 |
VOOZH | about |
|
VOOZH | about |
Solution:
To prove the continuity of the function f(x) = 5x β 3, first we have to calculate limits and function value at that point.
Continuity at x = 0
Left limit =
= (5(0) - 3) = -3
Right limit =
= (5(0) - 3)= -3
Function value at x = 0, f(0) = 5(0) - 3 = -3
As, ,
Hence, the function is continuous at x = 0.
Continuity at x = -3
Left limit =
= (5(-3) - 3) = -18
Right limit =
= (5(-3) - 3) = -18
Function value at x = -3, f(-3) = 5(-3) - 3 = -18
As,
Hence, the function is continuous at x = -3.
Continuity at x = 5
Left limit =
= (5(5) - 3) = 22
Right limit =
= (5(5) - 3) = 22
Function value at x = 5, f(5) = 5(5) - 3 = 22
As,
Hence, the function is continuous at x = 5.
Solution:
To prove the continuity of the function f(x) = 2x2 - 1, first we have to calculate limits and function value at that point.
Continuity at x = 3
Left limit =
= (2(3)2 - 1) = 17
Right limit =
= (2(3)2 - 1) = 17
Function value at x = 3, f(3) = 2(3)2 - 1 = 17
As,
Hence, the function is continuous at x = 3.
Solution:
To prove the continuity of the function f(x) = x - 5, first we have to calculate limits and function value at that point.
Let's take a real number, c
Continuity at x = c
Left limit =
= (c - 5) = c - 5
Right limit =
= (c - 5) = c - 5
Function value at x = c, f(c) = c - 5
As, for any real number c
Hence, the function is continuous at every real number.
Solution:
To prove the continuity of the function f(x) = , first we have to calculate limits and function value at that point.
Let's take a real number, c
Continuity at x = c and c β 5
Left limit =
Right limit =
Function value at x = c, f(c) =
As, for any real number c
Hence, the function is continuous at every real number.
Solution:
To prove the continuity of the function f(x) = , first we have to calculate limits and function value at that point.
Let's take a real number, c
Continuity at x = c and c β -5
Left limit =
= c - 5
Right limit =
= c - 5
Function value at x = c, f(c) =
= c - 5
As, , for any real number c
Hence, the function is continuous at every real number.
Solution:
To prove the continuity of the function f(x) = |x - 5|, first we have to calculate limits and function value at that point.
Here,
As, we know that modulus function works differently.
In |x - 5|, |x - 5| = x - 5 when x>5 and |x - 5| = -(x - 5) when x < 5
Let's take a real number, c and check for three cases of c:
Continuity at x = c
When c < 5
Left limit =
= -(c - 5)
= 5 - c
Right limit =
= -(c - 5)
= 5 - c
Function value at x = c, f(c) = |c - 5| = 5 - c
As,
Hence, the function is continuous at every real number c, where c<5.
When c > 5
Left limit =
= (c - 5)
Right limit =
= (c - 5)
Function value at x = c, f(c) = |c - 5| = c - 5
As, ,
Hence, the function is continuous at every real number c, where c > 5.
When c = 5
Left limit =
Right limit =
Function value at x = c, f(c) = |5 - 5| = 0
As,
Hence, the function is continuous at every real number c, where c = 5.
Hence, we can conclude that, the modulus function is continuous at every real number.
Solution:
To prove the continuity of the function f(x) = xn, first we have to calculate limits and function value at that point.
Continuity at x = n
Left limit =
= nn
Right limit =
= nn
Function value at x = n, f(n) = nn
As,
Hence, the function is continuous at x = n.
To prove the continuity of the function f(x), first we have to calculate limits and function value at that point.
Continuity at x = 0
Left limit =
Right limit =
Function value at x = 0, f(0) = 0
As,
Hence, the function is continuous at x = 0.
Continuity at x = 1
Left limit =
Right limit =
Function value at x = 1, f(1) = 1
As, ,
Hence, the function is not continuous at x = 1.
Continuity at x = 2
Left limit =
Right limit =
Function value at x = 2, f(2) = 5
As, ,
Therefore, the function is continuous at x = 2.
