final exam math 2253 sec. 1 - facultyweb.kennesaw.edu
TRANSCRIPT
![Page 1: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/1.jpg)
Final Exam Math 2253 sec. 1Fall 2014
Name:
Your signature (required) confirms that you agree to practice academic honesty.
Signature:
Problem Points1234567891011
INSTRUCTIONS: There are 11 prob-lems worth 10 points each. Youmay eliminate any one problem, or Iwill drop the problem with your low-est score. There are no notes, orbooks allowed and no calculator isallowed. Illicit use of a calcula-tor, smart phone, tablet, device thatruns apps, or hand written noteswill result in a grade of zero on thisexam and may result in a formal re-ported allegation of academic mis-conduct. To receive full credit, youmust clearly justify your answer anduse proper notation.
![Page 2: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/2.jpg)
(1) Evaluate each limit. (Use of l’Hopital’s rule will not be considered for credit.)
(a) limx→0
tan(3x)
x
(b) limt→∞
√4t2 + 1
t− 2
(c) limx→−3
x2 − 9
x+ 3
![Page 3: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/3.jpg)
(2) Consider the function f(x) =
{ √x2+1−1x2
, x 6= 0c, x = 0.
(a) Evaluate limx→0
f(x)
(b) Determine the value of c such that f is continuous at zero.
![Page 4: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/4.jpg)
(3) Find dydx
. Do not leave compound fractions in your answers.
(a) y = x3(2x− 1)4
(b) y =x2 + 4
x+ 3
(c) x2+2xy−y3 = 1
![Page 5: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/5.jpg)
(4) State the derivative of each of the six trigonometric functions.
ddx
sinx =
ddx
cosx =
ddx
secx =
ddx
cscx =
ddx
tanx =
ddx
cotx =
(5) Find the equation of the line tangent to the graph of f(x) = (6x−5)4 at the point where x = 1.
![Page 6: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/6.jpg)
(6) Oil drips from a car leaving a circular puddle. At the moment that the area of the circular puddleis 36π square inches, its area is increasing at a rate of 1/2 square inches per minute. Determinethe rate at which the radius is increasing at this moment. (Your answer should include appropriateunits.)
![Page 7: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/7.jpg)
(7) Evaluate each integral.
(a)∫x+ x7/2
x3dx
(b)∫
4t√t2 + 1
dt
![Page 8: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/8.jpg)
(8) Evaluate each integral.
(a)∫ π/6
0
9 cos(3x) dx
(b)∫
sin(cot θ) csc2 θ dθ
![Page 9: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/9.jpg)
(9) The region bounded between the curve y = secx and the x-axis on the interval 0 ≤ x ≤ π4
isrotated about the x-axis to form a solid. Find the volume of this solid.
![Page 10: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/10.jpg)
(10) A spring has a natural length of 20 cm. It requires a force of 40 N to stretch it to a length of30 cm ( 1
10m from equilibrium).
(a) Determine the spring constant k.
(b) Find the work done stretching the spring from its natural 20 cm length to a length of 40 cm (15
m from equilibrium).
![Page 11: Final Exam Math 2253 sec. 1 - facultyweb.kennesaw.edu](https://reader034.vdocuments.mx/reader034/viewer/2022043021/626c1fa429e01c27102fa4b6/html5/thumbnails/11.jpg)
(11) The region bounded between the curves y = x and y =√2x is rotated about the x-axis to
form a solid. Find the volume of this solid.