{"id":6699,"date":"2021-07-20T23:58:45","date_gmt":"2021-07-20T14:58:45","guid":{"rendered":"https:\/\/sasamath.com\/blog\/?page_id=6699"},"modified":"2022-03-06T19:51:58","modified_gmt":"2022-03-06T10:51:58","slug":"asymptotes","status":"publish","type":"page","link":"https:\/\/sasamath.com\/blog\/invitation-to-calculus\/asymptotes\/","title":{"rendered":"\ud568\uc218\uc758 \uadf8\ub798\ud504\uc758 \uc810\uadfc\uc120"},"content":{"rendered":"<div style=\"display: none; visibility: hidden;\">\n<style type=\"text\/css\">\n\timg.mfp-img { background-color: white; }\n<\/style>\n<p><!--\n\\[\n\\newcommand{\\vecf}{{\\mathbf{f}}}\n\\newcommand{\\vecL}{{\\mathbf{L}}}\n\\newcommand{\\vecR}{{\\mathbb{R}}}\n\\newcommand{\\imI}{\\boldsymbol{i}}\n\\]\n-->\n<\/div>\n<div class=\"box itc_intro\">\n<p>\uc774 \uae00\uc740 \u300e\ubbf8\uc801\ubd84\ud559 \uccab\uac78\uc74c\u300f 3\uc7a5 5\uc808\uc758 \ub0b4\uc6a9\uc785\ub2c8\ub2e4.&nbsp; <span class=\"itc_viewcontents\">(<a href=\"..\/\">\ubbf8\uc801\ubd84\ud559 \uccab\uac78\uc74c \ucc28\ub840 \ubcf4\uae30<\/a>)<\/span><\/p>\n<\/div>\n<p>\uc9c1\uad00\uc801\uc73c\ub85c, \uadf8\ub798\ud504 \uc704\uc758 \uc810\uc774 \uc6d0\uc810\uc73c\ub85c\ubd80\ud130 \ud55c \uc5c6\uc774 \uba40\uc5b4\uc9c8 \ub54c \uadf8 \uc810\uc774 \ud558\ub098\uc758 \uc9c1\uc120\uc5d0 \ud55c \uc5c6\uc774 \uac00\uae4c\uc6cc\uc9c0\uba74, \uac00\uae4c\uc6cc\uc9c0\ub294 \uadf8 \uc9c1\uc120\uc744 \ud568\uc218\uc758 \uadf8\ub798\ud504\uc758 \uc810\uadfc\uc120\uc774\ub77c\uace0 \ubd80\ub978\ub2e4. \uc774 \uc808\uc5d0\uc11c\ub294 \uc138 \uac00\uc9c0 \uc885\ub958\uc758 \uc810\uadfc\uc120, \uc989 \uc218\ud3c9\uc810\uadfc\uc120, \uc0ac\uc120\uc810\uadfc\uc120, \uc218\uc9c1\uc810\uadfc\uc120\uc744 \uc0b4\ud3b4\ubcf4\uc790.<\/p>\n<p><!-- ##################################################################### --><\/p>\n<h2 class=\"itc_h2\">\uc218\ud3c9\uc810\uadfc\uc120<\/h2>\n<p>\uc9c1\uc120 \\(y=b\\)\uac00 \ud568\uc218 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc758 <span class=\"defined\">\uc218\ud3c9\uc810\uadfc\uc120<\/span>(horizontal asymptote)\uc774\ub77c \ud568\uc740 \ub2e4\uc74c\uc744 \ub9cc\uc871\uc2dc\ud0a4\ub294 \uac83\uc744 \uc758\ubbf8\ud55c\ub2e4.<br \/>\n\\[\\lim_{x\\rightarrow\\infty} f(x) = b \\quad\\text{or}\\quad \\lim_{x\\rightarrow -\\infty} f(x)=b .\\]\n<\/p>\n<style type=\"text\/css\">\ndiv.example ol.parenthesis li {\nmargin-bottom: 0.8em;\n}<\/p>\n<\/style>\n<div class=\"example\">\n<p><span class=\"example\">\ubcf4\uae30 3.5.1.<\/span><\/p>\n<ol class=\"parenthesis\">\n<li>\ub9cc\uc57d \\(f(x)=\\frac{1}{x}\\)\uc774\uba74<br \/>\n\\[\\lim_{x\\rightarrow\\infty} \\frac{1}{x} =0 \\quad\\text{and}\\quad \\lim_{x\\rightarrow -\\infty} \\frac{1}{x}=0\\]<br \/>\n\uc774\ub2e4. \uadf8\ub7ec\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc218\ud3c9\uc810\uadfc\uc120 \\(y=0\\)\uc744 \uac00\uc9c4\ub2e4.<\/li>\n<li>\ub9cc\uc57d \\(f(x)=e^x\\)\uc774\uba74<br \/>\n\\[\\lim_{x\\rightarrow\\infty} e^x = \\infty \\quad\\text{and}\\quad \\lim_{x\\rightarrow -\\infty} e^x = 0\\]<br \/>\n\uc774\ub2e4. \uadf8\ub7ec\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc218\ud3c9\uc810\uadfc\uc120 \\(y=0\\)\uc744 \uac00\uc9c4\ub2e4.