Solution:
Here, as it is given that
For x β€ 2, f(x) = 2x + 3, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-β, 2)
Now, For x > 2, f(x) = 2x - 3, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (2, β)
So now, as f(x) is continuous in x β (-β, 2) U (2, β) = R - {2}
Let's check the continuity at x = 2,
Left limit =
= (2(2) + 3)
= 7
Right limit =
= (2(2) - 3)
= 1
Function value at x = 2, f(2) = 2(3) + 3 = 7
As,
Therefore, the function is discontinuous at only x = 2.
Solution:
Here, as it is given that
For x β€ -3, f(x) = |x| + 3,
As, we know that modulus function works differently.
In |x|, |x - 0| = x when x > 0 and |x - 0| = -x when x < 0
f(x) = -x + 3, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-β, -3)
For -3 < x < 3, f(x) = -2x, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-3, 3)
Now, for x β₯ 3, f(x) = 6x + 2, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (3, β)
So now, as f(x) is continuous in x β (-β, -3) U(-3, 3) U (3, β) = R - {-3, 3}
Let's check the continuity at x = -3,
Left limit =
= (-(-3) + 3)
= 6
Right limit =
= (-2(-3))
= 6
Function value at x = -3, f(-3) = |-3| + 3 = 3 + 3 = 6
As,
Hence, the function is continuous at x = -3.
Now, let's check the continuity at x = 3,
Left limit =
= (-2(3))
= -6
Right limit =
= (6(3) + 2)
= 20
Function value at x = 3, f(3) = 6(3) + 2 = 20
As,
Therefore, the function is discontinuous only at x = 3.
Solution:
As, we know that modulus function works differently.
In |x|, |x - 0| = x when x > 0 and |x - 0|= -x when x < 0
When x < 0, f(x) = = -1, which is a constant
As constant functions are continuous, hence f(x) is continuous x β (-β, 0).
When x > 0, f(x) = = 1, which is a constant
As constant functions are continuous, hence f(x) is continuous x β (0, β).
So now, as f(x) is continuous in x β (-β, 0) U(0, β) = R - {0}
Let's check the continuity at x = 0,
Left limit =
Right limit =
Function value at x = 0, f(0) = 0
As,
Hence, the function is discontinuous at only x = 0.
Solution:
As, we know that modulus function works differently.
In |x|, |x - 0| = x when x > 0 and |x - 0| = -x when x < 0
When x < 0, f(x) = = -1, which is a constant
As constant functions are continuous, hence f(x) is continuous x β (-β, 0).
When x > 0, f(x) = -1, which is a constant
As constant functions are continuous, hence f(x) is continuous x β (0, β).
So now, as f(x) is continuous in x β (-β, 0) U(0, β) = R - {0}
Let's check the continuity at x = 0,
Left limit =
Right limit =
Function value at x = 0, f(0) = -1
As,
Hence, the function is continuous at x = 0.
So, we conclude that the f(x) is continuous at any real number. Hence, no point of discontinuity.
Solution:
Here,
When x β₯1, f(x) = x + 1, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (1, β)
When x < 1, f(x) = x2 + 1, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (-β, 1)
So now, as f(x) is continuous in x β (-β, 1) U (1, β) = R - {1}
Let's check the continuity at x = 1,
Left limit =
= 1 + 1
= 2
Right limit =
= 1 + 1
= 2
Function value at x = 1, f(1) = 1 + 1 = 2
As,
Hence, the function is continuous at x = 1.
So, we conclude that the f(x) is continuous at any real number.
Solution:
Here,
When x β€ 2, f(x) = x3 + 3, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (-β, 2)
When x > 2, f(x) = x2 + 1, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (2, β)
So now, as f(x) is continuous in x β (-β, 2) U(2, β) = R - {2}
Let's check the continuity at x = 2,
Left limit =
Right limit =
Function value at x = 2, f(2) = 8 - 3 = 5
As,
Hence, the function is continuous at x = 2.
So, we conclude that the f(x) is continuous at any real number.
Solution:
Here,
When x β€ 1, f(x) = x10 - 1, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (-β, 1)
When x >1, f(x) = x2, which is a polynomial
As polynomial functions are continuous, hence f(x) is continuous x β (1, β)
So now, as f(x) is continuous in x β (-β, 1) U (1, β) = R - {1}
Let's check the continuity at x = 1,
Left limit =
= 1 - 1
= 0
Right limit =
Function value at x = 1, f(1) = 1 - 1 = 0
As,
Hence, the function is discontinuous at x = 1.
