File name: Ap calculus bc limits and continuity test pdf
Rating: 4.5 / 5 (4752 votes)
Downloads: 29447
Download link: >>CLICK HERE<<
Limits describe the behavior of a function as we approach a certain input value, regardless of the function's actual value there. a) b) (A)(B) (C) 0¥ (D) ¥ (e)Evaluate each limit. Assignment: AP CALCULUS BC TEST (Limit and Continuity) Q2 and Qare based on the function f shown in the graph and defined below: Answer. Example: Given,, xx fx xx ⎧ +≤ =⎨ ⎩ +>2 Is the function continuous at x =2? Each problem has the same choices. Each problem has the same choices. These sample exam questions were originally included in the AP Calculus AB and AP Calculus BC Curriculum Framework, published in fall The AP Calculus AP Calculus BC Summer Review Packet (Limits & Derivatives) LimitsAnswer the following questions using the graph of ƒ(x) given below. a) b) limit at that x, and the value and the limit are the same. D) y = COs xThe graph of which equation listed below has an asymptote of B) y —sinxFx+lim AP Calculus BCWorksheetContinuity Show (THREE STEPS) that each of the following functions is either continuous or discontinuous at the given value of xf x x Introduction. Continuity requires that the SAT PREP. Use this figure to answer questions E) No limit E) No limit limf is lim f is lim f is lim f is liml is o B) l? Explain what section(s) of the definition of continuity is (are) violated at these points Limits and Continuity Practice —Multiple Choice: Name Date e The figure below shows the graph of f. (a) Find ƒ(0) (b) Find ƒ(3) (c) If the results are relatively close to one another, pick a number in between the two as your approximation for the value of the limitIf the results seem far apart, repeat steps About this unit. Part A. Part B Limits and Continuity AP Calc BC Name: AP Review Graphing Calculators are not allowedEvaluate each limit. fx() 7=lim ()x fx → − =, but thelim ()x fx → + = The function does not have a limit as x →2, therefore the function is not continuous at x =2 Answer the following questions using the graph of ƒ(x) given below. a) b) (A)(B) ¥(C)(D) (e)Evaluate each limit. Find ƒ(0) Find ƒ(3) Find lim f (x)Find lim f (x)Find lim f (x)(f) Find lim(x) (g) List all x-values for which ƒ(x) has a removable discontinuity. Each problem has the same choices.