On which of the following closed intervals is the function f guaranteed by the Extreme Value Theorem to have an absolute maximum and an absolute minimum? AP Calculus BC Unit 5 Progress Check: MCQ Part A 5.0 (21 reviews) Term 1 / 12 Let f be the function given by f (x)=cos (x^2+x)+2 The derivative of f is given by f' (x)=- (2x+1)sin (x^2+x). The graph of f, the derivative of f, is shown above. B. What is the absolute maximum value of f on the closed interval [3,1] ? It may give you the insight you need to remember how to solve the problem. Once you have done it once though trust your first instinct and move on. Click the card to flip Definition 1 / 36 The graph of f, the derivative of the function f, is shown above. Get Started . A 0.508 only B 0.647 only C and 0.508 D and 0.647 3. You'll get a detailed solution from a subject matter expert that helps you learn core concepts. By the Mean Value Theorem applied to f on the interval [0,4], there is a value c such that f'(c)=4. Leave a Reply Continuation of conic sections AP Calc meeting Tuesday morning It is an integral of the function f, which we have the graph of. These materials are part of a College Board program. Why does this not contradict the Extreme Value Theorem? (a) How many elements are in the set A x A? Information about the first and second derivatives of f for some values of x in the interval (0,9) is given in the table above. (b) Explain the economic significance of the slope of your formula. The first derivative of f is given by f'(t)=1-lnt-sint. document.getElementById( "ak_js_1" ).setAttribute( "value", ( new Date() ).getTime() ); Your email address will not be published. AP Scores your multiple choice questions by taking the number of questions you got write and multiplying by 1.2. \end{array} (c) How many possible relations are there on the set {1, 2, 3}? a&%1@5hRz )z,Xa %PDF-1.4 AP CALCULUS. In the xy-plane, how many horizontal or vertical tangent lines does the curve xy2=2+xy have? At the point (0,2), the curve C has a relative maximum because dy/dx=0 and d2y/dx2<0. For many students in AP Calculus, the multiple-choice section is easier than the free-response section. % The temperature inside a vehicle is modeled by the function f, where f(t) is measured in degrees Fahrenheit and t is measured in minutes. The derivative of the function f is given by f'(x)= sqrt(x) sin(3sqrt(3sqrt(x)) On which of the following intervals in [0,6pi] is f decreasing? Let f be the function defined by f(x)=xlnx for x>0. The graph of f, the derivative of the continuous function f, is shown above on the interval 2NJ2}aT2*TTtc|7MoUJ'i bR,iqw + RRY-J`uq[, This problem has been solved! At what values of x does f have a relative maximum? Use or distribution of these materials online or in print beyond your school's participation in the program is prohibited. 4 ( ). f has three relative extrema, and the graph of f has four points of inflection. On which of the following open intervals is the graph of f concave down? Progress Check MCQ MCQ Key. We need to find g(5). For what values of is continuous at ? Question: College Board AP Classroom Unit 10 Progress Check: MCQ Part B 5-6 0-0-0 () Question 4 Which of the following series can be used with the limit comparison test to determine whether the series . The derivative of f is given by f (x)=5cos (x2)sin (x2)+1x+1. The College Board. Let C be the curve defined by x2+y2=36. AP CALCULUS AB Unit 2 Progress Check: MCQ Part A Jaemin Ryu x .00000@ <1ons> E . <> Which of the following statements could be false? Good luck when approaching the multiple choice section! Selected values of a continuous function f are given in the table above. On what open interval is f decreasing? It costs $5,000 per mile to install an electrical line on land and $10,000 per mile to install an electrical line underwater. f(x)=x36x2+12x+1, where f(x)=3x212x+12. While this is helpful for speed, it can often make us quickly discount what might be the right answer. What is the absolute maximum value of g on the interval [4,1] ? Let f be the function given by f(x)=5cos2(x2)+ln(x+1)3. Which of the following statements is true about the function