Solution:
Here, as it is given that
For x β€ 1, f(x) = x + 5, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-β, 1)
Now, For x > 1, f(x) = x - 5, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (1, β)
So now, as f(x) is continuous in x β (-β, 1) U (1, β) = R - {1}
Let's check the continuity at x = 1,
Left limit =
= (1 + 5)
= 6
Right limit =
= (1 - 5)
= -4
Function value at x = 1, f(1) = 5 + 1 = 6
As,
Hence, the function is continuous for only R - {1}.
Solution:
Here, as it is given that
For 0 β€ x β€ 1, f(x) = 3, which is a constant
As constants are continuous, hence f(x) is continuous x β (0, 1)
Now, For 1 < x < 3, f(x) = 4, which is a constant
As constants are continuous, hence f(x) is continuous x β (1, 3)
For 3 β€ x β€ 10, f(x) = 5, which is a constant
As constants are continuous, hence f(x) is continuous x β (3, 10)
So now, as f(x) is continuous in x β (0, 1) U (1, 3) U (3, 10) = (0, 10) - {1, 3}
Let's check the continuity at x = 1,
Left limit =
Right limit =
Function value at x = 1, f(1) = 3
As,
Hence, the function is discontinuous at x = 1.
Now, let's check the continuity at x = 3,
Left limit =
Right limit =
Function value at x = 3, f(3) = 4
As,
Hence, the function is discontinuous at x = 3.
So concluding the results, we get
Therefore, the function f(x) is discontinuous at x = 1 and x = 3.
Solution:
Here, as it is given that
For x < 0, f(x) = 2x, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-β, 0)
Now, For 0 β€ x β€ 1, f(x) = 0, which is a constant
As constant are continuous, hence f(x) is continuous x β (0, 1)
For x > 1, f(x) = 4x, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (1, β)
So now, as f(x) is continuous in x β (-β, 0) U (0, 1) U (1, β)= R - {0, 1}
Let's check the continuity at x = 0,
Left limit =
Right limit =
Function value at x = 0, f(0) = 0
As,
Hence, the function is continuous at x = 0.
Now, let's check the continuity at x = 1,
Left limit =
Right limit =
Function value at x = 1, f(1) = 0
As,
Hence, the function is discontinuous at x = 1.
Therefore, the function is continuous for only R - {1}
Solution:
Here, as it is given that
For x β€ -1, f(x) = -2, which is a constant
As constant are continuous, hence f(x) is continuous x β (-β, -1)
Now, For -1 β€ x β€ 1, f(x) = 2x, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (-1, 1)
For x > 1, f(x) = 2, which is a constant
As constant are continuous, hence f(x) is continuous x β (1, β)
So now, as f(x) is continuous in x β (-β, -1) U (-1, 1) U (1, β)= R - {-1, 1}
Let's check the continuity at x = -1,
Left limit =
Right limit =
Function value at x = -1, f(-1) = -2
As,
Hence, the function is continuous at x = -1.
Now, let's check the continuity at x = 1,
Left limit =
Right limit =
Function value at x = 1, f(1) = 2(1) = 2
As,
Hence, the function is continuous at x = 1.
Therefore, the function is continuous for any real number.
Solution:
As, it is given that the function is continuous at x = 3.
It should satisfy the following at x = 3:
Continuity at x = 3,
Left limit =
= (a(3) + 1)
= 3a + 1
Right limit =
= (b(3) + 3)
= 3b + 3
Function value at x = 3, f(3) = a(3) + 1 = 3a + 1
So equating both the limits, we get
3a + 1 = 3b + 3
3(a - b) = 2
a - b = 2/3
Solution:
To be continuous function, f(x) should satisfy the following at x = 0:
Continuity at x = 0,
Left limit =
= Ξ»(02- 2(0)) = 0
Right limit =
= Ξ»4(0) + 1 = 1
Function value at x = 0, f(0) =
As, 0 = 1 cannot be possible
Hence, for no value of Ξ», f(x) is continuous.
But here,
Continuity at x = 1,
Left limit =
= (4(1) + 1) = 5
Right limit =
= 4(1) + 1 = 5
Function value at x = 1, f(1) = 4(1) + 1 = 5
As,
Hence, the function is continuous at x = 1 for any value of Ξ».
