Chapter 2.3 Continuity PDF
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This document outlines the concept of continuity in mathematics. It discusses continuous functions, providing definitions and examples. Analysis of continuous functions is shown.
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60 Functions, Limits, Continuity and Differentiability 97 Introduction. E3 The word ‘Continuous’ means without any break or gap. If the graph of a function has no break, or gap or jump, then it is said to be continuous. A function which is not continuous is called a discontinuous function. continuou...
60 Functions, Limits, Continuity and Differentiability 97 Introduction. E3 The word ‘Continuous’ means without any break or gap. If the graph of a function has no break, or gap or jump, then it is said to be continuous. A function which is not continuous is called a discontinuous function. continuous. Similarly tan x , cot x , sec x , 1 etc. are also discontinuous function. x U Continuous function Y ID While studying graphs of functions, we see that graphs of functions sin x , x, cos x , ex etc. are continuous but greatest integer function [x] has break at every integral point, so it is not Y (0, 1) – – /2 D YG –2 2 X O /2 (0,– 1) Y Discontinuous function Y 3 2 1 f (x) = x X X X 0 X f(x)= 1/x y = sin x Y X’ – 3 O 1 – –1 –1 2 – – 2 3 Y’ X 2 3 y = [x] U 2.3.1 Continuity of a Function at a Point. A function f (x ) is said to be continuous at a point x a of its domain iff lim f (x ) f (a). i.e. a x a ST function f (x ) is continuous at x a if and only if it satisfies the following three conditions : (1) f (a) exists. (‘a’ lies in the domain of f) f (x ) exist i.e. lim f (x ) lim f (x ) or R.H.L. = L.H.L. (2) lim x a x a x a (3) lim f (x ) f (a) (limit equals the value of function). x a Cauchy’s definition of continuity : A function f is said to be continuous at a point a of its domain D if for every 0 there exists 0 (dependent on ) such that | x a | | f (x ) f (a)| . Comparing this definition with the definition of limit we find that f (x ) is continuous at x a if lim f (x ) exists and is equal to f (a) i.e., if lim f (x ) f (a) lim f (x ). x a x a x a 98 Functions, Differentiability Limits, Continuity and Heine’s definition of continuity : A function f is said to be continuous at a point a of its domain D, converging to a, the sequence a n of the points in D converging to a, the sequence < f (a n ) converges to f (a) i.e. lim a n a lim f (a n ) f (a). This definition is mainly used to prove the discontinuity to a function. 60 Note : Continuity of a function at a point, we find its limit and value at that point, if these two exist and are equal, then function is continuous at that point. Formal definition of continuity : The function f (x ) is said to be continuous at x a, in its domain if for any arbitrary chosen positive number 0 , we can find a corresponding number 2.3.2 Continuity from Left and Right. Function f (x ) is said to be (1) Left continuous at x = a if lim f (x ) f (a) x a 0 x a 0 ID (2) Right continuous at x a if Lim f (x ) f (a). E3 depending on such that| f (x ) f (a)| x for which 0 | x a | . Thus a function f (x ) is continuous at a point x a if it is left continuous as well as right Solution: (d) x , x 3 x 3 is continuous at x = 3, then = If f(x) = 4 , 3 x 5 , x 3 D YG Example: 1 U continuous at x a. (a) 4 (b) 3 L.H.L. at x = 3, lim f (x ) lim (x ) (c) 2 = lim (3 h ) = 3 R.H.L. at x = 3, lim f (x ) lim (3 x 5) = lim {3(3 h) 5} = 4 x 3 x 3 x 3 x 3 (d) 1 …..