f on the interval [0,9] ? What advanced integration techniques will we learn in BC? Solve C(x)=0 and find the values of x where C(x) changes sign from negative to positive. #2: 1:29#3: 4:52#4: 8:29#5: 11:26#6: 14:30#7: 19:36#8: 23:39#9: 27:26#10: 32:34#11: 36:05#12: 40:31 Use the scroll bar to view the pacing. Let f be a function with first derivative given by f(x)=x(x5)2(x+1). /Contents 4 0 R>> On this interval f has only one critical point, which occurs at x=6. The concentration of a certain element in the water supply of a town is modeled by the function f, where f(t) is measured in parts per billion and t is measured in years. f(c)=11(4)/100 since the Mean Value Theorem applies. Determine the number of solutions for each system. These materials are part of a College Board program. Yes, I understand you are being timed and this takes a while, but from my experience you are less likely to get distracted by good wrong answers if you have done out the problem yourself. The graph of y=f(x) is shown above. 6'>ftasFa2cd|_kxJW. It is important that when preparing for the AP exam, you practice problems with every type of function and every representation. It can be tempting to look down to the choices of a question before even trying it, to see which answers we can eliminate. The College Board. Which of the following must be true for some c in the interval (3,3) ? An electrical power station is located on the edge of a lake, as shown in the figure above. Copyright 2020. We take the area! This section has 2 parts: Part A: 60 minutes for 30 non-calculator questions. Which of the following statements provides a justification for the concavity of the curve? Which of the following could be the graph of f, the derivative of f, on the interval [a,b] ? Let f be the function given by f(x)=x(x4)(x+2) on the closed interval [7,7]. What value of c satisfies the conclusion of the Mean Value Theorem applied to f on the interval [1,4] ? %PDF-1.4 II At points where y=8, the lines tangent to the curve are vertical. Unit 5 MCQ AP Calc AB 4.9 (50 reviews) Term 1 / 36 Let f be the function given by f (x)=5cos2 (x2)+ln (x+1)3. xr7gp4HckteJO\JM9P$%CO)
h8oF7-uiF})VUUa*:B8}n#~n(D)J3+jjt9' %,l{CZH^xj&38b.z|K"
'7[!32CP.qF >J||
YxZG+2[x??`\ \.aHL
,u9=`5wV dAGZf= @F)xF.o]GdFFF@#*\P C?8F TB ) ,"vG[0Hsv|S)fp
^=o7=K!U.o+KY;bk}s~JZ%F!v} >{*6&)i`FZWk]B Let f be the function given by f(x)= sinxcosx/x^2-4 On the closed interval [-2pi, 2pi]. With a few geometric calculations, we should get B as an answer. Let C(x)=10,000(4x)^2+1+5,000x. The function f has many critical points, two of which are at x=0 and x=6.949. Why does this not contradict the Extreme Value Theorem? Fall 2020 Online Pacing Guide AP Calculus AB, BC Unit D L'Hospital and Improper Integrals. Just review for myself and anyone else who might need it :). The figure above shows the graph of f on the interval [a,b]. The function f is continuous on the interval (0,9) and is twice differentiable except at x=6, where the derivatives do not exist (DNE). These materials are part of a College Board program. Unit 7 Progress Check FRQ A solns. The Intermediate Value Theorem applied to F'(c)=8-7/3-(-3) since the Mean Value Theorem applies. 3 0 obj The graph of f has a point of inflection at x=8. Let f be the function given by f(x)=2x3+3x2+1. Understanding the format of the exam is key to dividing your studying and pacing yourself when doing practice questions. f has one relative minimum and two relative maxima. These are the sections where they ask a bit more straight-forward skills questions. Which of the following must be true for some c in the interval (0,10) ? At what values of x does f have a relative maximum? Let f be the function defined by f(x)=x510x3. : W : . The second derivative of the function f is given by f(x)=sin(x28)2cosx. Selected values of a continuous function f are given in the table above. Want to know what's coming up? hU.Fh[%,V6'hV..|xJ*# Y@{k]_$e.=R^\yc>*utoO!