AP 微积分 AB 2009 真题与解析

2024年4月10日发(作者：数学试卷冲刺名校)

AP

®

Calculus AB

2009 Scoring Guidelines

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CALCULUS AB

2009 SCORING GUIDELINES

Question 1

Caren rides her bicycle along a straight road from home to school, starting at home at time

t=0

minutes

and arriving at school at time

t=12

minutes. During the time interval

0≤t≤12

minutes, her velocity

v

(

t

)

,

in miles per minute, is modeled by the piecewise-linear function whose graph is shown above.

(a)

Find the acceleration of Caren’s bicycle at time

t=7.5 minutes. Indicate units of measure.

12

(b)

Using correct units, explain the meaning of

of

∫

12

0

∫

0

v

(

t

)

dt

in terms of Caren’s trip. Find the value

v

(

t

)

dt.

(c) Shortly after leaving home, Caren realizes she left her calculus homework at home, and she returns to

get it. At what time does she turn around to go back home? Give a reason for your answer.

(d) Larry also rides his bicycle along a straight road from home to school in 12 minutes. His velocity is

t

,

where

w

(

t

)

is in miles per minute for

1512

0

≤

t

≤

12

minutes. Who lives closer to school: Caren or Larry? Show the work that leads to your

answer.

modeled by the function

w

given by

w

(

t

)

=

π

sin

()

π

(a)

a

(

7.5

)

=

v

′

(

7.5

)

=

1 : answer

v

(

8

)

−

v

(

7

)

:

=−

0.1 milesminute

2

2

8

−

7

1 : units

(b)

∫

0

∫

0

12

v

(

t

)

dt

is the total distance, in miles, that Caren rode

v

(

t

)

dt=

2 :

during the 12 minutes from

t=0

to

t=12.

12

{

{

{

1 : meaning of integral

1 : value of integral

∫

0

v

(

t

)

dt−

∫

2

v

(

t

)

dt+

∫

4

2412

v

(

t

)

dt

=

0.2

+

0.2

+

1.4

=

1.8 miles

(c)

Caren turns around to go back home at time

t=2

minutes.

This is the time at which her velocity changes from positive

to negative.

(d)

2 :

1 : answer

1 : reason

∫

0

∫

0

12

12

w

(

t

)

dt

=

1.6; Larry lives 1.6 miles from school.

v

(

t

)

dt

=

1.4; Caren lives 1.4 miles from school.

Therefore, Caren lives closer to school.

⎧

2 : Larry’s distance from school

⎪

1 : integral

⎪

3 :

⎨

1 : value

⎪

1 : Caren’s distance from school

⎪

⎩

and conclusion

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CALCULUS AB

2009 SCORING GUIDELINES

Question 2

The rate at which people enter an auditorium for a rock concert is modeled by the function

R

given by

R

(

t

)

=1380t

2

−675t

3

for 0

≤

t

≤

2 hours;

R

(

t

)

is measured in people per hour. No one is in the

auditorium at time

t=0,

when the doors open. The doors close and the concert begins at time

t

=2.

(a) How many people are in the auditorium when the concert begins?

(b) Find the time when the rate at which people enter the auditorium is a maximum. Justify your answer.

(c) The total wait time for all the people in the auditorium is found by adding the time each person waits,

starting at the time the person enters the auditorium and ending when the concert begins. The function

w

models the total wait time for all the people who enter the auditorium before time

t

. The derivative

of

w

is given by

w

′

(

t

)

=

(

2

−

t

)

R

(

t

)

. Find

w

(

2

)

−

w

(

1

)

, the total wait time for those who enter the

auditorium after time

t

=

1.

(d) On average, how long does a person wait in the auditorium for the concert to begin? Consider all people

who enter the auditorium after the doors open, and use the model for total wait time from part (c).

(a)

∫

0

2

R

(

t

)

dt

=

980 people

2 :

{

1 : integral

1 : answer

(b)

R

′

(

t

)

=

0 when

t

=0

and

t

=1.36296

The maximum rate may occur at 0,

a=1.36296, or 2.

R

(

0

)

=0

R

(

a

)

=854.527

R

(

2

)

=120

The maximum rate occurs when t=1.362 or 1.363.

⎧

1 : considers

R

′

(

t

)

=

0

⎪

3 :

⎨

1 : interior critical point

⎪

⎩

1 : answer and justification

(c)

w

(

2

)

−w

(

1

)

=

∫

1

w

′

(

t

)

dt=

∫

1

(

2−t

)

R

(

t

)

dt=387.5

22

2 :

The total wait time for those who enter the auditorium after

time

t=1

is 387.5 hours.

11

2

(d)

w

(

2

)

=

(

2−t

)

R

(

t

)

dt=0.77551

980980

0

On average, a person waits 0.775 or 0.776 hour.

{

{

1 : integral

1 : answer

∫

2 :

1 : integral

1 : answer

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®

CALCULUS AB

2009 SCORING GUIDELINES

Question 3

Mighty Cable Company manufactures cable that sells for $120 per meter. For a cable of fixed length, the

cost of producing a portion of the cable varies with its distance from the beginning of the cable. Mighty

reports that the cost to produce a portion of a cable that is x meters from the beginning of the cable is

6x

dollars per meter. (Note: Profit is defined to be the difference between the amount of money

received by the company for selling the cable and the company’s cost of producing the cable.)

(a) Find Mighty’s profit on the sale of a 25-meter cable.

(b)

Using correct units, explain the meaning of

30

∫

25

6xdx in the context of this problem.

(c) Write an expression, involving an integral, that represents Mighty’s profit on the sale of a cable that

is k meters long.

(d) Find the maximum profit that Mighty could earn on the sale of one cable. Justify your answer.

25

(a)

Profit

=

120

⋅

25

−

∫

0

6xdx

=

2500

dollars

2 :

{

1 : integral

1 : answer

(b)

∫

25

6

30

xdx is the difference in cost, in dollars, of producing a 1 : answer with units

cable of length 30 meters and a cable of length 25 meters.

(c)

Profit

=

120k

−

∫

0

k

6xdx

dollars

2 :

{

1 : integral

1 : expression

P

(

k

)

be the profit for a cable of length k. (d) Let

P

′

(

k

)

=120−6k=0

when

k=400.

This is the only critical point for P, and P

′

changes from

positive to negative at k

=

400.

Therefore, the maximum profit is

P

(

400

)

=16,000

dollars.

⎧

1 :

P

′

(

k

)

=0

⎪

⎪

1 : k

=

400

4 :

⎨

1 : answer

⎪

⎪

⎩

1 : justification

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