Solution:
[x] is greatest integer function which is defined in all integral points, e.g.
[2.5] = 2
[-1.96] = -2
x-[x] gives the fractional part of x.
e.g: 2.5 - 2 = 0.5
c be an integer
Let's check the continuity at x = c,
Left limit =
= (c - (c - 1)) = 1
Right limit =
= (c - c) = 0
Function value at x = c, f(c) = c - [c]= c - c = 0
As,
Hence, the function is discontinuous at integral.
c be not an integer
Let's check the continuity at x = c,
Left limit =
= (c - (c - 1)) = 1
Right limit =
= (c - (c - 1)) = 1
Function value at x = c, f(c) = c - [c] = c - (c - 1) = 1
As,
Hence, the function is continuous at non-integrals part.
Solution:
Let's check the continuity at x = Ο,
f(x) = x2 β sin x + 5
Let's substitute, x = Ο+h
When xβ’Ο, Continuity at x = Ο
Left limit =
= (Ο2 β sinΟ + 5) = Ο2 + 5
Right limit =
= (Ο2 β sinΟ + 5) = Ο2 + 5
Function value at x = Ο, f(Ο) = Ο2 β sin Ο + 5 = Ο2 + 5
As,
Hence, the function is continuous at x = Ο .
Solution:
Here,
f(x) = sin x + cos x
Let's take, x = c + h
When xβ’c then hβ’0
So,
(sin(c + h) + cos(c + h))
Using the trigonometric identities, we get
sin(A + B) = sin A cos B + cos A sin B
cos(A + B) = cos A cos B - sin A sin B
((sinc cosh + cosc sinh) + (cosc cosh β sinc sinh))
= ((sinc cos0 + cosc sin0) + (cosc cos0 β sinc sin0))
cos 0 = 1 and sin 0 = 0
= (sinc + cosc) = f(c)
Function value at x = c, f(c) = sinc + cosc
As, = f(c) = sinc + cosc
Hence, the function is continuous at x = c.
Solution:
Here,
f(x) = sin x - cos x
Let's take, x = c+h
When xβ’c then hβ’0
So,
(sin(c + h) β cos(c + h))
Using the trigonometric identities, we get
sin(A + B) = sin A cos B + cos A sin B
cos(A + B) = cos A cos B - sin A sin B
((sinc cosh + cosc sinh) β (cosc cosh β sinc sinh))
= ((sinc cos0 + cosc sin0) β (cosc cos0 β sinc sin0))
cos 0 = 1 and sin 0 = 0
= (sinc β cosc) = f(c)
Function value at x = c, f(c) = sinc β cosc
As, = f(c) = sinc β cosc
Hence, the function is continuous at x = c.
Solution:
Here,
f(x) = sin x + cos x
Let's take, x = c+h
When xβ’c then hβ’0
So,
sin(c + h) Γ cos(c + h))
Using the trigonometric identities, we get
sin(A + B) = sin A cos B + cos A sin B
cos(A + B) = cos A cos B - sin A sin B
((sinc cosh + cosc sinh) Γ (cosc cosh β sinc sinh))
= ((sinc cos0 + cosc sin0) Γ (cosc cos0 β sinc sin0))
cos 0 = 1 and sin 0 = 0
= (sinc Γ cosc) = f(c)
Function value at x = c, f(c) = sinc Γ cosc
As, = f(c) = sinc Γ cosc
Hence, the function is continuous at x = c.
Solution:
Continuity of cosine
Here,
f(x) = cos x
Let's take, x = c+h
When xβ’c then hβ’0
So,
Using the trigonometric identities, we get
cos(A + B) = cos A cos B - sin A sin B
(cosc cosh β sinc sinh)
= (cosc cos0 β sinc sin0)
cos 0 = 1 and sin 0 = 0
= (cosc) = f(c)
Function value at x = c, f(c) = (cosc)
As, = f(c) = (cosc)
Hence, the cosine function is continuous at x = c.
Continuity of cosecant
Here,
f(x) = cosec x =
Domain of cosec is R - {nΟ}, n β Integer
Let's take, x = c + h
When xβ’c then hβ’0
So,
Using the trigonometric identities, we get
sin(A + B) = sin A cos B + cos A sin B
cos 0 = 1 and sin 0 = 0
Function value at x = c, f(c) =
As,
Hence, the cosecant function is continuous at x = c.
