Difference between revisions of "Calculus:Derivative of Trigonometric Functions"
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(→Sec x) |
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#<math>f(sec x)'= sec(x) tan(x)</math> | #<math>f(sec x)'= sec(x) tan(x)</math> | ||
<noinclude> | |||
==How do we get the equation== | ==How do we get the equation== | ||
<math>f(sin x)'= cos(x)</math> and <math>f(cos x)'= -sin(x)</math> you only can tell by looking at the graph so we will skip it to. | <math>f(sin x)'= cos(x)</math> and <math>f(cos x)'= -sin(x)</math> you only can tell by looking at the graph so we will skip it to. | ||
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<math>f(sin x)'= cos(x)</math> | <math>f(sin x)'= cos(x)</math> | ||
<math>f(cos x)'= -sin(x)</math> | <math>f(cos x)'= -sin(x)</math> | ||
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<math>f({cos x \over sin x})'= {-{sin}^2 x - {cos}^2 x \over {sin}^2 x} </math> | <math>f({cos x \over sin x})'= {-{sin}^2 x - {cos}^2 x \over {sin}^2 x} </math> | ||
but | but | ||
<math> -{sin}^2 x - {cos}^2 x = -1 </math> | <math> -{sin}^2 x - {cos}^2 x = -1 </math> | ||
so | so | ||
<math>f({cos x \over sin x})'= {-1 \over {sin}^2 x} </math> | <math>f({cos x \over sin x})'= {-1 \over {sin}^2 x} </math> | ||
Line 108: | Line 114: | ||
so | so | ||
<math>f({1 \over sin x})' = -cot x * csc x</math> | <math>f({1 \over sin x})' = -cot x * csc x</math> | ||
==Sec x== | |||
why did <math>f(sec x)'= sec(x) tan(x)</math> | |||
In trigonometry | |||
<math> sec x = (1 \over cos x)</math> | |||
so we can say that | |||
<math>f(sec x)'= f({1 \over cos x})'</math> | |||
by using the Quotient Rule <math>({f \over g})' = {(gf'-fg') \over g^2} </math> | |||
g = cos x | |||
f = 1 | |||
<math>({1 \over cos x})' = {cos x (1)' - (1) (cos x)' \over {cos}^2 x} </math> | |||
<math>({1 \over cos x})' = {cos x (1)' - (1) (cos x)' \over {cos}^2 x} </math> | |||
so | |||
<math>{cos x (1)' - (1) (cos x)' \over {cos}^2 x} = {sin x \over {cos}^2 x} </math> | |||
<math> {sin x \over {cos}^2 x} = {{sin x \over cos x}{1 \over cos x}} </math> | |||
In trigonometry | |||
<math>{sin x \over cos x} = tan x </math> | |||
<math>{1 \over cos x} = sec x </math> | |||
</noinclude> |
Latest revision as of 06:33, 17 September 2021
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.
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csc x
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In trigonometry
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In trigonometry
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Sec x
why did
In trigonometry
so we can say that
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In trigonometry