{"id":796,"date":"2024-04-08T15:28:44","date_gmt":"2024-04-08T15:28:44","guid":{"rendered":"https:\/\/content.one.lumenlearning.com\/calculus1\/?post_type=chapter&#038;p=796"},"modified":"2024-08-05T12:09:01","modified_gmt":"2024-08-05T12:09:01","slug":"basic-functions-and-graphs-background-youll-need-1","status":"publish","type":"chapter","link":"https:\/\/content.one.lumenlearning.com\/calculus1\/chapter\/basic-functions-and-graphs-background-youll-need-1\/","title":{"raw":"Basic Functions and Graphs: Background You\u2019ll Need 1","rendered":"Basic Functions and Graphs: Background You\u2019ll Need 1"},"content":{"raw":"<section class=\"textbox learningGoals\">\r\n<ul>\r\n\t<li><span data-sheets-root=\"1\" data-sheets-value=\"{&quot;1&quot;:2,&quot;2&quot;:&quot;Understand and apply interval notation to describe ranges of values &quot;}\" data-sheets-userformat=\"{&quot;2&quot;:769,&quot;3&quot;:{&quot;1&quot;:0},&quot;11&quot;:4,&quot;12&quot;:0}\">Apply set and interval notation to describe ranges of values <\/span><\/li>\r\n<\/ul>\r\n<\/section>\r\n<h2>Applying Set and Interval Notation<\/h2>\r\n<p>Set notation and interval notation are crucial tools in mathematics for describing ranges of values precisely and concisely. These notations assist in expressing solutions to equations, defining function domains and ranges, and setting up integration and summation intervals.<\/p>\r\n<p><strong>Set Notation<\/strong> generally refers to a way of describing sets with a list of elements or a rule that the elements must follow, often expressed in the form [latex] \\{x | \\text{ property of } x\\}[\/latex]. This can include descriptions of sets that are not continuous, such as [latex]\\{1, 2, 3, 4\\}[\/latex] or [latex]\\{x | x \\text{ is an even integer}\\}[\/latex].<\/p>\r\n<p><strong>Interval Notation<\/strong> focuses on describing continuous intervals on the real number line, often using parentheses and brackets, such as [latex](a, b)[\/latex] or [latex][c, d)[\/latex]. In interval notation:<\/p>\r\n<ul>\r\n\t<li>We use <strong>parentheses ( )<\/strong> for intervals to indicate that the endpoint is not included, known as an open interval.<\/li>\r\n\t<li>We use <strong>brackets [ ]<\/strong> for intervals to indicate that the endpoint is included, known as a closed interval.<\/li>\r\n\t<li>The <strong>union symbol<\/strong> [latex]\\cup[\/latex] is used to combine disjoint sets or intervals that are part of the domain or range but do not directly connect.<\/li>\r\n\t<li><strong>Infinity (\u221e)<\/strong> is always accompanied by a parenthesis because infinity is not a number but rather a concept of endlessness.<\/li>\r\n<\/ul>\r\n<section class=\"textbox keyTakeaway\">\r\n<h3>set and interval notation<\/h3>\r\n<ul>\r\n\t<li><strong>Set Notation<\/strong>: Uses curly braces [latex]\\{\\}[\/latex] to list elements explicitly or to describe them with conditions.<\/li>\r\n\t<li><strong>Interval Notation<\/strong>: Efficient for describing continuous ranges, using brackets [latex][][\/latex]for closed intervals and parentheses [latex]( )[\/latex] for open intervals.<\/li>\r\n<\/ul>\r\n<\/section>\r\n<section class=\"textbox example\">\r\n<p>Some examples of set and interval notation being used are:<\/p>\r\n<ol>\r\n\t<li><strong>Describing a Domain<\/strong>: The domain of [latex]f(x)=\\sqrt{x\u22123}[\/latex] is all [latex]x[\/latex] such that [latex]x\u22123\u22650[\/latex]. In interval notation, this is [latex][3,\u221e)[\/latex].<\/li>\r\n\t<li><strong>Solution Sets<\/strong>: For the inequality [latex]x^2\u22124&lt;12[\/latex], solve to find [latex]x&lt;4[\/latex] and [latex]x&gt;\u22124[\/latex], described as [latex](\u22124,4)[\/latex].<\/li>\r\n\t<li><strong>Defining Function Ranges<\/strong>: If a function [latex]f[\/latex] maps real numbers to their squares, the range can be set as [latex][0,\u221e)[\/latex], representing all non-negative real numbers.