Using Properties of Logarithms and Trigonometric Identities In Exercises 87–90, show that the two formulas are equivalent. ∫ c o t x d x = ln | s i n x | + C ∫ cot x d x = − ln | csc x | + C
Solution Summary: The author explains how to solve the equation given below.
Using Properties of Logarithms and Trigonometric Identities In Exercises 87–90, show that the two formulas are equivalent.
∫
c
o
t
x
d
x
=
ln
|
s
i
n
x
|
+
C
∫
cot
x
d
x
=
−
ln
|
csc
x
|
+
C
Equations that give the relation between different trigonometric functions and are true for any value of the variable for the domain. There are six trigonometric functions: sine, cosine, tangent, cotangent, secant, and cosecant.
FOURIER ANALYSIS
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