Department Outline: Official course outline prepared by the Mathematics Department.

Description:  Topics include functions, limits, differentiation, and tangent lines, L’Hôpital’s Rule, Fundamental Theorem of Calculus and Applications.

Syllabus_Mat1475_Summer2020_Mingla_OL (2)

Course and Section:  MAT 1475 Calculus I, Section OL65
Class Meets: M,T,W 11:30 pm – 2:10 pm,Thursdays,11:30-2:00pm
Instructor:  Lucie Mingla
Book:  Calculus Volume 1 by OpenStax, by G. Strang and E. Herman
Read online or download a free PDF at OpenStax:

Office:    Pearl 305
Office Hours:  Thursdays  2:2:00 pm-3:00 pm

OpenLab:  The class website will be on the OpenLab ( The site contains important information about the course and will be used in various ways throughout the semester.  The address for the class website is:

WeBWorK:  Some of the homework for this class will be completed on the WeBWorK website.  You will be provided with more information in the first week of class.  The address is:

Our class site:

Grading (percent / letter grade correspondence):

A = 93.0 — 100
A- = 90.0 — 92.9
B+ = 87.0 — 89.9
B = 83.0 — 86.9
B- = 80.0 — 82.9
C+ = 77.0 — 79.9
C = 70.0 — 76.9
D = 60.0 — 69.9
F = 0 — 59.9
W = withdrawal up to 11/5/19
WF = withdrawal after 11/5/19 (WF = F)
NOTE: Withdraw before 11/5/19 to avoid an F or WF

Grading (how your grade is calculated):


Homework/OpenLab (15%): Each week you will be assigned online homework (to be completed on the WeBWorK site).  All problems completed will earn points towards your homework grade. You will be participating in the OpenLab (website) by writing and making comments in response to assigned readings, homework problems, and so on.  All count towards the HW grade (15%).

In-Class Exams (60%): There will be 3 exams during the semester (not including the final).  No makeup exams will be given.  If you miss an exam for a valid reason, your final exam score will take the place of the missing exam.

Final Exam (25%): A final exam is given on the last day of class covering all topics. The final exam must be taken to pass the course.

Learning Outcomes

  1. Solve problems related to limits and continuity.
  2. Find the derivative of functions using the definition, sum rule, product rule, quotient rule, and the chain rule.
  3. Use the derivative of a function to find an equation for the tangent line at a point.
    Use L’Hôpital’s Rule to evaluate limits.
    Sketch the graph of functions.
    Solve optimization problems.
    Solve related rates problems.
  4. Evaluate definite and indefinite integrals of polynomials, trigonometric and exponential functions.

Gen Ed Learning Outcomes

Students will be able to:

  1. Understand and employ both quantitative and qualitative analysis to solve problems.
  2. Employ scientific reasoning and logical thinking.
  3. Communicate effectively using written and oral means.
  4. Use creativity to solve problems.

Attendance:  Absence is permitted only with a valid reason. Anything in excess of 10% of the total number of class meetings is considered excessive absence (more than 3 absences).

Lateness:  Two latenesses counts as one absence.

Records: Records should be kept by every student of all grades received, exam papers, other work completed and any absences.

Academic Integrity: The New York City College of Technology Policy on Academic Integrity: Students and all others who work with information, ideas, texts, images, music, inventions, and other intellectual property owe their audience and sources accuracy and honesty in using, crediting, and citing sources. As a community of intellectual and professional workers, the College recognizes its responsibility for providing instruction in information literacy and academic integrity, offering models of good practice, and responding vigilantly and appropriately to infractions of academic integrity. Accordingly, academic dishonesty is prohibited in The City University of New York and at New York City College of Technology and is punishable by penalties, including failing grades, suspension, and expulsion. The complete text of the College policy on Academic Integrity may be found on p. 56 of the catalog.