<\/li>\n<li>\ud568\uc218 \\(f\\)\uac00 \ub2e4\uc74c\uacfc \uac19\uc774 \uc8fc\uc5b4\uc84c\ub2e4\uace0 \ud558\uc790.<br \/>\n\\[f(x) = \\frac{x^3 -2}{\\lvert x \\rvert ^3 +1}.\\]<br \/>\n\uadf8\ub7ec\uba74<br \/>\n\\[\\lim_{x\\rightarrow\\infty}  \\frac{x^3 -2}{\\lvert x \\rvert ^3 +1} =1 \\quad\\text{and}\\quad \\lim_{x\\rightarrow -\\infty}  \\frac{x^3 -2}{\\lvert x \\rvert ^3 +1} =-1\\]<br \/>\n\uc774\ub2e4. \uadf8\ub7ec\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \uc11c\ub85c \ub2e4\ub978 \ub450 \uac1c\uc758 \uc9c1\uc120 \\(y=1\\)\uacfc \\(y=-1\\)\uc744 \uc218\ud3c9\uc810\uadfc\uc120\uc73c\ub85c \uac00\uc9c4\ub2e4.<\/li>\n<div class=\"marginbottom1\">\n<img fetchpriority=\"high\" decoding=\"async\" src=\"\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01.png\" alt=\"\" width=\"276\" height=\"201\" class=\"aligncenter size-full wp-image-7257\" srcset=\"https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01.png 1653w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-300x219.png 300w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-1024x748.png 1024w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-768x561.png 768w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-1536x1122.png 1536w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-1170x855.png 1170w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img01-585x428.png 585w\" sizes=\"(max-width: 276px) 100vw, 276px\" \/>\n<\/div>\n<li>\\(f(x) = \\sin x\\)\ub77c\uace0 \ud558\uc790. \uadf8\ub7ec\uba74 \\(x\\rightarrow \\infty\\)\uc77c \ub54c\uc640 \\(x\\rightarrow -\\infty\\)\uc77c \ub54c \ubaa8\ub450 \\(\\sin x\\)\uac00 \uc9c4\ub3d9\ud55c\ub2e4. \uadf8\ub7ec\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \uc218\ud3c9\uc810\uadfc\uc120\uc744 \uac16\uc9c0 \uc54a\ub294\ub2e4.<\/li>\n<li>\\(f(x) = \\frac{\\sin x}{x}\\)\ub77c\uace0 \ud558\uc790. \uadf8\ub7ec\uba74<br \/>\n\\[\\lim_{x\\rightarrow\\infty} \\frac{\\sin x}{x} = 0 \\quad\\text{and}\\quad \\lim_{x\\rightarrow -\\infty} \\frac{\\sin x}{x} = 0\\]<br \/>\n\uc774\ubbc0\ub85c, \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc218\ud3c9\uc810\uadfc\uc120 \\(y=0\\)\uc744 \uac00\uc9c4\ub2e4. \uc774 \uacbd\uc6b0 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc640 \uc810\uadfc\uc120 \\(y=0\\)\uc774 \ubb34\uc218\ud788 \ub9ce\uc740 \uc810\uc5d0\uc11c \uad50\ucc28\ud55c\ub2e4\ub294 \uc810\uc774 \ud765\ubbf8\ub85c\uc6b4 \ud2b9\uc9d5\uc774\ub2e4.<\/li>\n<\/ol>\n<\/div>\n<p><!-- ##################################################################### --><\/p>\n<h2 class=\"itc_h2\">\uc0ac\uc120\uc810\uadfc\uc120<\/h2>\n<p>\uc9c1\uc120 \\(y=ax+b\\)\uac00 \ud568\uc218 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc758 <span class=\"defined\">\uc0ac\uc120\uc810\uadfc\uc120<\/span>(oblique asymptote)\uc774\ub77c \ud568\uc740 \\(a \\ne 0\\)\uc774\uba74\uc11c \uc9c1\uc120 \\(y=0\\)\uc774 \\(y=f(x)-ax-b\\)\uc758 \uc218\ud3c9\uc810\uadfc\uc120\uc778 \uac83\uc744 \uc758\ubbf8\ud55c\ub2e4. \u2018oblique asymptote\u2019\uc744 \u2018slant line asymptote\u2019\ub77c\uace0 \ubd80\ub974\uae30\ub3c4 \ud55c\ub2e4.