Derivatives and the Shape of a Graph
Week 11	4.7	Applied Optimization Problems
Week 12	4.8	L’Hôpital’s Rule
Week 13	4.10	Antiderivatives
Week 13	5.1	Approximating Areas
Week 14	5.2	The Definite Integral
Week 15	5.3	The Fundamental Theorem of Calculus
Week 15	5.4	Integration Formulas and the Net Change Theorem

Difference between revisions of "MAT1213"

Latest revision as of 14:28, 31 March 2023

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@@ Line 5: / Line 5: @@
 The Wikipedia summary of [https://en.wikipedia.org/wiki/Calculus  calculus and its history].
 ==Topics List==
-==Topics List==
+{| class="wikitable"
-{| class="wikitable sortable"
 ! Date !! Sections !! Topics !! Prerequisite Skills !! Student Learning Outcomes
-|-
-|Week 1
-||
-.2
-||
-[[The Limit of a Function]]
-||
-* [[Functions|Evaluation of a function]]  including the [[Absolute Value Functions| Absolute Value]] , [[Rational Functions|Rational]] , and [[Piecewise Functions|Piecewise]] functions
-* [[Functions|Domain and Range of a Function]]
-||
-*Describe the limit of a function using correct notation.
-*Use a table of values to estimate the limit of a function or to identify when the limit does not exist.
-*Use a graph to estimate the limit of a function or to identify when the limit does not exist.
-*Define one-sided limits and provide examples.
-*Explain the relationship between one-sided and two-sided limits.
-*Describe an infinite limit using correct notation.
-*Define a vertical asymptote.
 |-
+| Week 1 || 2.2 || [[The Limit of a Function]]  || ||
-|Week 1/2
-||
-.3
-||
-[[The Limit Laws]]
-||
-*[[Factoring Polynomials]]
-*[[Simplifying Radicals|Identifying conjugate radical expressions]]
-*[[Rational Expression|Simplifying rational expressions]]
-*[[Domain of a Function|Evaluating piecewise functions]]
-*[[Trigonometric Functions|The trigonometric functions]]
-||
-*Recognize the basic limit laws.
-*Use the limit laws to evaluate the limit of a function.
-*Evaluate the limit of a function by factoring.
-*Use the limit laws to evaluate the limit of a polynomial or rational function.
-*Evaluate the limit of a function by factoring or by using conjugates.
-*Evaluate the limit of a function by using the squeeze theorem.
-*Evaluate left, right, and two sided limits of piecewise defined functions.
-*Evaluate limits of the form K/0, K≠0.
-*Establish  and use this to evaluate other limits involving trigonometric functions.
 |-
+| Week 1 & 2 || 2.3 || [[The Limit Laws]]   || ||
-|Week 2/3
-||
-.4
-||
-[[Continuity]]
-||
-* [[Functions|Domain and Range of a Function]]
-* [[Interval Notation|Interval Notation]]
-* [[Limits of Functions|Evaluate limits]]
-* [[The Limit Laws]]
-* [[Polynomial Functions|Finding roots of a function]]
-||
-* Continuity at a point.
-* Describe three kinds of discontinuities.
-* Define continuity on an interval.
-* State the theorem for limits of composite functions and use the theorem to evaluate limits.
-* Provide an example of the intermediate value theorem.
 |-
+| Week 2 || 2.4 || [[Continuity]]   || ||
-|Week 3
-||
-.6
-||
-[[Limits at Infinity and Asymptotes]]
-||
-* [[The Limit Laws]]
-* [[Continuity]]
-||
-* Calculate the limit of a function that is unbounded.
-* Identify a horizontal asymptote for the graph of a function.
 |-
+| Week 3 || 4.6 || [[Limits at Infinity and Asymptotes]]   || ||
-|Week 3/4
-||
-.1
-||
-[[Defining the Derivative]]
-||
-* [[Functions|Evaluation of a function at a value]]
-* [[Linear Functions and Slope|The equation of a line and its slope]]
-* [[Limits of Functions|Evaluating limits]]
-* [[Continuity]]
-||
-* Recognize the meaning of the tangent to a curve at a point.
-* Calculate the slope of a secant line (average rate of change of a function over an interval).
-* Calculate the slope of a tangent line.
-* Find the equation of the line tangent to a curve at a point.
-* Identify the derivative as the limit of a difference quotient.
-* Calculate the derivative of a given function at a point.
 |-
+| Week 3 & 4 || 3.1 || [[Defining the Derivative]]   || ||
-|Week 4
-||
-.2
-||
-[[The Derivative as a Function]]
-||
-* [[Functions and their graphs|Graphing Functions]]
-* [[Continuity|Continuity of a function at a point]]
-* [[Defining the Derivative|The derivative represents the slope of the curve at a point]]
-* [[Limits of Functions|When a limit fails to exist]]
-* [[The Limit Laws]]
-||
-* Define the derivative function of a given function.
