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| <math>f(cot x)'= f({cos x \over sin x})'= - {csc}^2 x</math> | | <math>f(cot x)'= f({cos x \over sin x})'= - {csc}^2 x</math> |
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| | ==csc x== |
| | why did <math>f(csc x)'= -csc(x) cot</math> |
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| | In trigonometry |
| | <math> csc x = {1 /over sin x}</math> |
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| | so |
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| | <math>f(csc x)'= f({1 /over sin x})'</math> |
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| | by using the Quotient Rule <math>({f \over g})' = {(gf'-fg') \over g^2} </math> |
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| | g = sin x |
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| | f = 1 |
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| | <math>f({1 /over sin x})' = {{sin x (1)' - 1 (sin x)'} /over {sin}^2 x}</math> |
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| | need to know (1)'= 0 |
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| | and (sin x)' = cos x |
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| | so |
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| | <math>f({1 /over sin x})' = {{(0 sin x)- cos x} /over {sin}^2 x}</math> |
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| | next |
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| | <math>f({1 /over sin x})' = {- cos x /over {sin}^2 x}</math> |
How do we get the equation
and you only can tell by looking at the graph so we will skip it to.
tan x
So we will started with
We know that 
If you have learn trigonometry then.
by using the Quotient Rule 
need to know that
cot x
why did
first start with
so
by using the Quotient Rule
but
so
csc x
why did 
In trigonometry
so
by using the Quotient Rule
g = sin x
f = 1
need to know (1)'= 0
and (sin x)' = cos x
so
next