<\/p>\n<div class=\"example\">\n<p><span class=\"example\">\ubcf4\uae30 3.5.2.<\/span><\/p>\n<ol class=\"parenthesis\">\n<li>\ud568\uc218 \\(f\\)\uac00 \ub2e4\uc74c\uacfc \uac19\uc774 \uc8fc\uc5b4\uc84c\ub2e4\uace0 \ud558\uc790.<br \/>\n\\[f(x) = \\frac{x^2 -3}{2x-4}.\\]<br \/>\n\\(g(x) = \\frac{x}{2} +1\\)\uc774\ub77c\uace0 \ud558\uba74<br \/>\n\\[\\lim_{x\\rightarrow\\infty} (f(x)-g(x)) = \\lim_{x\\rightarrow\\infty} \\frac{1}{4-2x} = 0\\]<br \/>\n\uadf8\ub9ac\uace0<br \/>\n\\[\\lim_{x\\rightarrow -\\infty} (f(x)-g(x)) = \\lim_{x\\rightarrow -\\infty} \\frac{1}{4-2x} = 0\\]<br \/>\n\uc774\ub2e4. \uc989 \\(y=f(x)\\)\ub294 \ud558\ub098\uc758 \uc0ac\uc120\uc810\uadfc\uc120 \\(y=\\frac{x}{2} +1\\)\uc744 \uac00\uc9c4\ub2e4.<\/li>\n<div class=\"marginbottom1\">\n<img decoding=\"async\" src=\"\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02.png\" alt=\"\" width=\"275\" height=\"282\" class=\"aligncenter size-full wp-image-7258\" srcset=\"https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02.png 1647w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-293x300.png 293w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-999x1024.png 999w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-768x788.png 768w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-1498x1536.png 1498w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-1170x1200.png 1170w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img02-585x600.png 585w\" sizes=\"(max-width: 275px) 100vw, 275px\" \/>\n<\/div>\n<li>\\(f(x) = x+e^x\\)\uc774\ub77c\uace0 \ud558\uc790. \uadf8\ub7ec\uba74 \uc784\uc758\uc758 \\(a,\\) \\(b\\)\uc5d0 \ub300\ud558\uc5ec<br \/>\n\\[\\lim_{x\\rightarrow\\infty} \\left\\{ x+e^x &#8211; (ax+b)\\right\\} = \\infty\\]<br \/>\n\uc774\uace0<br \/>\n\\[\\lim_{x\\rightarrow -\\infty} \\left\\{ x + e^x &#8211; x\\right\\} = 0\\]<br \/>\n\uc774\ub2e4. \uadf8\ub7ec\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc0ac\uc120\uc810\uadfc\uc120 \\(y=x\\)\ub97c \uac00\uc9c4\ub2e4.\n<\/li>\n<div class=\"marginbottom1\">\n<img decoding=\"async\" src=\"\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03.png\" alt=\"\" width=\"275\" height=\"282\" class=\"aligncenter size-full wp-image-7259\" srcset=\"https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03.png 1647w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-293x300.png 293w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-999x1024.png 999w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-768x788.png 768w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-1498x1536.png 1498w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-1170x1200.png 1170w, https:\/\/sasamath.com\/blog\/wp-content\/uploads\/2021\/08\/ic_ch03_se05_img03-585x600.png 585w\" sizes=\"(max-width: 275px) 100vw, 275px\" \/>\n<\/div>\n<li>\ub9cc\uc57d \\(f(x)=\\cos x\\)\uc774\uba74, \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \uc0ac\uc120\uc810\uadfc\uc120\uc744 \uac16\uc9c0 \uc54a\ub294\ub2e4.