General Information about the Fall 2025 MATH 2301 Final Exam

• When, Where: Exam is Thursday, December 11, 2025 in Morton Hall on the Athens Campus of Ohio University
  • For students without testing accommodations, the exam will run from 7pm to 9pm in the following rooms.
    • Students of Mark Barsamian will take their exam at 7pm in Morton 201.
    • Students of Steve Shadik will take their exam at 7pm in Morton 235.
    • Students of Blake Regan will take their exam at 7pm in Morton 237.
  • All students with testing accommodations will take their exam at 6pm in Morton 115.
    • Your instructor must have been previously notified of your testing accommodations.
• Restrictions: No Books, No Notes, No Calculators, No Phones, No Smart Watches.
• Format: Exam is 20 problems, typset on 10 pages, printed on front & back of five sheets of paper.
• Topics: Each of the following topics will be on the exam
  • discontinuities and asymptotes (including limits involving infinity)
  • limit definition of the derivative
  • derivatives using the basic rules (Product, Quotient, Chain)
  • derivative of standard functions (polynomial, rational, root, exponential-type, logarithm-type, sine, cosine, tangent, secant)
  • derivative of inverse trig function (sine, cosine, or tangent)
  • tangent lines
  • linear approximation
  • graphing
  • implicit differentiation
  • related rates
  • absolute max/min on a closed interval
  • optimization
  • one of these theorems: Intermediate Value Theorem (IVT), Mean Value Theorem (MVT), or Rolle's Theorem (theorems not provided)
  • l'Hopital's rule
  • Newton's method (1 step, Newton’s method formula not provided)
  • Fundamental Theorem of Calculus (FTC) Part I
  • Fundamental Theorem of Calculus (FTC) Part II (aka the Evaluation Theorem or Net Change Theorem)
  • area as an integral
  • displacement as anti-derivative of velocity
  • average value of a function on an interval
  • indefinite integrals, using the rules for antiderivatives of basic functions
  • Substitution Rule (rule not provided)
• Not Provided: derivative rules, antiderivative rules, theorems, geometric formulas are not provided.