-* Graph a derivative function from the graph of a given function.
-* State the connection between derivatives and continuity.
-* Describe three conditions for when a function does not have a derivative.
-* Explain the meaning of and compute a higher-order derivative.
 |-
+| Week 4 || 3.2 || [[The Derivative as a Function]]   || ||
-|Week 4/5
-||
-.3
-||
-[[Differentiation Rules]]
-||
-* [[Simplifying Radicals|Radical & Rational Exponents]]
-* [[Simplifying Exponents|Re-write negative exponents]]
-* [[The Limit Laws]]
-* [[The Derivative as a Function]]
-||
-* State the constant, constant multiple, and power rules.
-* Apply the sum and difference rules to combine derivatives.
-* Use the product rule for finding the derivative of a product of functions.
-* Use the quotient rule for finding the derivative of a quotient of functions.
-* Extend the power rule to functions with negative exponents.
-* Combine the differentiation rules to find the derivative of a polynomial or rational function.
 |-
+| Week 5 || 3.3 || [[Differentiation Rules]]   || ||
-|Week 5
-||
-.4
-||
-[[Derivatives_Rates_of_Change|Derivatives as Rates of Change]]
-||
-* [[Functions|Function evaluation at a value]]
-* [[Solving Equations and Inequalities|Solving an algebraic equation]]
-* '''[[Understanding of Velocity and Acceleration]]'''
-* [[Differentiation Rules]]
-||
-* Determine a new value of a quantity from the old value and the amount of change.
-* Calculate the average rate of change and explain how it differs from the instantaneous rate of change.
-* Apply rates of change to displacement, velocity, and acceleration of an object moving along a straight line.
-* Predict the future population from the present value and the population growth rate.
-* Use derivatives to calculate marginal cost and revenue in a business situation.
 |-
+| Week 5 || 3.4 || [[Derivatives_Rates_of_Change | Derivative as a rate of change]]  || ||
-|Week 5
-||
-.5
-||
-[[Derivatives of the Trigonometric Functions]]
-||
-* [[Properties of the Trigonometric Functions|Trigonometric identities]]
-* [[Graphs of the Sine and Cosine Functions]]
-* [[Graphs of the Tangent, Cotangent, Cosecant and Secant Functions]]
-* [[Differentiation Rules|Rules for finding Derivatives]]
-||
-* Find the derivatives of the sine and cosine function.
-* Find the derivatives of the standard trigonometric functions.
-* Calculate the higher-order derivatives of the sine and cosine.
 |-
+| Week 5 || 3.5 || [[Derivatives of the Trigonometric Functions]]   || ||
-|Week 6
-||
-.6
-||
-[[Chain_Rule|The Chain Rule]]
-||
-* [[Composition of Functions]]
-* [[Trigonometric Equations|Solve Trigonometric Equations]]
-* [[Differentiation Rules|Rules for finding Derivatives]]
-* [[Derivatives of the Trigonometric Functions]]
-||
-* State the chain rule for the composition of two functions.
-* Apply the chain rule together with the power rule.
-* Apply the chain rule and the product/quotient rules correctly in combination when both are necessary.
-* Recognize and apply the chain rule for a composition of three or more functions.
-* Use interchangeably the Newton and Leibniz Notation for the Chain Rule.
 |-
+| Week 6 || 3.6 || [[Chain_Rule | The Chain Rule]]   || ||
-|Week 6
-||
-.7
-||
-[[Derivatives of Inverse Functions]]
-||
-* [[One-to-one functions|Injective Functions]]
-* [[Inverse Functions]] <!-- 1073-7 -->
-* [[Inverse Trigonometric Functions|Customary domain restrictions for Trigonometric Functions]]
-* [[Differentiation Rules]]
-* [[The Chain Rule]]
-||
-* State the Inverse Function Theorem for Derivatives.
-* Apply the Inverse Function Theorem to find the derivative of a function at a point given its inverse and a point on its graph.
-* Derivatives of the inverse trigonometric functions.
 |-
+| Week 6 || 3.7 || [[Derivatives of Inverse Functions]]   || ||
-|Week 6/7
-||
-.8
-||
-[[Implicit Differentiation]]
-||
-* '''[[Implicit and explicit equations]]'''
-* [[Linear Equations|Linear Functions and Slope]]
-* [[Functions|Function evaluation]]
-* [[Differentiation Rules]]
-* [[The Chain Rule]]
-||
-* Assuming, for example, y is implicitly a function of x, find the derivative of y with respect to x.
-* Assuming, for example, y is implicitly a function of x, and given an equation relating y to x, find the derivative of y with respect to x.