(i) h 0 …..(ii) h 0 Value of function f (3) 4 …..(iii) For continuity at x = 3 Limit of function = value of function 3 + = 4 = 1. 1 x sin , x 0 If f (x ) is continuous at x = 0, then the value of k is x k , x 0 U Example: 2 (a) 1 (b) –1 (c) 0 (d) 2 If function is continuous at x = 0, then by the definition of continuity f (0) lim f (x ) ST Solution: (c) [MP PET 1999; AMU 1999; Rajasthan PET 20 x 0 1 since f (0 ) k. Hence, f (0 ) k lim (x ) sin x 0 x k = 0 (a finite quantity lies between –1 to 1) k = 0. Example: 3 Solution: (c) 2 x 1 when x 1 when x 1 is continuous at x =1, then the value of k is If f (x ) k 5 x 2 when x 1 (a) 1 (b) 2 Since f (x ) is continuous at x = 1, (c) 3 lim f (x ) lim f (x ) f (1) x 1 Now h 0 (d) 4 …..(i) x 1 lim f (x ) lim f (1 h) = lim 2(1 h) 1 3 i.e., lim f ( x ) 3 x 1 [Rajasthan PET 2001] h 0 x 1 Similarly, lim f (x ) lim f (1 h) = lim 5(1 h) 2 i.e., lim f (x ) 3 h 0 x 1 h 0 Functions, Limits, Continuity and Differentiability 99 x 1 So according to equation (i), we have k = 3. 1 sin , x 0 The value of k which makes f (x ) x continuous at x = 0 is [Rajasthan PET 1993; UPSEAT 1995] k , x 0 (a) 8 Solution: (d) (b) 1 We have lim f (x ) lim sin x 0 x 0 (c) –1 (d) None of these 60 Example: 4 1 = An oscillating number which oscillates between –1 and 1. x Hence, lim f ( x ) does not exist. Consequently f (x ) cannot be continuous at x 0 for any value of k. x 0 mx 2 , x 1 The value of m for which the function f (x ) is continuous at x 1 , is 2 x, x 1 (a) 0 (b) 1 (c) 2 LHL = lim f (x ) lim m(1 h)2 m x 1 h 0 (d) Does not exist ID Solution: (c) E3 Example: 5 RHL = lim f (x ) lim 2(1 h) 2 and f (1) m x 1 h 0 Function is continuous at x 1 , LHL = RHL = f (1) (cos x )1 / x , x 0 If the function f (x ) is continuous at x 0 , then the value of k is ,x 0 k D YG Example: 6 U Therefore m 2. (a) 1 Solution: (a) (b) –1 lim (cos x )1 / x k lim x 0 x 0 (c) 0 (d) e 1 1 1 lim log cos x log k lim 0 log e k k 1. log(cos x ) log k lim x 0 x x 0 x x 0 x 2.3.3 Continuity of a Function in Open and Closed Interval. Open interval : A function f (x ) is said to be continuous in an open interval (a, b) iff it is U continuous at every point in that interval. Note : This definition implies the non-breakable behavior of the function f (x ) in the ST interval (a, b). Closed interval : A function f (x ) is said to be continuous in a closed interval [a, b] iff, (1) f is continuous in (a, b) (2) f is continuous from the right at ‘a’ i.e. lim f (x ) f (a) x a (3) f is continuous from the left at ‘b’ i.e. lim f (x ) f (b). x b 100 Functions, Differentiability Example: 7 Limits, Continuity and 2 , x a 2 sin x If the function f (x ) x cot x b , b sin 2 x a cos 2 x , 0x 4 2 4 x , is continuous in the interval [0, ] then the values 2 x of (a, b) are Solution: (b) (b) (0, 0) Since f is continuous at x 4 b 4 a 2 2 sin 4 1 b a2 2. b a2 2 2 ; f 2 f (x ) lim f h h 0 2 0 lim x 2 b sin 2 a cos 2 lim ( h) cot( h) b b. 0 a(1) 0 b a b. 2 2 h 0 2 2 ID (d) (1, –1) ; f f h f h (1) b 0 a 2 2 sin 0 4 4 4 4 