Continuity of secant
Here,
f(x) = sec x =
Let's take, x = c + h
When xβ’c then hβ’0
So,
Using the trigonometric identities, we get
cos(A + B) = cos A cos B - sin A sin B
cos 0 = 1 and sin 0 = 0
Function value at x = c, f(c) =
As,
Hence, the secant function is continuous at x = c.
Continuity of cotangent
Here,
f(x) = cot x =
Let's take, x = c+h
When xβ’c then hβ’0
So,
Using the trigonometric identities, we get
sin(A + B) = sin A cos B + cos A sin B
cos(A + B) = cos A cos B - sin A sin B
cos 0 = 1 and sin 0 = 0
Function value at x = c, f(c) =
As,
Hence, the cotangent function is continuous at x = c.
Solution:
Here,
From the two continuous functions g and h, we get
= continuous when h(x) β 0
For x < 0, f(x) = , is continuous
Hence, f(x) is continuous x β (-β, 0)
Now, For x β₯ 0, f(x) = x + 1, which is a polynomial
As polynomial are continuous, hence f(x) is continuous x β (0, β)
So now, as f(x) is continuous in x β (-β, 0) U (0, β)= R - {0}
Let's check the continuity at x = 0,
Left limit =
Right limit =
Function value at x = 0, f(0) = 0 + 1 = 1
As,
Hence, the function is continuous at x = 0.
Hence, the function is continuous for any real number.
Solution:
Here, as it is given that
For x = 0, f(x) = 0, which is a constant
As constant are continuous, hence f(x) is continuous x β = R - {0}
Let's check the continuity at x = 0,
As, we know range of sin function is [-1,1]. So, -1 β€ β€ 1 which is a finite number.
Limit =
= (02 Γ(finite number)) = 0
Function value at x = 0, f(0) = 0
As,
Hence, the function is continuous for any real number.
Solution:
Continuity at x = 0,
Left limit =
= (sin0 β cos0) = 0 β 1 = β1
Right limit =
= (sin0 β cos0) = 0 β 1 = β1
Function value at x = 0, f(0) = sin 0 - cos 0 = 0 - 1 = -1
As,
Hence, the function is continuous at x = 0.
Continuity at x = c (real number cβ 0),
Left limit =
= (sinc β cosc)
Right limit =
= (sinc β cosc)
Function value at x = c, f(c) = sin c - cos c
As,
So concluding the results, we get
The function f(x) is continuous at any real number.
Solution:
Continuity at x = Ο/2
Let's take x =
When xβ’Ο/2 then hβ’0
Substituting x = +h, we get
cos(A + B) = cos A cos B - sin A sin B
Limit =
Function value at x = = 3
As, should satisfy, for f(x) being continuous
k/2 = 3
k = 6
Solution:
Continuity at x = 2
Left limit =
= k(2)2 = 4k
Right limit =
Function value at x = 2, f(2) = k(2)2 = 4k
As, should satisfy, for f(x) being continuous
4k = 3
k = 3/4
Solution:
Continuity at x = Ο
Left limit =
= k(Ο) + 1
Right limit =
= cos(Ο) = -1
Function value at x = Ο, f(Ο) = k(Ο) + 1
As, should satisfy, for f(x) being continuous
kΟ + 1 = -1
k = -2/Ο
Solution:
Continuity at x = 5
Left limit =
= k(5) + 1 = 5k + 1
Right limit =
= 3(5) - 5 = 10
Function value at x = 5, f(5) = k(5) + 1 = 5k + 1
As, should satisfy, for f(x) being continuous
5k + 1 = 10
k = 9/5
Solution:
Continuity at x = 2
Left limit =
Right limit =
Function value at x = 2, f(2) = 5
As, should satisfy, for f(x) being continuous at x = 2
2a + b = 5 ........................(1)
Continuity at x = 10
Left limit =
= 10a + b
Right limit =
= 21
Function value at x = 10, f(10) = 21
As, should satisfy, for f(x) being continuous at x = 10
10a + b = 21 ........................(2)
Solving the eq(1) and eq(2), we get
a = 2
b = 1
Solution:
Let's take
g(x) = cos x
h(x) = x2
g(h(x)) = cos (x2)
To prove g(h(x)) continuous, g(x) and h(x) should be continuous.
