Question

How to find sin 0 and cot0

​

Answer 1

Answer:

cot

0

 doesn't exist; the cotangent doesn't exist for values of  

x =n π

.

Explanation:

Recall that  

cot

x

=

cos

x

sin

x

.

Then,

cot

0

=

cos

0

sin

0

.

cos

0

=

1

,

sin

0

=

0

,

so

cot

0

=

1

0

doesn't exist (division by zero). This gives rise to the fact that  

cot

x

doesn't exist for  

x

=

n

π

.

Step-by-step explanation: