Chapter 5.2, Problem 64E

Solution

To find: A simple function for the given expression and prove that both are the same function.

The simple function for the given expression is $\cos x$ .

Given information:

The given expression is $\sin x\cot x$ .

Formula used:

The trigonometric identity is $\cot x=\frac{\cos x}{\sin x}$ .

Calculation:

The simple function of the given expression that has same graph can be determined using the function’s graph.

Draw the graph of the expression $\sin x\cot x$ . The graph of the function $\sin x\cot x$ is shown below.

  

Figure (1)

From the obtained graph, it can be observed that the graph of given expression is the same as the graph of $\cos x$ .

Therefore, the simple function for the given expression is $\cos x$ .

Simplify the given expression using the trigonometric identity, $\cot x=\frac{\cos x}{\sin x}$ .

  $\begin{array}{c}\sin x\cot x=\sin x\cdot \frac{\cos x}{\sin x}\\ =\cos x\end{array}$

It can be verified that the simple function for the given expression is $\cos x$ .