<\/li>\n<\/ol>\n<\/div>\n<p><!-- ##################################################################### --><\/p>\n<h2 class=\"itc_h2\">\uc218\uc9c1\uc810\uadfc\uc120<\/h2>\n<p>\uc9c1\uc120 \\(x=c\\)\uac00 \ud568\uc218 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc758 <span class=\"defined\">\uc218\uc9c1\uc810\uadfc\uc120<\/span>(vertical asymptote)\uc774\ub77c \ud568\uc740 \ub2e4\uc74c\uc744 \ub9cc\uc871\uc2dc\ud0a4\ub294 \uac83\uc744 \uc758\ubbf8\ud55c\ub2e4.<br \/>\n\\[\\lim_{x\\rightarrow c^+} f(x) = \\pm \\infty \\quad\\text{or}\\quad \\lim_{x\\rightarrow c^-} f(x) =\\pm\\infty .\\]\n<\/p>\n<div class=\"example\">\n<p><span class=\"example\">\ubcf4\uae30 3.5.3.<\/span><\/p>\n<ol class=\"parenthesis\">\n<li>\ub9cc\uc57d \\(f(x) = \\frac{1}{x}\\)\uc774\uba74 \\(f\\)\ub294 \\(0\\)\uc744 \uc81c\uc678\ud55c \ubaa8\ub4e0 \uc810\uc5d0\uc11c \uc5f0\uc18d\uc774\ub2e4. \uadf8\ub9ac\uace0<br \/>\n\\[\\lim_{x\\rightarrow 0^+} \\frac{1}{x} = \\infty \\quad\\text{and}\\quad \\lim_{x\\rightarrow 0^-} \\frac{1}{x} = -\\infty\\]<br \/>\n\uc774\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc218\uc9c1\uc810\uadfc\uc120 \\(x=0\\)\uc744 \uac00\uc9c4\ub2e4.<\/li>\n<li>\ub9cc\uc57d \\(f(x) = \\tan x\\)\uc774\uba74<br \/>\n\\[x = n \\pi + \\frac{\\pi}{2} ,\\,\\, n\\in\\mathbb{Z}\\]<br \/>\n\uaf34\uc758 \uc784\uc758\uc758 \uc9c1\uc120\uc740 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc758 \uc218\uc9c1\uc810\uadfc\uc120\uc774\ub2e4. \uc774 \uc678\uc758 \ub2e4\ub978 \uc218\uc9c1\uc810\uadfc\uc120\uc740 \uc874\uc7ac\ud558\uc9c0 \uc54a\ub294\ub2e4. \uc218\uc9c1\uc9c1\uc810\uadfc\uc120\uc758 \uc218\uac00 \ubb34\ud55c\ud788 \ub9ce\uc744 \uc218 \uc788\ub2e4\ub294 \uc0ac\uc2e4\uc774 \ud765\ubbf8\ub85c\uc6b4 \uc810\uc774\ub2e4.<\/li>\n<li>\\(f(x)=\\ln x\\)\ub77c\uace0 \ud558\uc790. \uadf8\ub7ec\uba74 \\(f\\)\uc758 \uc815\uc758\uc5ed\uc740 \\((0,\\, \\infty )\\)\uc774\uba70, \\(f\\)\ub294 \\((0,\\, \\infty )\\)\uc5d0\uc11c \uc5f0\uc18d\uc774\ub2e4. \uadf8\ub7f0\ub370<br \/>\n\\[\\lim_{x\\rightarrow 0^+} f(x) =-\\infty\\]<br \/>\n\uc774\ubbc0\ub85c \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \ud558\ub098\uc758 \uc218\uc9c1\uc810\uadfc\uc120 \\(x=0\\)\uc744 \uac00\uc9c4\ub2e4.<\/li>\n<li>\ub9cc\uc57d \\(f(x)=e^x\\)\uc774\uba74 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\ub294 \uc218\uc9c1\uc810\uadfc\uc120\uc744 \uac16\uc9c0 \uc54a\ub294\ub2e4. (\\(f\\)\uac00 \uc784\uc758\uc758 \uc2e4\uc218\uc5d0\uc11c \uc5f0\uc18d\uc774\uae30 \ub54c\ubb38\uc774\ub2e4.)<\/li>\n<\/ol>\n<\/div>\n<p><!-- ##################################################################### --><br \/>\n<!--\n\n\n<h2 class=\"itc_h2\">\uc81c\ubaa9<\/h2>\n\n\n\n\n\n<p>.<\/p>\n\n\n\n\n\n<p>.<\/p>\n\n\n--><\/p>\n<p><!--\n\n\n\n<div class=\"theorem margintop2\">\n\n\n<p><span class=\"theorem\">\uc815\ub9ac 1.<\/span>\n\n\n<\/p>\n\n<\/div>\n\n\n\n\n\n<div class=\"proof\">\n\n\n<p class=\"proofname\">\uc99d\uba85.