Questions And Worked Solutions For AP Calculus BC 2019

AP Calculus BC 2019 Free Response Questions - Complete Paper (pdf)

AP Calculus BC 2019 Free Response Question 1Rate in, rate out problem. Integral of a rate; average value of a function

Fish enter a lake at a rate modeled by the function E given by E(t) = 20 + 15 sin(πt/6). Fish leave the lake at a rate modeled by the function L given by L(t) = 4 + 20.1t2. Both E(t) and L(t) are measured in fish per hour, and t is measured in hours since midnight (t = 0).(a) How many fish enter the lake over the 5-hour period from midnight (t = 0) to 5 A.M. (t = 5)? Give youranswer to the nearest whole number.(b) What is the average number of fish that leave the lake per hour over the 5-hour period frommidnight (t = 0) to 5 A.M. (t = 5)?(c) At what time t, for 0 ≤ t ≤ 8, is the greatest number of fish in the lake? Justify your answer.(d) Is the rate of change in the number of fish in the lake increasing or decreasing at 5 A.M. (t = 5)? Explainyour reasoning.

AP Calculus BC 2019 Free Response Question 22. Let S be the region bounded by the graph of the polar curve r(θ) = 3√θ sin(θ2)for 0 ≤ θ ≤ √π, as shown in the figure above.(a) Find the area of S.(b) What is the average distance from the origin to a point on the polar curve r(θ) = 3√θ sin(θ2)for 0 ≤ θ ≤ √π,?(c) There is a line through the origin with positive slope m that divides the region S into two regions withequal areas. Write, but do not solve, an equation involving one or more integrals whose solution gives thevalue of m.(d) For k > 0, let A(k)) be the area of the portion of region S that is also inside the circle r = k cos θ. Find lim A(k)


AP Calculus BC 2019 Free Response Question 33. The continuous function f is defined on the closed interval −6 ≤ x ≤ 5. The figure above shows a portion ofthe graph of f, consisting of two line segments and a quarter of a circle centered at the point (5, 3). It isknown that the point (3, 3 −√5 ) is on the graph of f.

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AP Calculus BC 2019 Free Response Question 44. A cylindrical barrel with a diameter of 2 feet contains collected rainwater, as shown in the figure above. Thewater drains out through a valve (not shown) at the bottom of the barrel. The rate of change of the height h ofthe water in the barrel with respect to time t is modeled bydh/dt = -1/10 √, where h is measured in feet and t is measured in seconds. (The volume V of a cylinder with radius r and height h is V = πr2«/sup>h.)(a) Find the rate of change of the volume of water in the barrel with respect to time when the height of thewater is 4 feet. Indicate units of measure.(b) When the height of the water is 3 feet, is the rate of change of the height of the water with respect to timeincreasing or decreasing? Explain your reasoning.(c) At time t = 0 seconds, the height of the water is 5 feet. Use separation of variables to find an expressionfor h in terms of t.

AP Calculus BC 2019 Free Response Question 55. Consider the family of functionsf(x) = 1/(x2 - 2x + k) , where k is a constant.(a) Find the value of k, for k > 0, such that the slope of the line tangent to the graph of f at x = 0 equals 6.(b) For k = −8, find the value of (c) For k = 1, find the value of or show that it diverges.

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AP Calculus BC 2019 Free Response Question 66. A function f has derivatives of all orders for all real numbers x. A portion of the graph of f is shown above,along with the line tangent to the graph of f at x = 0. Selected derivatives of f at x = 0 are given in the tableabove.(a) Write the third-degree Taylor polynomial for f about x = 0.(b) Write the first three nonzero terms of the Maclaurin series for ex. Write the second-degree Taylorpolynomial for exf(x) about x = 0.(c) Let h be the function defined by . Use the Taylor polynomial found in part (a) to find anapproximation for h(1).(d) It is known that the Maclaurin series for h converges to h(x) for all real numbers x. It is also known thatthe individual terms of the series for h(1) alternate in sign and decrease in absolute value to 0. Use thealternating series error bound to show that the approximation found in part (c) differs from h(1) by atmost 0.45.

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