-* Find the equation of a line tangent to an implicitly defined curve at a point.
 |-
+| Week 6/7 || 3.8 || [[Implicit Differentiation]]   || ||
-|Week 7
-||
-.9
-||
-[[Derivatives of Exponential and Logarithmic Functions]]
-||
-* [[Logarithmic Functions|Properties of logarithms]] <
-* [[The Limit of a Function]]
-* [[Differentiation Rules]]
-* [[The Chain Rule]]
-* [[Implicit Differentiation]]
-||
-* Find the derivative of functions that involve exponential functions.
-* Find the derivative of functions that involve logarithmic functions.
-* Use logarithmic differentiation to find the derivative of functions containing combinations of powers, products, and quotients.
 |-
+| Week 8 || 3.9 || [[Derivatives of Exponential and Logarithmic Functions]]   || ||
-|Week 7/8
-||
-.1
-||
-[[Related Rates]]
-||
-* '''Formulas for area, volume, etc'''
-* '''Similar triangles to form proportions'''
-* [[Trigonometric Functions]] <!-- 1093-2.2 -->
-* [[Properties of the Trigonometric Functions|Trigonometric Identities]]
-* [[Differentiation Rules]]
-* [[Implicit Differentiation]]
-||
-* Express changing quantities in terms of derivatives.
-* Find relationships among the derivatives in a given problem.
-* Use the chain rule to find the rate of change of one quantity that depends on the rate of change of other quantities.
 |-
+| Week 9 || 4.1 || [[Related Rates]]   || ||
-|Week 8
-||
-.2
-||
-[[Linear Approximations and Differentials]]
-||
-* [[Mathematical Error| Definition of Error in mathematics]]
-* [[Linear Equations|Slope of a Line]]
-* [[Defining the Derivative|Equation of the tangent line]]
-* [[Derivatives Rates of Change|Leibnitz notation of the derivative]]
-||
-* Approximate the function value close to the center of the linear approximation using the linearization.
-* Given an expression to be evaluated/approximated, come up with the function and its linearization
-* Understand the formula for the differential; how it can be used to estimate the change in the dependent variable quantity, given the small change in the independent variable quantity.
-* Use the information above to estimate potential relative (and percentage) error
 |-
+| Week 9 || 4.3 || [[Maxima and Minima]]   || ||
-|Week 8/9
-||
-.3
-||
-[[Maxima and Minima]]
-||
-* [[The First Derivative Test|Increasing and decreasing functions]]
-* [[Solving Equations and Inequalities|Solve an algebraic equation]]
-* [[Interval Notation|Interval notation]]
-* [[Trigonometric Equations]]
-* [[Differentiation Rules]]
-* [[Derivatives of the Trigonometric Functions]]
-* [[Derivatives of Exponential and Logarithmic Functions]]
-* [[Continuity]]
-||
-*
-* Know the definitions of absolute and local extrema.
-* Know what a critical point is and locate it (them).
-* Use the Extreme Value Theorem to find the absolute extrema of a continuous function on a closed interval.
 |-
+| Week 10 || 4.4 || [[Mean Value Theorem]]   || ||
-|Week 9
-||
-.4
-||
-[[Mean Value Theorem]]
-||
-* [[Functions|Evaluating Functions]]
-* [[Continuity]]
-* [[Defining the Derivative|Slope of a Line]]
-||
-* Determine if the MVT applies given a function on an interval.
-* Find c in the conclusion of the MVT (if algebraically feasible)
-* Know the first 3 Corollaries of MVT (especially the 3rd)
 |-
+| Week 10 || 4.5 || [[Derivatives and the Shape of a Graph]]   || ||
-|Week 9
-||
-.5
-||
-[[Derivatives and the Shape of a Graph]]
-||
-* [[Functions|Evaluating Functions]]
-* [[Maxima and Minima|Critical Points of a Function]]
-* [[Derivatives and the Shape of a Graph|Second Derivatives]]
-||
-* Use the First Derivative Test to find intervals on which the function is increasing and decreasing and the local extrema and their type
-* Use the Concavity Test (aka the Second Derivative Test for Concavity) to find the intervals on which the function is concave up and down, and point(s) of inflection
-* Understand the shape of the graph, given the signs of the first and second derivatives.
 |-
+| Week 11 || 4.7 || [[Applied Optimization Problems]]   || ||
-|Week 10
-||
-.7
-||
-[[Applied Optimization Problems]]
-||
-* '''Formulas pertaining to area and volume'''
-* [[Functions|Evaluating Functions]]
-* [[Trigonometric Equations]]
-* [[Maxima and Minima|Critical Points of a Function]]
-||
-* Set up a function to be optimized and find the value(s) of the independent variable which provide the optimal solution.
 |-
+| Week 12 || 4.8 || [[L’Hôpital’s Rule]]   || ||
-|Week 10
-||
-.8
-||
-[[L’Hôpital’s Rule]]
-||
-* [[Rational Functions| Re-expressing Rational Functions ]]
-* [[The Limit of a Function|When a Limit is Undefined]]
-* [[The Derivative as a Function]]
-||
-* Identify indeterminate forms produced by quotients, products, subtractions, and powers, and apply L’Hôpital’s rule in each case.