Continuity of g(x) = cos x
Let's check the continuity at x = c
x = c + h
g(c + h) = cos (c + h)
When xβ’c then hβ’0
cos(A + B) = cos A cos B - sin A sin B
Limit = (cosc cosh β sinc sinh)
= cosc cos0 β sinc sin0 = cosc
Function value at x = c, g(c) = cos c
As,
The function g(x) is continuous at any real number.
Continuity of h(x) = x2
Let's check the continuity at x = c
Limit =
= c2
Function value at x = c, h(c) = c2
As,
The function h(x) is continuous at any real number.
As, g(x) and h(x) is continuous then g(h(x)) = cos(x2) is also continuous.
Solution:
Let's take
g(x) = |x|
m(x) = cos x
g(m(x)) = |cos x|
To prove g(m(x)) continuous, g(x) and m(x) should be continuous.
Continuity of g(x) = |x|
As, we know that modulus function works differently.
In |x - 0|, |x| = x when x β₯ 0 and |x| = -x when x < 0
Let's check the continuity at x = c
When c < 0
Limit =
Function value at x = c, g(c) = |c| = -c
As,
When c β₯ 0
Limit =
Function value at x = c, g(c) = |c| = c
As,
The function g(x) is continuous at any real number.
Continuity of m(x) = cos x
Let's check the continuity at x = c
x = c + h
m(c + h) = cos (c + h)
When xβ’c then hβ’0
cos(A + B) = cos A cos B - sin A sin B
Limit = (cosc cosh β sinc sinh)
= cosc cos0 β sinc sin0 = cosc
Function value at x = c, m(c) = cos c
As,
The function m(x) is continuous at any real number.
As, g(x) and m(x) is continuous then g(m(x)) = |cos x| is also continuous.
Solution:
Let's take
g(x) = |x|
m(x) = sin x
m(g(x)) = sin |x|
To prove m(g(x)) continuous, g(x) and m(x) should be continuous.
Continuity of g(x) = |x|
As, we know that modulus function works differently.
In |x-0|, |x|=x when xβ₯0 and |x|=-x when x<0
Let's check the continuity at x = c
When c < 0
Limit =
Function value at x = c, g(c) = |c| = -c
As,
When c β₯ 0
Limit =
Function value at x = c, g(c) = |c| = c
As,
The function g(x) is continuous at any real number.
Continuity of m(x) = sin x
Let's check the continuity at x = c
x = c + h
m(c + h) = sin (c + h)
When xβ’c then hβ’0
sin(A + B) = sin A cos B + cos A sin B
Limit = (sinc cosh + cosc sinh)
= sinc cos0 + cos csin0 = sinc
Function value at x = c, m(c) = sin c
As,
The function m(x) is continuous at any real number.
As, g(x) and m(x) is continuous then m(g(x)) = sin |x| is also continuous.
Solution:
Let's take
g(x) = |x|
m(x) = |x + 1|
g(x) - m(x) = | x | β | x + 1 |
To prove g(x) - m(x) continuous, g(x) and m(x) should be continuous.
Continuity of g(x) = |x|
As, we know that modulus function works differently.
In |x - 0|, |x| = x when xβ₯0 and |x| = -x when x < 0
Let's check the continuity at x = c
When c < 0
Limit =
Function value at x = c, g(c) = |c| = -c
As,
When c β₯ 0
Limit =
Function value at x = c, g(c) = |c| = c
As,
The function g(x) is continuous at any real number.
Continuity of m(x) = |x + 1|
As, we know that modulus function works differently.
In |x + 1|, |x + 1| = x + 1 when x β₯ -1 and |x + 1| = -(x + 1) when x < -1
Let's check the continuity at x = c
When c < -1
Limit =
= -(c + 1)
Function value at x = c, m(c) = |c + 1| = -(c + 1)
As,
When c β₯ -1
Limit =
= c + 1
Function value at x = c, m(c) = |c| = c + 1
As, = m(c) = c + 1
The function m(x) is continuous at any real number.
As, g(x) and m(x) is continuous then g(x) - m(x) = |x| β |x + 1| is also continuous.
