this video<\/a> for more practice and explanation about limits. <\/p>\nContinuity<\/h2>\n
Now that we’ve discussed limits, we can talk about continuity<\/em>. Intuitively, we say a function is continuous if we can draw its graph without lifting the pencil. That is, there are no jumps, holes, or vertical asymptotes in the graph. However, we need a more precise definition!<\/p>\nThe Three-Part Definition for Continuity<\/h3>\n
A function f<\/em>(x<\/em>) is continuous<\/strong> at a point x<\/em> = a<\/em> if the following limit statement is true:<\/p>\n![\"Limit](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Limit_Def_Continuity.jpg\")
<\/p>\n
But wait, that doesn’t look like a “three-part” definition! Well, in fact, there are three major ideas wrapped up in that limit equation.<\/p>\n
\n- \n
1. The limit must exist.<\/h4>\n
This means that the y<\/em>-values of the graph must be tending toward some finite number as x<\/em> → a<\/em>. So the function cannot be continuous at a vertical asymptote or a jump, places where the limit fails to exist.\n<\/li>\n- \n
2. The function value must exist.<\/h4>\n
There must be a value for f<\/em>(a<\/em>). This means that a function is not continuous at a “missing” point of the graph (open circle).\n<\/li>\n- \n
3. The limit must agree with the function value.<\/h4>\n
Even if a function passes both conditions (1) and (2), it could still fail to be continuous. We want the data (function value) to fit the trend (limit). If that does not happen, then the function is not continuous at that point.\n<\/li>\n<\/ul>\n
A Graphical Example<\/h3>\n
Let’s see how the three parts of the continuity definition play a role in the following problem.<\/p>\n
\n- \nA graph of f<\/em>(x<\/em>) is shown below. Determine the largest set of x<\/em>-values at which f<\/em> is continuous. Write your answer in interval notation.<\/li>\n<\/ul>\n
![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_graph_discontinuous.jpg\")
<\/p>\n
Ok, we can see three obvious “issues.” In order from left to right, there are discontinuities<\/strong> at x<\/em> = -3.5, -1, and 3.<\/p>\nAt x<\/em> = -3.5, the function value fails to exist. <\/p>\nAt x<\/em> = -1, the limit value fails to exist.<\/p>\nAt x<\/em> = 3, the function value, f<\/em>(3<\/em>) = 2, doesn’t agree with the limit value, 1.<\/p>\nf<\/em> is continuous everywhere else. Therefore, the answer is: (-∞, -3.5) U (-3.5, -1) U (-1, 3) U (3, ∞).<\/p>\nFinal Thoughts on Limits and Continuity<\/h2>\n
Limits and continuity problems on the AP Calculus exams may be very easy or may be quite challenging. However, by keeping a few tools, definitions, and examples in mind, you can take your score to the limit! <\/p>\n","protected":false},"excerpt":{"rendered":"
In this article, we’ll discuss a few different techniques and definitions related to limits and continuity, with examples for the AP Calculus exams.<\/p>\n","protected":false},"author":223,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[240],"tags":[241],"ppma_author":[24932],"class_list":["post-8594","post","type-post","status-publish","format-standard","hentry","category-ap","tag-ap-calculus"],"acf":[],"yoast_head":"\n
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![\"Limit](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/limit_notation.jpg\")
<\/p>\n![\"Limit](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/limit_in_graph.jpg\")
<\/p>\n![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_limit_problems-600x56.jpg\")
<\/p>\n![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_limit_problem_1.jpg\")
<\/p>\n<\/li>\n![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_limit_problem_2.jpg\")
\n<\/li>\n![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_limit_problem_3.jpg\")
<\/p>\n<\/li>\n![\"L'Hospital's](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Lhospitals_rule.jpg\")
<\/p>\n![\"Example](\"https:\/\/magoosh.com\/hs\/files\/2017\/01\/Example_limit_problem_4.jpg\")
<\/p>\n<\/li>\n<\/ul>\n