How to find sin 0 and cot0
Answers
Answered by
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:
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