MTH341 : REAL ANALYSIS II (2014)

NATIONAL OPEN UNIVERSITY OF NIGERIA

14/16 AHMADU BELLO WAY, VICTORIA ISLAND, LAGOS

SCHOOL OF SCIENCE AND TECHNOLOGY

MARCH/APRIL 2014 EXAMINATION

 
COURSE CODE: MTH341
COURSE TITLE: REAL ANALYSIS II
TIME ALLOWED: 3HOURS
INSTRUCTION: ANSWER ANY FOUR QUESTIONS
 
 
1(a)  State and prove Langrange’s mean value theorem.                           6marks
 
(b) If a and b (a < b) are real numbers, then show that there exists a real number c
between a and b such that                             4marks
(c) Verify Cauchy’s mean value theorem for the functions f and g defined as
,        .
4marks
 
2. (a)   Define and explain a Monotonic Functions.                                                               5marks
 
(b)   Separate the intervals in which the function, f, defined on R by , , is increasing or decreasing.                                                                                 5marks
 
(c)    Show that the function f, defined on R by ,
is increasing in every interval.                                                                             4marks
 
3(a)     Let  be the function given by  , . Show that   is continuous at  but it is not derivable at the same point.                                                       4 marks
(b)      Prove that a function  defined as  ,  x ≠ 0; and f(0) = 0, is continuous but not derivable at the origin.                                                                       4 marks
(c)       Show that is continuous but not derivable at x = 0 and x = 1
6 marks
 
4(a)     Let a function f  be defined on an interval I. Show that If f is derivable at a point  , then it is continuous at c.                                                                                               5marks
 
(b)      Let f and g be two functions both defined on an interval I. If these are derivable at  then show that f – g is also derivable at x = c and (f – g)’(c) = f’(c) – g’(c).
5marks
 
(c)        Find the derivative at a point y0 of the domain of the inverse function of the function f, where  f(x) = sin x,  .                                                                                    4marks
 
5 (a)       State the Rolle’s theorem and give its geometrical interpretation.           7marks
 
(b)        Verify Rolle’s theorem for the function f defined by
 
(i)                      ,   .                                                                       3marks
(ii)                   f(x) = sin x,                                                                                   4marks
 
6. (a)  Show that a necessary condition for f(c) to be an extreme value of a function f is that f’(c) = 0, in case it exists.                                                                        4marks
 
(b)  Examine the function f  given by ;     for extreme values.                                      4marks
 
(c)   Examine the polynomial function given by  for local maximum and minimum values.                       6marks
 
7  (a)   Using Maclaurin’s theorem, prove that
4marks
(b)  Find the Maclaurin Series expansion of
(i)     (ii)      (iii)                                         10marks
You can get the exam summary answers for this course from 08039407882

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