4 4 4 h 0 h 0 Also as f is continuous at x (c) (–1, 1) E3 (a) (–1, –1) 60 [Roorkee 1998] Hence (0, 0) satisfy the above relations. Solution: (c) U So, D YG Example: 8 x 1 sin 2 for x 1 for 1 x 3 is continuous in the interval (, 6) then the values of a If the function f (x ) ax b x for 3 x 6 6 tan 12 and b are respectively [MP PET 1998] (a) 0, 2 (b) 1, 1 (c) 2, 0 (d) 2, 1 The turning points for f (x ) are x 1, 3. lim f (x ) lim f (1 h) = lim 1 sin (1 h) = 1 sin 0 = 2 h 0 h 0 2 2 x 1 Similarly, lim f (x ) lim f (1 h) = lim a(1 h) b = a + b h 0 x 1 h 0 f (x ) is continuous at x 1, so lim f (x ) lim f (x ) f (1) x 1 x 1 U 2ab..…..(i) Again, lim f (x ) lim f (3 h) = lim a(3 h) b = 3a b and lim f (x ) lim f (3 h) = lim 6 tan x 3 h 0 h 0 x 3 h 0 h 0 12 (3 h) = 6 f (x ) is continuous in (, 6) , so it is continuous at x 3 also, so lim f (x ) lim f (x ) f (3) ST x 3 x 3 3a b 6..….(ii) Solving (i) and (ii) a = 2, b = 0. Trick : In above type of questions first find out the turning points. For example in above question they are x = 1,3. Now find out the values of the function at these points and if they are same then the function is continuous i.e., in above problem. 1 sin 2 x ; x 1, f (x ) ax b ; 1 x 3 x ; 3x 6 6 tan 12 f (1) 2 f (1) a b, f (3) 3 a b f (3) 6 Which gives 2 a b and 6 3a b after solving above linear equations we get a 2, b 0. when 0 x x sin x , 2 then If f (x ) sin( x ), when x 2 2 (a) f (x ) is discontinuous at x (b) f (x ) is continuous at x 2 (c) f (x ) is continuous at x 0 lim f (x ) Solution: (a) x 2 , lim f (x ) 2 x 2 [IIT 1991] and f . ` 2 2 2 2 x 2 2 (a) 8 (b) –8 ID 1 cos 4 x , when x 0 x2 If f (x ) a , when x 0 is continuous at x = 0, then the value of ‘a’ will be x , when x 0 (16 x ) 4 (c) 4 [IIT 1990; AMU 2 (d) None of these 2 sin 2 2 x 4 8 and lim f (x ) lim [( 16 x ) 4 ] 8 lim f (x ) lim 2 x 0 x 0 (2 x ) x 0 x 0 Solution: (a) D YG Hence a 8. U Example: 10 E3 x 2 None of these (d) Since lim lim f (x ) , Function is discontinuous at x 60 Example: 9 Functions, Limits, Continuity and Differentiability 101 2.3.4 Continuous Function. (1) A list of continuous functions : Function f(x) (i) Constant K Interval in which f(x) is continuous (–, ) (–, ) (iii) x–n (n is a positive integer) (–, ) – {0} U (ii) xn, (n is a positive integer) (iv) |x – a| p(x ) a0 x n a1 x n 1 a2 x n 2 ........ an ST (v) (vi) p( x ) , where p(x) and q(x) are polynomial in q( x ) (–, ) (–, ) (–, ) – {x : q(x) = 0} x (vii) sin x (–, ) (viii) cos x (–, ) (ix) tan x (–, ) – {(2n + 1)/2 : n I} (x) cot x (xi) sec x (–, ) – {n : n I} (–, ) – {(2n 1) /2 : n I} 102 Functions, Differentiability (xii) cosec x Limits, Continuity and (–, ) – {n : n I} (–, ) (xiii) e x (0, ) (xiv) log e x 60 (2) Properties of continuous functions : Let f (x ) and g(x ) be two continuous functions at x a. Then (i) cf (x ) is continuous at x = a, where c is any constant E3 (ii) f (x ) g(x ) is continuous at x a. (iii) f (x ). g(x ) is continuous at x a. (iv) f (x ) / g(x ) is continuous at x a , provided g(a) 0. ID Important Tips A function f (x ) is said to be continuous if it is continuous at each point of its domain. A function f (x ) is said to be everywhere continuous if it is continuous on the entire real line R i.e. (, ). eg. U polynomial function e x , sin x, cos