-* Recognize when to apply L’Hôpital’s rule.
 |-
+| Week 13 || 4.10 || [[Antiderivatives]]   || ||
-|Week 11
-||
-.10
-||
-[[Antiderivatives]]
-||
-* [[Inverse Functions]]
-* [[The Derivative as a Function]]
-* [[Differentiation Rule]]
-* [[Derivatives of the Trigonometric Functions]]
-||
-* Find the general antiderivative of a given function.
-* Explain the terms and notation used for an indefinite integral.
-* State the power rule for integrals.
-* Use anti-differentiation to solve simple initial-value problems.
 |-
+| Week 13 || 5.1 || [[Approximating Areas]]   || ||
-|Week 11/12
-||
-.1
-||
-[[Approximating Areas]]
-||
-* '''[[Sigma notation]]'''
-* '''[[Area of a rectangle]]'''
-* [[Continuity]]
-* [[Toolkit Functions]]
-||
-* Calculate sums and powers of integers.
-* Use the sum of rectangular areas to approximate the area under a curve.
-* Use Riemann sums to approximate area.
 |-
+| Week 14 || 5.2 || [[The Definite Integral]]   || ||
-|Week 12
-||
-.2
-||
-[[The Definite Integral]]
-||
-* [[Interval Notation|Interval notation]]
-* [[Antiderivatives]]
-* [[The Limit of a Function|Limits of Riemann Sums]]
-* [[Continuity]]
-||
-* State the definition of the definite integral.
-* Explain the terms integrand, limits of integration, and variable of integration.
-* Explain when a function is integrable.
-* Rules for the Definite Integral.
-* Describe the relationship between the definite integral and net area.
-* Use geometry and the properties of definite integrals to evaluate them.
-* Calculate the average value of a function.
 |-
+| Week 15 || 5.3 || [[The Fundamental Theorem of Calculus]]   || ||
-|Week 12/13
-||
-.3
-||
-[[The Fundamental Theorem of Calculus]]
-||
-* [[The Derivative as a Function|The Derivative of a Function]]
-* [[Antiderivatives]]
-* [[Mean Value Theorem]]
-* [[Inverse Functions]]
-||
-* Describe the meaning of the Mean Value Theorem for Integrals.
-* State the meaning of the Fundamental Theorem of Calculus, Part 1.
-* Use the Fundamental Theorem of Calculus, Part 1, to evaluate derivatives of integrals.
-* State the meaning of the Fundamental Theorem of Calculus, Part 2.
-* Use the Fundamental Theorem of Calculus, Part 2, to evaluate definite integrals.
-* Explain the relationship between differentiation and integration.
 |-
+| Week 15 || 5.4 || [[Integration Formulas and the Net Change Theorem]]   || ||
-|Week 13
-||
-.4
-||
-[[Integration Formulas and the Net Change Theorem]]
-||
-* [[Antiderivatives|Indefinite integrals]]
-* [[The Fundamental Theorem of Calculus|The Fundamental Theorem (part 2)]]
-||
-* Apply the basic integration formulas.
-* Explain the significance of the net change theorem.
-* Use the net change theorem to solve applied problems.
-* Apply the integrals of odd and even functions.
-|-
-|Week 14
-||
-.5
-||
-[[Integration by Substitution]]
-||
-* [[The Definite Integral|Solving Basic Integrals]]
-* [[The Derivative as a Function|The Derivative of a Function]]
-* '''[[Change of Variables]]'''
-||
-* Use substitution to evaluate indefinite integrals.
-* Use substitution to evaluate definite integrals.
-|-
-|Week 14/15
-||
-.6
-||
-[[Integrals Involving Exponential and Logarithmic Functions]]
-||
-* [[Exponential Functions]]
-* [[Logarithmic Functions]]
-* [[Differentiation Rules]]
-* [[Antiderivatives]]
-||
-* Integrate functions involving exponential functions.
-* Integrate functions involving logarithmic functions.
-|-
-|Week 15
-||
-.7
-||
-[[Integrals Resulting in Inverse Trigonometric Functions]]
-||
-* [[The inverse sine, cosine and tangent functions|Trigonometric functions and their inverses]]
-* [[One-to-one functions|Injective Functions]]
-* [[The Definite Integral|Rules for Integration]]
-||
-* Integrate functions resulting in inverse trigonometric functions.
 |}