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# MTH 161 - Analytic Geometry and Calculus I

Credits: 4
Instructional Contact Hours: 4

Includes functions, graphs, limits, continuity, derivatives and their applications, integrals, as well as differentiation and integration of exponential and logarithmic functions. A GRAPHING CALCULATOR IS REQUIRED.

Prerequisite(s): MTH 151  with a grade of “C” or better, or both MTH 121 and MTH 122W with grades of “C” or better, or four years of high school college-preparatory mathematics including trigonometry.
Corequisite(s): None
Lecture Hours: 60 Lab Hours: 0
Meets MTA Requirement: Math
Pass/NoCredit: Yes

Outcomes and Objectives
1. Demonstrate understanding of limits.
1. Evaluate limits symbolically, numerically and graphically with and without technology.
2. Discuss the definition of the limit.
3. Explain the relationship between limits and other concepts including continuity, derivatives, and integrals.
4. Use L’Hopital’s Rule to evaluate limits.
2. Demonstrate understanding of derivatives.
1. State the definition of the derivative.
2. Determine where a function is differentiable and where it is not differentiable.
3. Compute elementary derivatives using the limit definition.
4. Compute derivatives symbolically, numerically and graphically without technology. Elementary derivatives include polynomials, powers, exponential and logarithmic functions, and trigonometric and inverse trigonometric functions.
5. Compute derivatives using the power rule, product rule, quotient rule, chain rule and implicit differentiation without technology.
6. Explain the relationship between a function and its derivatives in a graphical setting.
7. Use derivatives to solve applied problems including related rates, optimization, and differentials.
3. Demonstrate understanding of integrals.
1. Define the definite integral using the concept of a limit.
2. Determine the antiderivative of several elementary functions.
3. Demonstrate an understanding of the Riemann Sum definition of integrals.
4. Explain the Fundamental Theorem of Calculus and its importance.
5. Evaluate definite and indefinite integrals using antiderivatives and substitution.
6. Use appropriate approximation techniques to estimate integrals.
7. Use integration techniques to solve applied problems.
4. Use technology appropriately to do mathematics.
1. Evaluate limits.
2. Numerically estimate the values of derivatives.
3. Estimate definite integrals.
4. Use tables.
5. Graph a variety of functions.