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AP Calculus AB 2010 Scoring Guidelines - College Board

AP Calculus AB 2010 Scoring Guidelines The College Board The College Board is a not-for-profit membership association whose mission is to connect students to College success and opportunity. Founded in 1900, the College Board is composed of more than 5,700 schools, colleges, universities and other educational organizations. Each year, the College Board serves seven million students and their parents, 23,000 high schools, and 3,800 colleges through major programs and services in College readiness, College admission, guidance, assessment, financial aid and enrollment. Among its widely recognized programs are the SAT , the PSAT/NMSQT , the Advanced Placement Program (AP ), SpringBoard and ACCUPLACER . The College Board is committed to the principles of excellence and equity, and that commitment is embodied in all of its programs, services, activities and concerns.

2010 Scoring Guidelines . The College Board . The College Board is a not-for-profit membership association whose mission is to connect students to college success and opportunity. Founded in 1900, the College Board is composed of more than 5,700 schools, colleges, universities and other educational organizations.

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Transcription of AP Calculus AB 2010 Scoring Guidelines - College Board

1 AP Calculus AB 2010 Scoring Guidelines The College Board The College Board is a not-for-profit membership association whose mission is to connect students to College success and opportunity. Founded in 1900, the College Board is composed of more than 5,700 schools, colleges, universities and other educational organizations. Each year, the College Board serves seven million students and their parents, 23,000 high schools, and 3,800 colleges through major programs and services in College readiness, College admission, guidance, assessment, financial aid and enrollment. Among its widely recognized programs are the SAT , the PSAT/NMSQT , the Advanced Placement Program (AP ), SpringBoard and ACCUPLACER . The College Board is committed to the principles of excellence and equity, and that commitment is embodied in all of its programs, services, activities and concerns.

2 2010 The College Board . College Board , ACCUPLACER, Advanced Placement Program, AP, AP Central, SAT, SpringBoard and the acorn logo are registered trademarks of the College Board . Admitted Class Evaluation Service is a trademark owned by the College Board . PSAT/NMSQT is a registered trademark of the College Board and National Merit Scholarship Corporation. All other products and services may be trademarks of their respective owners. Permission to use copyrighted College Board materials may be requested online at: Visit the College Board on the Web: AP Central is the official online home for the AP Program: AP Calculus AB 2010 Scoring Guidelines Question 1 2010 The College Board . Visit the College Board on the Web: There is no snow on Janet s driveway when snow begins to fall at midnight. From midnight to 9 , snow accumulates on the driveway at a rate modeled by ()cos7tftte= cubic feet per hour, where t is measured in hours since midnight.

3 Janet starts removing snow at 6 () The rate (),gt in cubic feet per hour, at which Janet removes snow from the driveway at time t hours after midnight is modeled by ()0for0 6125 for 67108 for 79 .tgttt < = < (a) How many cubic feet of snow have accumulated on the driveway by 6 (b) Find the rate of change of the volume of snow on the driveway at 8 (c) Let ()ht represent the total amount of snow, in cubic feet, that Janet has removed from the driveway at time t hours after midnight. Express h as a piecewise-defined function with domain (d) How many cubic feet of snow are on the driveway at 9 (a) () or cubic feet 2 : { 1 : integral 1 : answer (b) Rate of change is ()() = or cubic feet per hour. 1 : answer (c) ()00h= For 06,t< ()( )( ) +=+= For 67,t< ()( )( )()66601251256.}

4 Tththgsdsdst=+=+= For 79,t< ()( )( )()7712510781251087 .ttgsdsdshtht=+=+=+ Thus, ()()()0for061256for 671251087for 79thttttt = < + < 3 : ()()() 1 : for 06 1 : for 67 1 : for 79htthtthtt < < (d) Amount of snow is ()( ) = or cubic feet. 3 : () 1 : integral 1 : 9 1 : answerh AP Calculus AB 2010 Scoring Guidelines Question 2 2010 The College Board . Visit the College Board on the Web: A zoo sponsored a one-day contest to name a new baby elephant. Zoo visitors deposited entries in a special box between noon ()0t= and 8 () The number of entries in the box t hours after noon is modeled by a differentiable function E for Values of (),Et in hundreds of entries, at various times t are shown in the table above. (a) Use the data in the table to approximate the rate, in hundreds of entries per hour, at which entries were being deposited at time Show the computations that lead to your answer.

5 (b) Use a trapezoidal sum with the four subintervals given by the table to approximate the value of () Using correct units, explain the meaning of ()8018 Etdt in terms of the number of entries. (c) At 8 , volunteers began to process the entries. They processed the entries at a rate modeled by the function P, where ()3230298976 Ptttt= + hundreds of entries per hour for According to the model, how many entries had not yet been processed by midnight ()12 ?t= (d) According to the model from part (c), at what time were the entries being processed most quickly? Justify your answer. (a) ()()()756475 EEE = hundred entries per hour 1 : answer (b) ()()()()()()()()()80022557 7812 3 2 1 or 10 ++++ +++ = ()8018 Etdt is the average number of hundreds of entries in the box between noon and 8 3 : 1 : trapezoidal sum 1 : approximation 1 : meaning (c) ()1282323 167 Ptdt = = hundred entries 2 : { 1 : integral 1 : answer (d) ()0Pt = when and () Entries are being processed most quickly at time 3 : () 1 : considers 0 1 : identifies candidates 1 : answer with justificationPt = t (hours) 0 2 5 7 8 ()Et (hundreds of entries) 0 4 13 21 23 AP Calculus AB 2010 Scoring Guidelines Question 3 2010 The College Board .}

