How to prove coax=sinxcotx
To prove that coax = sin x cot x, we need to manipulate the left-hand side (LHS) and right-hand side (RHS) of the equation until they are identical.
Starting with the LHS:
LHS = coax
Using the definition of the cotangent function, we know that cot x is equal to cos x divided by sin x:
LHS = cos x / sin x
Now, let's manipulate the RHS:
RHS = sin x cot x
Using the definition of the cotangent function again, we can substitute cot x with cos x / sin x:
RHS = sin x (cos x / sin x)
The sin x in the numerator and denominator cancels out:
RHS = cos x
Now we can see that the LHS (cos x / sin x) is equal to the RHS (cos x).
Therefore, we have proven that coax = sin x cot x.