Question

) {1, 2, 3, …., 10} ≠ {x : x ∈ N and 1 < x < 10} (ii) {2, 4, 6, 8, 10} ≠ {x : x = 2n+1 and x ∈ N}

Answer 1

Answer:Correct option is

B

3 only

Left hand limit=lim

x→1

−

​

f(x)

=

h→0

lim

​

f(1−h)

=

h→0

lim

​

2+(1−h)=2+1=3

Right hand limit=

x→1

+

lim

​

f(x)

=

h→0

lim

​

f(1+h)

=

h→0

lim

​

2+(1+h)=2+1=3

So, the limit exists at x=1

Left hand limit=

x→0

−

lim

​

f(x)

=

h→0

lim

​

f(0−h)

=

h→0

lim

​

2−(0−h)=2−0=2

Right hand limit=

x→0

+

lim

​

f(x)

=

h→0

lim

​

f(0+h)

=

h→0

lim

​

2+(0+h)=2+0=2

So, LHL=RHL=f(0)

So, f(x) is continuous at x=0

Right hand limit=

h→0

lim

​

h

f(0+h)−f(0)

​

=

h→0

lim

​

h

(2+(0+h))−2

​

=

h→0

lim

​

h

h

​

=1

Left hand limit=

h→0

lim

​

−h

f(0−h)−f(0)

​

=

h→0

lim

​

−h

(2−(0−h))−(2)

​

=

h→0

lim

​

−h

h

​

=−1

LHL



=RHL

So, f(x) is not differentiable at x=0

The answer is option (B)

Step-by-step explanation: