Question 1(30 marks) (a). Let f : R→ R, g : R →R and h: R R be functions defined by f(x) = 5, 9(x) = 5x – 2 and h(x) = sin(x + 2). Find (i). the domain of f and the range of f. (2 marks) (ii). the composite functions f o g, foh and go f. [3 marks) (iii). g-'(x). [1 mark] (b). Evaluate the following limits: (i). lim20-cosz [3 marks) (ii). lim, 3r²-r+1 4x2+5 [3 marks) (c).(i). Use the formal definition(e – ở definition of a limit) to verify that lim, 5 4x +6 = 26. [3 marks] (ii). Let f : R – R be a function. State the formal e - d definition of continuity of f 1 at a point ro ER. [2 marks]

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Question 1(30 marks)
(a). Let f : R - R, g : R → R and h : R R be functions defined by
f(x) = s, 9(x) = 5x – 2 and h(x) = sin(r + 2). Find
(i). the domain of f and the range of f.
[2 marks)
(ii). the composite functions f o g, fƒ o h and go f.
[3 marks)
(iii). g-'(x).
[1 mark]
(b). Evaluate the following limits:
(i). lim,20 =Cos I
[3 marks]
3r2-z+1
(ii). limz+0 745 ·
[3 marks]
(c).(i). Use the formal definition(e - ổ definition of a limit) to verify that lim, 5 4.r+6 = 26.
[3 marks]
(ii). Let f : R →R be a function. State the formal e- 6 definition of continuity of f
1
at a point ro E R.
[2 marks]
(d). Consider the function
-2, for x < 0
f(x) =
0,
for x = 0
4,
for r>0
(i). Show that f has no limit as x → 0.
[2 marks]
(ii). Show that the function f is not continuous at the point r = 0.
[2 marks]
(e). Find for the following functions
(i). y =
[3 marks)
(ii). y? + ay = 6x.
[3 marks]
(iii). y = x".
Transcribed Image Text:Question 1(30 marks) (a). Let f : R - R, g : R → R and h : R R be functions defined by f(x) = s, 9(x) = 5x – 2 and h(x) = sin(r + 2). Find (i). the domain of f and the range of f. [2 marks) (ii). the composite functions f o g, fƒ o h and go f. [3 marks) (iii). g-'(x). [1 mark] (b). Evaluate the following limits: (i). lim,20 =Cos I [3 marks] 3r2-z+1 (ii). limz+0 745 · [3 marks] (c).(i). Use the formal definition(e - ổ definition of a limit) to verify that lim, 5 4.r+6 = 26. [3 marks] (ii). Let f : R →R be a function. State the formal e- 6 definition of continuity of f 1 at a point ro E R. [2 marks] (d). Consider the function -2, for x < 0 f(x) = 0, for x = 0 4, for r>0 (i). Show that f has no limit as x → 0. [2 marks] (ii). Show that the function f is not continuous at the point r = 0. [2 marks] (e). Find for the following functions (i). y = [3 marks) (ii). y? + ay = 6x. [3 marks] (iii). y = x".
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