Consider sec(-5-7x) = 2√3. We wish to determine all solutions for this problem. First solve the equation for x without evaluating the inverse trigonometric function. What is the period of secant? List all values of in the interval [-π, π) such that sec(0) = 2√3. (Notice the relationship between the period and the interval here.) (List all values in this answer box separated by a comma. Depending on the trig function and value, it is possible that there will only be one entry.) Now list ALL values of such that sec (0) where k € Z. = (There will be a separate formula for each value you listed in the previous answer box. List each formula in this answer box separated by a comma. Remember to use [k] as appropriate..) X= 2√3 Of course, we are not really looking for values of 0, we are looking for values of x. Knowing that 0-5 - 7x, find all solutions for x. 0 where k € Z (There will be a separate formula for each value you listed in the previous answer box. List each formula in this answer box separated by a comma. Remember to use k as appropriate.) The principle solution is a
Consider sec(-5-7x) = 2√3. We wish to determine all solutions for this problem. First solve the equation for x without evaluating the inverse trigonometric function. What is the period of secant? List all values of in the interval [-π, π) such that sec(0) = 2√3. (Notice the relationship between the period and the interval here.) (List all values in this answer box separated by a comma. Depending on the trig function and value, it is possible that there will only be one entry.) Now list ALL values of such that sec (0) where k € Z. = (There will be a separate formula for each value you listed in the previous answer box. List each formula in this answer box separated by a comma. Remember to use [k] as appropriate..) X= 2√3 Of course, we are not really looking for values of 0, we are looking for values of x. Knowing that 0-5 - 7x, find all solutions for x. 0 where k € Z (There will be a separate formula for each value you listed in the previous answer box. List each formula in this answer box separated by a comma. Remember to use k as appropriate.) The principle solution is a
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter6: The Trigonometric Functions
Section6.6: Additional Trigonometric Graphs
Problem 59E
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