Calculus 1 Exam Doc for Computing - MATH 6003, Cork IT, Exams of Calculus

The instructions and questions for the semester 2 examinations 2008/09 for the calculus 1 for computing module (math 6003) at the cork institute of technology. The examination covers various topics in calculus, including differentiation, integration, and applications. Candidates are required to answer questions related to functions, waveforms, tangents, and differential equations. The document also includes instructions for duration, sitting, and requirements for the examination.

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2012/2013

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1 MATH 6003
CORK INSTITUTE OF TECHNOLOGY
INSTITIÚID TEICNEOLAÍOCHTA CHORCAÍ
Semester 2 Examinations 2008/09
Module Title: Calculus 1 for Computing
Module Code: MATH 6003
School: School of Computing & Mathematics
Programme Title:
Bachelor of Science (Honours) in Software Development – Year1
Bachelor of Science (Honours) in Software Development & Computer Networking –
Year1
Programme Code:
KSDEV_8_Y1
KDNET_8_Y1
External Examiner(s):Dr. P. Robinson
Internal Examiner(s): Ms. M. Harley
Instructions:
Answer Q1 (compulsory – 40 Marks) and 2 other questions ( 30 Marks each)
Duration: 2 Hours
Sitting: Summer 2008
Requirements for this examination: Mathematical Tables
Note to Candidates: Please check the Programme Title and the Module Title to ensure that you are
attempting the correct exaination.
If in doubt please contact an Invigilator.
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CORK INSTITUTE OF TECHNOLOGY

INSTITIÚID TEICNEOLAÍOCHTA CHORCAÍ

Semester 2 Examinations 2008/

Module Title: Calculus 1 for Computing

Module Code: MATH 6003

School: School of Computing & Mathematics

Programme Title:

Bachelor of Science (Honours) in Software Development – Year

Bachelor of Science (Honours) in Software Development & Computer Networking –

Year

Programme Code:

KSDEV_8_Y

KDNET_8_Y

External Examiner(s):Dr. P. Robinson

Internal Examiner(s): Ms. M. Harley

Instructions:

Answer Q1 (compulsory – 40 Marks) and 2 other questions ( 30 Marks each)

Duration: 2 Hours

Sitting: Summer 2008

Requirements for this examination: Mathematical Tables

Note to Candidates: Please check the Programme Title and the Module Title to ensure that you are attempting the correct exaination. If in doubt please contact an Invigilator.

1a Given the functions y 1 (^) ( ) t = 20 e −^300 t and y 2 (^) ( ) t = 12(1 − e −^300 t )where t is time.

State the initial and final values of y 1 and y 2. Evaluate y 2 (0.006 ) and determine the time t when y 1 (^) ( ) t = y 2 (^) ( ) t (6 Marks)

1b State the amplitude, period and frequency of the waveforms v 1 and v 2 below.

State the phase time of v 2 and calculate the phase angle. Hence determine expressions for v 1 and v 2 Determine v 2 when t = 0.004, using (i) the expression above and (ii) the graph below

(7 Marks)

1c Find the slope of the tangent line to the function y =

x

at the point

where x = 0.5. Hence find the equation of the tangent line.

(5 Marks)

1d Differentiate from first principles f ( ) x = x^2 + 4 x + 10

(5 Marks)

1e Given that y = 2.2cos(5 π t ) + 3.6sin(5 π t ), determine the rate if change of y

at t = 30 × 10 −^3

(6 Marks)

1f Evaluate

0 2

dtt

(5 Marks)

1g Determine the total area enclosed between the curve y = x^2^ + 3 x − 4

and the x -axis. Comment on your answer. (6 Marks)

(Total 40 Marks)

v 1

v 2

Q4a Show that the equation e −^2 x = 4 x has a solution in the interval [0, 1]

Determine x to 2 d.p. using the Newton-Raphson approximation twice

(10 Marks)

Q4b A rectangular sheet of metal having dimensions 16cm by 6cm has squares of side x cm removed from each of the four corners and the sides bent upwards to form an open box. Show that the volume of the box is given by V = 4 x^3^ − 44 x^2 + 96 x. Determine the maximum possible volume of the box. (10 Marks)

Q4c Determine where the function y = ( x^2 − 1)( x − 3)= x^3 − 3 x^2 − x + 3

crosses the x -axis. Draw a rough sketch of the graph of the function Determine the total area enclosed between the graph and the x -axis. (10 Marks)