<\/li>\r\n<\/ol>\r\n<\/section>\r\n<section class=\"textbox proTip\">\r\n<p>Always determine whether the interval should include the endpoints based on the conditions given.<\/p>\r\n<\/section>\r\n<section class=\"textbox example\">\r\n<p>Write the following sets using interval notation.<\/p>\r\n<ol>\r\n\t<li>The set of all real numbers greater than [latex]5[\/latex]<\/li>\r\n\t<li>[latex] {x\u2223x\u2264\u22122}[\/latex]<\/li>\r\n\t<li>[latex]{x\u2223x\u2264\u22123 \\text{ or } x\u22653}[\/latex]<\/li>\r\n<\/ol>\r\n<p><br \/>\r\n[reveal-answer q=\"519465\"]Show Answer[\/reveal-answer]<br \/>\r\n[hidden-answer a=\"519465\"]<\/p>\r\n<ol>\r\n\t<li>This set includes every real number greater than [latex]5[\/latex], but not [latex]5[\/latex] itself. In interval notation, you represent this as [latex](5,\u221e)[\/latex].<\/li>\r\n\t<li>The set describes all real numbers less than or equal to [latex]-2[\/latex]. In interval notation, this is written as [latex](\u2212\u221e,\u22122][\/latex].<\/li>\r\n\t<li>This set includes all real numbers less than or equal to [latex]-3[\/latex] and all real numbers greater than or equal to [latex]3[\/latex]. In interval notation, these two conditions are represented as two separate intervals combined using the union symbol. Thus, the notation for this set is [latex](\u2212\u221e,\u22123]\u222a[3,\u221e)[\/latex].[\/hidden-answer]<\/li>\r\n<\/ol>\r\n<\/section>\r\n<section class=\"textbox tryIt\">\r\n<p>[ohm_question]287041[\/ohm_question]<\/p>\r\n<\/section>\r\n<p>&nbsp;<\/p>","rendered":"<section class=\"textbox learningGoals\">\n<ul>\n<li><span data-sheets-root=\"1\" data-sheets-value=\"{&quot;1&quot;:2,&quot;2&quot;:&quot;Understand and apply interval notation to describe ranges of values &quot;}\" data-sheets-userformat=\"{&quot;2&quot;:769,&quot;3&quot;:{&quot;1&quot;:0},&quot;11&quot;:4,&quot;12&quot;:0}\">Apply set and interval notation to describe ranges of values <\/span><\/li>\n<\/ul>\n<\/section>\n<h2>Applying Set and Interval Notation<\/h2>\n<p>Set notation and interval notation are crucial tools in mathematics for describing ranges of values precisely and concisely. These notations assist in expressing solutions to equations, defining function domains and ranges, and setting up integration and summation intervals.<\/p>\n<p><strong>Set Notation<\/strong> generally refers to a way of describing sets with a list of elements or a rule that the elements must follow, often expressed in the form [latex]\\{x | \\text{ property of } x\\}[\/latex]. This can include descriptions of sets that are not continuous, such as [latex]\\{1, 2, 3, 4\\}[\/latex] or [latex]\\{x | x \\text{ is an even integer}\\}[\/latex].<\/p>\n<p><strong>Interval Notation<\/strong> focuses on describing continuous intervals on the real number line, often using parentheses and brackets, such as [latex](a, b)[\/latex] or [latex][c, d)[\/latex]. In interval notation:<\/p>\n<ul>\n<li>We use <strong>parentheses ( )<\/strong> for intervals to indicate that the endpoint is not included, known as an open interval.<\/li>\n<li>We use <strong>brackets [ ]<\/strong> for intervals to indicate that the endpoint is included, known as a closed interval.<\/li>\n<li>The <strong>union symbol<\/strong> [latex]\\cup[\/latex] is used to combine disjoint sets or intervals that are part of the domain or range but do not directly connect.<\/li>\n<li><strong>Infinity (\u221e)<\/strong> is always accompanied by a parenthesis because infinity is not a number but rather a concept of endlessness.<\/li>\n<\/ul>\n<section class=\"textbox keyTakeaway\">\n<h3>set and interval notation<\/h3>\n<ul>\n<li><strong>Set Notation<\/strong>: Uses curly braces [latex]\\{\\}[\/latex] to list elements explicitly or to describe them with conditions.<\/li>\n<li><strong>Interval Notation<\/strong>: Efficient for describing continuous ranges, using brackets [latex][][\/latex]for closed intervals and parentheses [latex]( )[\/latex] for open intervals.