x, constant, x n , | x a | etc. Integral function of a continuous function is a continuous function. If g(x) is continuous at x = a and f(x) is continuous at x = g(a) then (fog) (x) is continuous at x a. If f(x) is continuous in a closed interval [a, b] then it is bounded on this interval. If f(x) is a continuous function defined on [a, b] such that f(a) and f(b) are of opposite signs, then there is atleast one value of x for which f(x) vanishes. i.e. if f(a)>0, f(b) < 0 c (a, b) such that f(c) = 0. D YG If f(x) is continuous on [a, b] and maps [a, b] into [a, b] then for some x [a, b] we have f(x) = x. (3) Continuity of composite function : If the function u f (x ) is continuous at the point x a, and the function y g(u) is continuous at the point u f (a) , then the composite function y (gof )(x ) g( f (x )) is continuous at the point x = a. U 2.3.5 Discontinuous Function. ST (1) Discontinuous function : A function ‘f’ which is not continuous at a point x a in its domain is said to be discontinuous there at. The point ‘a’ is called a point of discontinuity of the function. The discontinuity may arise due to any of the following situations. (i) lim f (x ) or lim f (x ) or both may not exist x a x a (ii) lim f (x ) as well as lim f (x ) may exist, but are unequal. x a x a (iii) lim f (x ) as well as lim f (x ) both may exist, but either of the two or both may not be equal x a x a to f (a). Important Tips A function f is said to have removable discontinuity at x = a if lim f (x ) lim f (x ) but their common value is not equal x a to f(a). x a Functions, Limits, Continuity and Differentiability 103 Such a discontinuity can be removed by assigning a suitable value to the function f at x = a. If lim f (x ) does not exist, then we can not remove this discontinuity. So this become a non-removable discontinuity or essential discontinuity. If f is continuous at x = c and g is discontinuous at x = c, then x a (a) f +g and f – g are discontinuous (b) f.g may be continuous If f and g are discontinuous at x = c, then f + g, f – g and fg may still be continuous. Point functions (domain and range consists one value only) is not a continuous function. The points of discontinuity of y u u 2 where u 1 (b) , 1, 2 2 1 (a) , 1, 2 2 1 is x 1 1 , 1, 2 2 (c) when u 2 1 1 1 1 x 2. 2 x , when u 1 x 1 2 x 1 The function f (x ) 1 , 1, 2. 2 U Hence, the composite y g( f ( x )) is discontinuous at three points Example: 12 (d) None of these 1 is discontinuous at the point x 1. The function x 1 1 1 y g(x ) 2 is discontinuous at u 2 and u 1 u u 2 (u 2) (u 1) The function u f (x ) ID Solution: (a) 1 2 E3 Example: 11 60 log(1 ax ) log(1 bx ) is not defined at x 0. The value which should be assigned to x D YG f at x = 0 so that it is continuous at x = 0, is (b) a b (a) a b Solution: (b) (c) log a log b (d) log a log b Since limit of a function is a b as x 0 , therefore to be continuous at x 0 , its value must be a b at x 0 f (0) a b. Example: 13 x2 4x 3 If f (x ) x 2 1 , for x 1 , then 2 , for x 1 lim f ( x ) 2 x 1 U (a) [IIT 1972] (b) (c) f (x ) is discontinuous at x 1 f (1) 2, f (1) lim ST Solution: (c) f (1) lim x 1 Example: 14 x2 4x 3 x 1 x2 4x 3 x2 1 x2 1 lim x 1 (d) None of these (x 3) 1 (x 1) 1 f (1) f (1). Hence the function is discontinuous at x 1. x 1, x 0 1 If f (x ) , x 0 , then 42 x , x 0 (a) lim f (x ) 1 x 0 (c) f (x ) is discontinuous at x 0 Solution: (c) lim f ( x ) 3 x 1 [Roorkee 1988] (b) lim f (x ) 1 x 0 (d) None of these Clearly from curve drawn of the given function f (x ) , it is discontinuous at x 0. 