![]() Many other tutorials, books, study guides and help with problems can be found on the Internet. This series of videos is easy to understand. Explanations from textbooks can be very theoretical. Showing a video can simplify and provide another explanation for students since limits are a new concept for them. Calculus ResourcesĪn online video explaining both the graphs and the concept of limits can be found at Tutorials for the Calculus Phobe. Practice at graphing functions that approach a value from the left and right are not necessary when evaluating Calculus limit problems. Review the answers and related graphs before continuing. Practice sheets with many problems will reinforce the concept. Teachers should demonstrate how to solve samples of all of the types. For reminders on factoring squares and cubes review these algebraic concepts at: PurpleMaths: Special Factoring of Squares and Cubes.Įxamples of solving special cases of Calculus limit problems are found in the study guide on How to Solve Special Cases of Calculus Limit Problems. Solving these types of limits involves factoring of the difference of squares, factoring special cases with square roots in the numerator and denominator, as well as factoring polynomials. Students then can be shown more complicated forms of a function. Limits that need simplification need to be factored or multiplied by the conjugate.Įxamples of solving these types of limits are found in the study guide on How to Solve Calculus Limit Problems. To evaluate the limits students need to be shown several examples. If the result of direct substitution results in a function that is 0/0, the answer is undefined at this point, yet the limit still exists. This is the easiest method and should be tried first. Limits can be solved by the substitution method. From the left and right side of the limiting x value 2, the y value is approaching -4. The limit exists as the graph approaches from the left side and right side of the function. Lim y = x2- 4, the function does not exist as the value x approaches 2, but the limit exists. The limit theory should explain the limit of aįunction as x approaches from the left and right. If you have a smartboard you may want to try an online interactive gallery for graphing functions which can be found at: Maths Online from the University of Vienna, Austria. Textbooks are good sources of graphs showing continuous and discontinuous functions. ![]() Limits may or may not be continuous at the value a in a graph. Students should be shown graphs of the functions so they can understand the concept of limit. This is solved by substituting 2 into the function: For example, in the linear function y = 3x-5, as x approaches 2, y takes on the value of 1. Limits is finding the value of a function as x approaches a certain value, a. Students learning calculus limit problems need to know what a limit of a function is before they can evaluate them. ![]()
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