4th Edition

ISBN: 9781337516853

Author: Larson

Publisher: CENGAGE CO

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Question

Chapter 5.3, Problem 73E

To determine

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

Expert Solution & Answer

Answer to Problem 73E

The solution to the quadratic equation tan2x+3tanx+1=0 in the interval [0, 2π) are x≈1.9357, 2.7767, 5.0773, & 5.9183 _ radians.

Explanation of Solution

Given information: tan2x+3tanx+1=0

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.

Formula Used:

If we have a quadratic equation of the form ax2+bx+c=0 , then its solution is given by the formula x=−b±b2−4ac2a

Calculation:

Let us substitute u=tanx in the equation tan2x+3tanx+1=0

u2+3u+1=0

Identify the a, b, & c of the quadratic equation au2+bu+c=0

a=1; b=3; c=1

Substituting the values of a, b and c in the formula

u=−3±(3)2−4(1)(1)2(1)

Simplify the expression inside the square root

u=−3±9−42 =−3±52

Find the two values of u u=−3+52 & u=−3−52

Back substitute u=tanx

tanx=−3+52 & tanx=−3−52

Label each equation

tanx=−3+52▶1^s^t equation

tanx=−3−52▶2ⁿ^d equation

Solving the 1^s^t equation tanx=−3+52 over the interval [0, 2π)

x=tan−1(−3+52)

x≈2.77673, 5.91832

Solving the 2ⁿ^d equation tanx=−3−52 over the interval [0, 2π)

x=tan−1(−3−52)

x≈1.93566, 5.07725

Chapter 5.3, Problem 72E

Chapter 5.3, Problem 74E

Chapter 5 Solutions

EBK PRECALCULUS W/LIMITS

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