104 Functions, Differentiability Limits, Continuity and y y = x2, x > 0 (0,1/4) x' x O 60 (0,–1) y = x-1, x < 0 x 0 6 , then the values of a and b if f is continuous at x 0 , are x 0 0x respectively (b) a (1 | sin x |) | sin x| f (x ) b tan 2 x e tan 3 x 2 2/3 ,e 3 (c) 3 3/2 ,e 2 (d) None of these x 0 6 x 0 0 x 6 ; ; ; D YG Solution: (b) 2 3 , 3 2 6 U (a) ID Example: 15 a (1 | sin x |) | sin x| , Let f (x ) b , tan 2 x e tan 3 x , E3 y' For f (x ) to be continuous at x 0 a lim | sin x| | sin x| a lim f (x ) f (0 ) lim f (x ) lim (1 | sin x |) | sin x| e x 0 x 0 x 0 x 0 tan 2 x tan 3 x .2 x .3 x 2x 3x Now, lim e tan 2 x / tan 3 x lim e U x 0 ea b e2 / 3 a ea lim e 2 / 3 e 2 / 3. x 0 2 and b e 2 / 3. 3 x Let f (x ) be defined for all x 0 and be continuous. Let f (x ) satisfy f f (x ) f (y) for all x, y and y ST Example: 16 x 0 f (e ) 1, then (a) f (x ) In x Solution: (a) [IIT 1995] (b) f (x ) is bounded 1 (c) f 0 as x 0 (d) xf (x ) 1 as x 0 x Let f (x ) In (x ), x 0 f (x ) In (x ) is a continuous function of x for every positive value of x. x x f In In (x ) In (y ) f (x ) f (y ). y y Functions, Limits, Continuity and Differentiability 105 Example: 17 Let f (x ) [x ] sin , where [.] denotes the greatest integer function. The domain of f is ….. and [x 1] the points of discontinuity of f in the domain are (b) {x R | x [1, 0)}, I {0} (c) {x R | x [1, 0)}, I {0} (d) None of these 60 Solution: (c) (a) {x R | x [1, 0)}, I {0} Note that [ x 1] 0 if 0 x 1 1 i.e. [ x 1] 0 if 1 x 0. E3 Thus domain of f is R [1, 0) {x [1, 0)} We have sin is continuous at all points of R [1, 0) and [x ] is continuous on R I, where I [ x 1] denotes the set of integers. Thus the points where f can possibly be discontinuous are……, 3, 2, 1, 0 1, 2,........... But for ID is defined. 0 x 1, [x ] 0 and sin [ x 1] Therefore f ( x ) 0 for 0 x 1. U Also f (x ) is not defined on 1 x 0. Therefore, continuity of f at 0 means continuity of f from right at 0. Since f is continuous from Example: 18 f (0 ) is D YG right at 0, f is continuous at 0. Hence set of points of discontinuities of f is I {0}. If the function f (x ) 2 x sin 1 x 2 x tan 1 x (a) 2 Solution: (b) , (x 0) is continuous at each point of its domain, then the value of (b) 1/3 2 x sin 1 x f (0) f (x ) lim x 0 2 x tan 1 x [Rajasthan PET 2000] (c) 2/3 (d) – 1/3 0 , form 0 ST U 1 2 2 1x 2 1 1 Applying L-Hospital’s rule, f (0 ) lim x 0 2 1 3 1 2 1 x2 sin 1 x 2 1 1 2 x sin x x lim . Trick : f (0) = lim x 0 2 x tan 1 x x 0 2 1 3 tan 1 x 2 x Example: 19 1 2 x 2 sin x , 2 f ( x ) A sin x B , x , is continuous everywhere The values of A and B such that the function 2 2 cos x , x 2 are [Pb. CET 2000] 106 Functions, Differentiability Limits, Continuity (a) A 0, B 1 lim (2 sin x ) For continuity at all x R , we must have f lim ( A sin x B) x ( / 2) 2 x ( / 2) 2 A B …..(i) and f lim ( A sin x B) lim (cos x ) x ( / 2) 2 x ( / 2) 0 AB ….