<\/p>\n\n\n\n\n<p>\n\n<span class=\"qed\"><\/span><\/p>\n\n<\/div>\n\n\n\n\n########\n\n\u201c\u201d\n\u2018\u2019\n\n\n\n<div class=\"example\">\n\n\n<p><span class=\"example\">\ubcf4\uae30 1.<\/span>\n\n<\/p>\n\n<\/div>\n\n\n\n\n\n<h2 class=\"itc_h2\"><\/h2>\n\n\n\n--><\/p>\n<p><!--\n\n\n<div style=\"display: none; visibility: hidden;\">\n\\[\n\\newcommand{\\Hom}{{\\operatorname{Hom}}}\n\\newcommand{\\Mat}{{\\operatorname{Mat}}}\n\\newcommand{\\proj}{{\\operatorname{proj}}}\n\\newcommand{\\adj}{{\\operatorname{adj}}}\n\\]\n<\/div>\n\n\n--><\/p>\n<div class=\"box itc_prev_next_box\">\n<ul class=\"itc_ul\">\n<li class=\"itc_li_prev\">\uc55e\uc758 \uae00 : <a href=\"..\/limits-involving-infinity\">\ubb34\ud55c\ub300\ub97c \ud3ec\ud568\ud55c \uadf9\ud55c<\/a><\/li>\n<li class=\"itc_li_next\">\ub2e4\uc74c \uae00 : <a href=\"..\/continuity\">\uc5f0\uc18d\uc758 \uc815\uc758<\/a><\/li>\n<\/ul>\n<\/div>\n","protected":false},"excerpt":{"rendered":"<p>\uc774 \uae00\uc740 \u300e\ubbf8\uc801\ubd84\ud559 \uccab\uac78\uc74c\u300f 3\uc7a5 5\uc808\uc758 \ub0b4\uc6a9\uc785\ub2c8\ub2e4.&nbsp; (\ubbf8\uc801\ubd84\ud559 \uccab\uac78\uc74c \ucc28\ub840 \ubcf4\uae30) \uc9c1\uad00\uc801\uc73c\ub85c, \uadf8\ub798\ud504 \uc704\uc758 \uc810\uc774 \uc6d0\uc810\uc73c\ub85c\ubd80\ud130 \ud55c \uc5c6\uc774 \uba40\uc5b4\uc9c8 \ub54c \uadf8 \uc810\uc774 \ud558\ub098\uc758 \uc9c1\uc120\uc5d0 \ud55c \uc5c6\uc774 \uac00\uae4c\uc6cc\uc9c0\uba74, \uac00\uae4c\uc6cc\uc9c0\ub294 \uadf8 \uc9c1\uc120\uc744 \ud568\uc218\uc758 \uadf8\ub798\ud504\uc758 \uc810\uadfc\uc120\uc774\ub77c\uace0 \ubd80\ub978\ub2e4. \uc774 \uc808\uc5d0\uc11c\ub294 \uc138 \uac00\uc9c0 \uc885\ub958\uc758 \uc810\uadfc\uc120, \uc989 \uc218\ud3c9\uc810\uadfc\uc120, \uc0ac\uc120\uc810\uadfc\uc120, \uc218\uc9c1\uc810\uadfc\uc120\uc744 \uc0b4\ud3b4\ubcf4\uc790. \uc218\ud3c9\uc810\uadfc\uc120 \uc9c1\uc120 \\(y=b\\)\uac00 \ud568\uc218 \\(y=f(x)\\)\uc758 \uadf8\ub798\ud504\uc758 \uc218\ud3c9\uc810\uadfc\uc120(horizontal asymptote)\uc774\ub77c \ud568\uc740 \ub2e4\uc74c\uc744 \ub9cc\uc871\uc2dc\ud0a4\ub294 \uac83\uc744 \uc758\ubbf8\ud55c\ub2e4. \\(\\lim_{x\\rightarrow\\infty} f(x) = b \\,\\text{or}\\, \\lim_{x\\rightarrow&hellip;<\/p>\n","protected":false},"author":1,"featured_media":0,"parent":6620,"menu_order":305,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_lmt_disableupdate":"","_lmt_disable":"","footnotes":""},"class_list":["post-6699","page","type-page","status-publish","hentry"],"_links":{"self":[{"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/pages\/6699","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/comments?post=6699"}],"version-history":[{"count":21,"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/pages\/6699\/revisions"}],"predecessor-version":[{"id":8387,"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/pages\/6699\/revisions\/8387"}],"up":[{"embeddable":true,"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/pages\/6620"}],"wp:attachment":[{"href":"https:\/\/sasamath.com\/blog\/wp-json\/wp\/v2\/media?parent=6699"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}