Chapter 5.3, Problem 81E

(a)

To determine

To find : the maximum and minimum point of the function

Answer to Problem 81E

The maximum points of the function are $\underset{\_}{\boxed{\left(\pi /4,\sqrt{2}\right)}}$ radians.

The minimum point of the function are $\underset{\_}{\boxed{\left(5\pi /4,-\sqrt{2}\right)}}$ radians.

Explanation of Solution

Given information : Function $f\left(x\right)=\sin x+\cos x$ ; Trigonometric Equation $\cos x-\sin x=0$ ; $\left[0,2\pi \right)$

Concept Involved:

A maximum is a high point and a minimum is a low point over the given interval.

Graph:

  

Interpretation:

The graph of the function $f\left(x\right)=sinx+cosx$ shows, at $x=\pi /4$ radians the graph has the maximum value of $\sqrt{2}$ and at $x=5\pi /4$ radians the graph has the minimum value of $-\sqrt{2}$ .

(b)

To determine

To find : all the solutions of the trigonometric equations in the given interval

Answer to Problem 81E

The solution to the given trigonometric equation are $\underset{\_}{\boxed{x=\frac{\pi }{4},\&\frac{5\pi }{4}}}$ radians.

Explanation of Solution

Given information : Function $f\left(x\right)=\sin x+\cos x$ ; Trigonometric Equation $\cos x-\sin x=0$ ; $\left[0,2\pi \right)$

Concept Involved:

Solution to a quadratic equation are the values of x that makes the equation TRUE.

To solve a trigonometric equation, use standard algebraic techniques (when possible) such as collecting like terms, extracting square roots, and factoring.

Our preliminary goal in solving a trigonometric equation is to isolate the trigonometric function on one side of the equation.

Calculation:

Divide throughout the equation by $\cos x$

  $\frac{\cos x}{\cos x}-\frac{\sin x}{\cos x}=\frac{0}{\cos x}$

Simplify fraction throughout the equation

  $1-\tan x=0$

Solving the equation and finding x values that makes it true in the interval $\left[0,2\pi \right)$

• By subtracting 1 on both sides of the equation
• By simplify on both sides of the equation
• By dividing -1 on both sides of the equation
• By simplifying fraction on both sides of the equation
$\begin{array}{l}1-\tan x-1=0-1\\ -\tan x=-1\\ \frac{-\tan x}{-1}=\frac{-1}{-1}\\ \tan x=1\\ x={\tan }^{-1}\left(1\right)\\ x=\frac{\pi }{4},\frac{5\pi }{4}\end{array}$

Conclusion:

  $x=\frac{\pi }{4},\&\frac{5\pi }{4}$ radians are the zero of the function and solution to the equation $\cos x-\sin x=0$ in the interval $\left[0,2\pi \right)$