(ii) From (i) and (ii), A 1 and B 1. If f (x ) x 2 10 x 25 for x 5 and f is continuous at x 5, then f (5 ) x 2 7 x 10 (a) 0 [EAMCET 2001] E3 Example: 20 (d) A 1, B 0 (c) A 1, B 1 (b) A 1, B 1 60 Solution: (c) and (b) 5 (c) 10 (d) 25 (x 5 )2 5 5 0. x 5 ( x 2)(x 5 ) 52 x 2 10 x 25 lim Solution: (a) f (5 ) lim f ( x ) lim Example: 21 In order that the function f (x ) (x 1)cot x is continuous at x 0 , f (0 ) must be defined as x 5 x 7 x 10 ID x 5 2 1 (a) f (0 ) e x 0 1 lim (1 x ) x x 0 x cot x lim x 1 x 0 tan x lim (1 x ) x e1 e. x 0 D YG x 0 The function f (x ) sin | x | is (a) Continuous for all x [DCE 2002] (b) Continuous only at certain points (c) Differentiable at all points Solution: (a) ST f (x ) is continuous at x (b) 1 , then 2 If f (x ) (a) Solution: (d) 1 4 [Rajasthan PET 2002] (c) 0 lim f (x ) f (0) or lim x / 2 x / 2 Applying L-Hospital’s rule, lim Example: 24 None of these 1 sin x , x 2 x 2 be continuous at x , then value of is If f (x ) 2 , x 2 (a) –1 Solution: (c) (d) It is obvious. U Example: 23 (d) None of these For continuity at 0, we must have f (0 ) lim f ( x ) lim ( x 1) cot x Example: 22 (c) f (0 ) e U Solution: (c) (b) f (0) 0 [UPSEAT 2000; Haryana CEE 2001] x / 2 (d) 2 1 sin x 2x 0 , form 0 cos x cos x 0. lim x / 2 2 2 2 x4 ; (x 0 ), is continuous function at x 0 , then f (0 ) equals sin 2 x (b) 1 4 (c) If f (x ) is continuous at x 0, then, f (0 ) lim f (x ) lim x 0 x 0 1 8 2 x4 sin 2 x [MP PET 2002] (d) 0 , form 0 1 8 1 2 x4 Using L–Hospital’s rule, f (0) lim x 0 2 cos 2 x Example: 25 Functions, Limits, Continuity and Differentiability 107 1. 8 if x is rational x If function f (x ) , then f (x ) is continuous at...... number of points 1 x if x is irrational (a) Example: 26 (c) 0 At no point, function is continuous. 1 2 2 x x e The function defined by f (x ) k 1 , x 2 , is continuous from right at the point x = 2, then , x 2 k is equal to (b) 1/4 and f (2) k (c) –1/4 U 1 f (x ) x 2 e 2 x 1 [Orissa JEE 2002] (d) None of these ID (a) 0 Solution: (b) (d) None of these E3 Solution: (c) (b) 1 60 [UPSEAT 2002] If f (x ) is continuous from right at x 2 then lim f (x ) f (2) k x 2 1 1 2 2 (2 h) k k lim f (2 h) k lim (2 h) e h 0 h 0 D YG 1 lim x 2 e 2 x x 2 k lim 4 h 2 4 h e 1 / h h 0 Example: 27 1 1 2 ST (a) Solution: (c) x 2 sin 2 lim f (x ) lim x x x 2 cos 2 2 sin 2 4 1 kx 1 kx If f (x ) x 2x 2 3x 2 (a) – 4 Solution: (c) (b) 2 cos 2 At x , f ( ) tan Example: 28 k [4 0 0 e ] 1 k 1 2 x 0 [Orissa JEE 2003] (c) – 1 x x x cos sin cos 2 2 2 lim x x x x cos sin cos 2 2 2 (d) 1 x 2 lim tan x x x 4 2 2 1. , for 1 x 0 is continuous at x 0, then k [EAMCET 2003] , for 0 x 1 (b) – 3 L.H.L. lim 1. 4 1 sin x cos x is not defined at x . The value of f ( ), so that f (x ) is continuous 1 sin x cos x U at x , is The function f (x ) 1 1 kx 1 kx k x (c) – 2 (d) – 1 108 Functions, Differentiability Limits, Continuity and R.H.L. lim (2 x 2 3 x 2) 2 x 0 Since it is continuous, hence L.H.L = R.H.L k 2. The function f (x ) | x | | x| is x [Karnataka CET 2003] (a) Continuous at the origin (b) Discontinuous at the origin because |x| is discontinuous there | x| is discontinuous there x (d) Discontinuous at the origin because both |x| and | x | is continuous at x 0 and | x| is discontinuous at x 0. x ST U D YG U f (x ) | x | | x| is discontinuous at x 0 x ID Solution: (c) | x| are discontinuous there x E3 (c) Discontinuous at the origin because 60 Example: 29