<\/li>\n<\/ul>\n<\/section>\n<section class=\"textbox example\">\n<p>Some examples of set and interval notation being used are:<\/p>\n<ol>\n<li><strong>Describing a Domain<\/strong>: The domain of [latex]f(x)=\\sqrt{x\u22123}[\/latex] is all [latex]x[\/latex] such that [latex]x\u22123\u22650[\/latex]. In interval notation, this is [latex][3,\u221e)[\/latex].<\/li>\n<li><strong>Solution Sets<\/strong>: For the inequality [latex]x^2\u22124<12[\/latex], solve to find [latex]x<4[\/latex] and [latex]x>\u22124[\/latex], described as [latex](\u22124,4)[\/latex].<\/li>\n<li><strong>Defining Function Ranges<\/strong>: If a function [latex]f[\/latex] maps real numbers to their squares, the range can be set as [latex][0,\u221e)[\/latex], representing all non-negative real numbers.<\/li>\n<\/ol>\n<\/section>\n<section class=\"textbox proTip\">\n<p>Always determine whether the interval should include the endpoints based on the conditions given.<\/p>\n<\/section>\n<section class=\"textbox example\">\n<p>Write the following sets using interval notation.<\/p>\n<ol>\n<li>The set of all real numbers greater than [latex]5[\/latex]<\/li>\n<li>[latex]{x\u2223x\u2264\u22122}[\/latex]<\/li>\n<li>[latex]{x\u2223x\u2264\u22123 \\text{ or } x\u22653}[\/latex]<\/li>\n<\/ol>\n<div class=\"wp-nocaption \"><\/div>\n<div class=\"qa-wrapper\" style=\"display: block\"><button class=\"show-answer show-answer-button collapsed\" data-target=\"q519465\">Show Answer<\/button><\/p>\n<div id=\"q519465\" class=\"hidden-answer\" style=\"display: none\">\n<ol>\n<li>This set includes every real number greater than [latex]5[\/latex], but not [latex]5[\/latex] itself. In interval notation, you represent this as [latex](5,\u221e)[\/latex].<\/li>\n<li>The set describes all real numbers less than or equal to [latex]-2[\/latex]. In interval notation, this is written as [latex](\u2212\u221e,\u22122][\/latex].<\/li>\n<li>This set includes all real numbers less than or equal to [latex]-3[\/latex] and all real numbers greater than or equal to [latex]3[\/latex]. In interval notation, these two conditions are represented as two separate intervals combined using the union symbol. Thus, the notation for this set is [latex](\u2212\u221e,\u22123]\u222a[3,\u221e)[\/latex].<\/div>\n<\/div>\n<\/li>\n<\/ol>\n<\/section>\n<section class=\"textbox tryIt\">\n<iframe loading=\"lazy\" id=\"ohm287041\" class=\"resizable\" src=\"https:\/\/ohm.lumenlearning.com\/multiembedq.php?id=287041&theme=lumen&iframe_resize_id=ohm287041&source=tnh&show_question_numbers\" width=\"100%\" height=\"150\"><\/iframe><br \/>\n<\/section>\n<p>&nbsp;<\/p>\n","protected":false},"author":15,"menu_order":2,"template":"","meta":{"_candela_citation":"[]","pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":""},"chapter-type":[],"contributor":[],"license":[],"part":143,"module-header":"background_you_need","content_attributions":[],"internal_book_links":[],"video_content":null,"cc_video_embed_content":{"cc_scripts":"","media_targets":[]},"try_it_collection":null,"_links":{"self":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapters\/796"}],"collection":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/wp\/v2\/users\/15"}],"version-history":[{"count":56,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapters\/796\/revisions"}],"predecessor-version":[{"id":4439,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapters\/796\/revisions\/4439"}],"part":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/parts\/143"}],"metadata":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapters\/796\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/wp\/v2\/media?parent=796"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/pressbooks\/v2\/chapter-type?post=796"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/wp\/v2\/contributor?post=796"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/content.one.lumenlearning.com\/calculus1\/wp-json\/wp\/v2\/license?post=796"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}