1c:[[["$","script",null,{"type":"application/ld+json","dangerouslySetInnerHTML":{"__html":"{\"@context\":\"https://schema.org\",\"@type\":\"BreadcrumbList\",\"itemListElement\":[{\"@type\":\"ListItem\",\"position\":1,\"name\":\"Home\",\"item\":\"https://studyquestionhub.com\"},{\"@type\":\"ListItem\",\"position\":2,\"name\":\"Textbooks\",\"item\":\"https://studyquestionhub.com/textbook\"},{\"@type\":\"ListItem\",\"position\":3,\"name\":\"Math\",\"item\":\"https://studyquestionhub.com/textbook/math\"},{\"@type\":\"ListItem\",\"position\":4,\"name\":\"Algebra and Trigonometry\",\"item\":\"https://studyquestionhub.com/textbook/math/algebra-and-trigonometry-3-edition\"},{\"@type\":\"ListItem\",\"position\":5,\"name\":\"Chapter 3\"}]}"}}],["$","script",null,{"type":"application/ld+json","dangerouslySetInnerHTML":{"__html":"{\"@context\":\"https://schema.org\",\"@type\":\"CollectionPage\",\"name\":\"Chapter 3 - Algebra and Trigonometry Solutions\",\"description\":\"Step-by-step solutions for exercises in Chapter 3.\",\"url\":\"https://studyquestionhub.com/textbook/math/algebra-and-trigonometry-3-edition/chapter-3\",\"mainEntity\":{\"@type\":\"ItemList\",\"numberOfItems\":401,\"itemListElement\":[{\"@type\":\"ListItem\",\"position\":1,\"name\":\"Problem 93\",\"url\":\"https://studyquestionhub.com/question-textbook/problem-93-even-and-odd-power-functions-what-must-be-true-ab-1104398.html\"}]}}"}}]],["$","$L24",null,{"subjectSlug":"math","textbookSlug":"algebra-and-trigonometry-3-edition","chapterSlug":"chapter-3","initialPage":9,"initialLimit":50,"initialData":{"textbook":{"slug":"algebra-and-trigonometry-3-edition","title":"Algebra and Trigonometry","author":"James Stewart, Lothar Redlin, Saleem Watson","subject":"Math","subject_slug":"math"},"chapter":{"title":"Chapter 3","chapter_number":3,"slug":"chapter-3"},"exercises":[{"id":1104398,"title":"Problem 93","question":"

Even and Odd Power Functions What must be true about the integer \$n\$ if the\nfunction \n$$ \nf(x)=x^{n} \n$$ \nis an even function? If it is an odd function? Why do you think the names\n\"even\" and \"odd\" were chosen for these function properties?

","short_answer":"n must be even for an even function and odd for an odd function. The names align with parity of the exponent n in the function x^n.","hints":[],"solutions":[{"solution_steps":[{"title":"Step 1: Define Even Functions","description":"A function is considered even if it satisfies the condition \$ f(x) = f(-x) \$ for all \$ x \$ in the domain of \$ f \$. This means the graph of the function is symmetric about the \$ y \$-axis."},{"title":"Step 2: Apply Definition to the Function f(x) = x^n (Even Case)","description":"For \$ f(x) = x^n \$ to be even, it must satisfy \$ f(x) = f(-x) \$. This translates to the equation \$ x^n = (-x)^n \$. This equation holds true if \$ n \$ is an even integer because when an even integer exponent is applied to \$-x\$, it results in \$x^n\$."},{"title":"Step 3: Define Odd Functions","description":"A function is considered odd if it satisfies the condition \$ f(-x) = -f(x) \$ for all \$ x \$ in the domain of \$ f \$. This means the graph of the function is symmetric about the origin."},{"title":"Step 4: Apply Definition to the Function f(x) = x^n (Odd Case)","description":"For \$ f(x) = x^n \$ to be odd, it must satisfy \$ f(-x) = -f(x) \$. This translates to the equation \$ (-x)^n = -x^n \$. This equation holds true if \$ n \$ is an odd integer, as raising \$-x\$ to an odd power results in \$-x^n\$."},{"title":"Step 5: Explain the Naming of Even and Odd Functions","description":"The terms 'even' and 'odd' are derived from the parity of the exponent \$ n \$ in the function \$ f(x) = x^n \$. When \$ n \$ is even, the function is even, and when \$ n \$ is odd, the function is odd. This connection stems from the behavior of powers of negative numbers."}]}],"original_studyset":26196416,"original_studyset_id":26196416,"textbook_exercise_image_ids":[],"textbook_exercise_images":[],"tags":[],"shared":true,"url_path_segment":"problem-93-even-and-odd-power-functions-what-must-be-true-ab","published_to_website":true,"published_to_website_at":"2025-01-14T00:00:29.455937+01:00","is_reference":false,"textbooks_count":1,"icon":"https://publicfiles-studysmarter.b-cdn.net/partner_logos/studysmarter.svg","page_number":null,"section":null,"textbook_chapter":22523,"ai_generated":"generate-TBS","mini_article":{"sections":[{"text":"When we talk about integer powers, we're referring to numbers that are multiplied by themselves a certain number of times. For example, in the expression \$ x^n \$, \$ n \$ is the integer power. This notation tells us how many times we multiply \$ x \$ by itself.

**Important Points:**

If you have a positive integer exponent \$ n \$, such as 3 in \$ x^3 \$, you multiply \$ x \$ by itself three times: \$ x \\times x \\times x \$.
For negative exponents, they represent division by the number: \$ x^{-n} = \\frac{1}{x^n} \$.

When \$ n \$ is zero, any number raised to the zero power is 1, except for zero itself, which is undefined. These rules remain the same whether \$ n \$ is even or odd, directly impacting the symmetry of the functions as outlined in the solutions above.
This pattern and understanding of powers are crucial when considering function symmetry and algebraic functions, especially when exploring even and odd functions.","concept_headline":"Understanding Integer Powers"},{"text":"$25","concept_headline":"Exploring Function Symmetry"},{"text":"$26","concept_headline":"Algebraic Functions and Their Properties"}]},"textbooks":[{"textbook_id":13828,"textbook_title":"Algebra and Trigonometry","page_number":null,"section":null}]}],"total":401,"page":9,"totalPages":9}}]]