6 Visit the College Board on the Web: There are 700 people in line for a popular amusement-park ride when the ride begins operation in the morning. Once it begins operation, the ride accepts passengers until the park closes 8 hours later. While there is a line, people move onto the ride at a rate of 800 people per hour. The graph above shows the rate, (),rt at which people arrive at the ride throughout the day. Time t is measured in hours from the time the ride begins operation. (a) How many people arrive at the ride between 0t= and 3?t= Show the computations that lead to your answer. (b) Is the number of people waiting in line to get on the ride increasing or decreasing between 2t= and 3 ?t= Justify your answer. (c) At what time t is the line for the ride the longest? How many people are in line at that time?

7 Justify your answers. (d) Write, but do not solve, an equation involving an integral expression of r whose solution gives the earliest time t at which there is no longer a line for the ride. (a) ()031000120012008002 320022rtdt++=+= people 2 : {1 : integral1 : answer (b) The number of people waiting in line is increasing because people move onto the ride at a rate of 800 people per hour and for 23,t<< () > 1 : answer with reason (c) ()800rt= only at 3t= For 03,t < () > For 38,t< () < Therefore, the line is longest at time There are 70032008 3500001=+ people waiting in line at time 3 : 1 : identifies 31 : number of people in line 1 : justificationt= (d) ()00700800trsdst=+ 3 : 1 : 8001 : integral1 : answert AP Calculus AB 2010 Scoring Guidelines Question 4 2010 The College Board .}

8 Visit the College Board on the Web: Let R be the region in the first quadrant bounded by the graph of 2,yx= the horizontal line 6,y= and the y-axis, as shown in the figure above. (a) Find the area of R. (b) Write, but do not evaluate, an integral expression that gives the volume of the solid generated when R is rotated about the horizontal line (c) Region R is the base of a solid. For each y, where 06,y the cross section of the solid taken perpendicular to the y-axis is a rectangle whose height is 3 times the length of its base in region R. Write, but do not evaluate, an integral expression that gives the volume of the solid. (a) Area ()()9932004626183xxxdxxx=== = = 3 : 1 : integrand1 : antiderivative 1 : answer (b) Volume ()()()92207276xdx = 3 : { 2 : integrand1 : limits and constant (c) Solving 2yx= for x yields Each rectangular cross section has area 16yyy = Volume 640316ydy= 3 : {2 : integrand1 : answer AP Calculus AB 2010 Scoring Guidelines Question 5 2010 The College Board .}}

9 Visit the College Board on the Web: The function g is defined and differentiable on the closed interval []7, 5 and satisfies () The graph of (),ygx = the derivative of g, consists of a semicircle and three line segments, as shown in the figure above. (a) Find ()3g and () (b) Find the x-coordinate of each point of inflection of the graph of ()ygx= on the interval < < Explain your reasoning. (c) The function h is defined by ()() Find the x-coordinate of each critical point of h, where 75,x < < and classify each critical point as the location of a relative minimum, relative maximum, or neither a minimum nor a maximum. Explain your reasoning. (a) ()( )2302313355422ggxdx =+=++ = + ()()20255ggxdx =+= 3 : ()()()1 : uses 05 1 : 3 1 : 2ggg= (b) The graph of ()ygx= has points of inflection at 0,x= 2,x= and 3x= because g changes from increasing to decreasing at 0x= and 3,x= and g changes from decreasing to increasing at 2 : {1 : identifies 0, 2, 3 1 : explanationx= (c) ()()()0hxgxxgxx = = = On the interval 22,x () = On this interval, ()gxx = when The only other solution to ()gxx = is ()()0hxgxx = > for 02x < ()()0hxgxx = for 25x< Therefore h has a relative maximum at 2,x= and h has neither a minimum nor a maximum at 4 : () 1 : 1 : identifies 2 , 31 : answer for 2 with analysis1 : answer for 3 with analysishxx = AP Calculus AB 2010 Scoring Guidelines Question 6 2010 The College Board .}

10 Visit the College Board on the Web: Solutions to the differential equation 3dyxydx= also satisfy () + Let ()yfx= be a particular solution to the differential equation 3dyxydx= with () (a) Write an equation for the line tangent to the graph of ()yfx= at (b) Use the tangent line equation from part (a) to approximate () .f Given that ()0fx> for ,x<< is the approximation for () greater than or less than () ?f Explain your reasoning. (c) Find the particular solution ()yfx= with initial condition () (a) ()()1, 218dyfdx == An equation of the tangent line is ()28 + 2 : ()1 : 11 : answerf (b) () Since ()0yfx=> on the interval ,x < ()23222130dyyxydx=+> on this interval. Therefore on the interval ,x<< the line tangent to the graph of ()yfx= at 1x= lies below the curve and the approximation is less than ().


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