%A2Y`yM2! According to the model, for what size order is the cost per unit a minimum? Unit 10 -Sequences & Series (Part 2) *Quiz (Days 1 - 5): Thursday, March 8th *Unit 10 Test: Thursday, March 15th *MIDTERM (Units 8 - 10): Tuesday, March 20th. (x,Y1Aq\0B@"ZZO Below is a good link to review reading the derivative before completing Unit 5. reading-the-derivatives-graph Email Loading. Question: College Board AP Classroom Unit 10 Progress Check: MCQ Part A 2 5 6 7 8 10 11 12 13 14 15 Question 5 0 if a is nonzero real number and r is a real number . 5A>[X) 7bO8HN40]{K: E=4('X\Y >xD]zmq& IE+7IKqk\P!S){ )B=,*C(YeBD]:?%!"fm&JjQ%/9yJ~Fq=@~#ok,nvLW\74`=ud!VZO/%d.|4%' Three graphs labeled I, II, and III are shown above. Use or distribution of these materials online or in print beyond your school's participation in the program is prohibited. The multiple-choice section makes up 50% of your score, and you have an hour and 45 minutes to answer 45 questions. In the multiple-choice section, there is only so much that can be asked that is able to be done in 2 or 3 minutes. The College Board. You'll be asked more straightforward skills-based questions, problems typically don't build off of each other. The multiple-choice section makes up 50% of your score, and you have an hour and 45 minutes to answer 45 questions. . Not my favorite color-by-letter. 2. Your email address will not be published. If derivative of and is a differentiable function of , which . Since we need g(5), we look to what g is. Image Courtesy of Alberto G. 2023 Fiveable Inc. All rights reserved. On the other hand, if you do not understand a problem or are blanking on how to solve it, looking at the answers can be helpful! Let f be the function defined by f(x)=xsinx with domain [0,). 3 x-2 y=8 The first derivative of f is given by f(t)=t23t+cost. Many teachers, college and high school level, put a lot of work into making these multiple choice questions. % Unit 2: Differentiation: Definition and Fundamental Properties, Unit 3: Differentiation: Composite, Implicit, and Inverse Functions, Unit 4: Contextual Applications of Differentiation, Unit 5: Analytical Applications of Differentiation, Unit 6: Integration and Accumulation of Change, Unit 9: Parametric Equations, Polar Coordinates, and Vector-Valued Functions. Evaluate C for those values of x to determine the minimum cost. Of the following intervals, on which can the Mean Value Theorem be applied to f ? Which of the following statements is true about f on the interval 2*@aZ{mq*dQ%CO6. Which of the following statements is true for 10. Unit 2 Differentiation: Definition and Fundamental Properties, 2.1 DEFINING AVERAGE AND INSTANTANEOUS RATES OF CHANGE AT A POINT, 2.2 DEFINING THE DERIVATIVE OF A FUNCTION AND USING DERIVATIVE NOTATION, 2.3 ESTIMATING DERIVATIVES OF A FUNCTION AT A POINT, 2.4 CONNECTING DIFFERENTIABILITY AND CONTINUITY - DETERMINING WHEN DERIVATIVES DO AND DO NOT EXIST, 2.6 DERIVATIVE RULES - CONSTANT, SUM, DIFFERENCE, AND CONSTANT MULTIPLE, 2.7 DERIVATIVES OF COS X, SIN X, EX, AND LN X, 2.10 FINDING THE DERIVATIVES OF TANGENT, COTANGENT, SECANT, AND/OR COSECANT FUNCTIONS, Unit 3 Differentiation: Composite, Implicit & Inverses, 3.4 Differentiating Inverse Trig Functions, 3.5 Procedures for Calculating Derivatives, Unit 4 Contextual Applications of Differentiation, 4.1 Interpreting Meaning of Derivative in Context, 4.2 Straight Line Motion - Connecting Position, Velocity & Acceleration, 4.3 RATES OF CHANGE IN NON-MOTION CONTEXTS, Unit 5 Analytical Applications of Differentiation, 5.6 DETERMINING CONCAVITY OF F(X) ON DOMAIN, 5.7 Using 2nd Derivative Test to Determine Extrema, 5.12 Exploring Behaviors of Implicit Differentiation, Unit 6 Integration & Accumulation of Change (Record Style), Unit 6.1 Exploring Accumulation of Change, Unit 6.2 Approximating Areas with Riemann Sums, Unit 6.3 Riemann Sums, Notation and Definite Integrals, Unit 6.4-6.5 Fundamental Th'm of Calculus, Unit 6.6 Applying Properties of Definite Integrals, Unit 6.7 - 6.8 Fun'l Th'm of Calc & Definite Integrals, Unit 6.10 Integrating Functions Using Long Division & Completing Square, Unit 6.14 Selecting Techniques for Antidifferentiation, Unit 8 Applications of Integration (Record), Unit 5 Analytic Applications of Derivative, Unit 6 Integration & Accumulation of Change, 8.2 - First Fundamental Theorem of Calculus.