{"id":666029,"date":"2023-08-01T15:31:24","date_gmt":"2023-08-01T10:01:24","guid":{"rendered":"https:\/\/infinitylearn.com\/surge\/?p=666029"},"modified":"2025-06-03T17:38:33","modified_gmt":"2025-06-03T12:08:33","slug":"the-value-of-log-10","status":"publish","type":"post","link":"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/","title":{"rendered":"The Value of log (10)"},"content":{"rendered":"<div id=\"ez-toc-container\" class=\"ez-toc-v2_0_37 counter-hierarchy ez-toc-counter ez-toc-grey ez-toc-container-direction\">\n<div class=\"ez-toc-title-container\">\n<p class=\"ez-toc-title\">Table of Contents<\/p>\n<span class=\"ez-toc-title-toggle\"><a href=\"#\" class=\"ez-toc-pull-right ez-toc-btn ez-toc-btn-xs ez-toc-btn-default ez-toc-toggle\" style=\"display: none;\"><label for=\"item\" aria-label=\"Table of Content\"><span style=\"display: flex;align-items: center;width: 35px;height: 30px;justify-content: center;\"><svg style=\"fill: #999;color:#999\" xmlns=\"http:\/\/www.w3.org\/2000\/svg\" class=\"list-377408\" width=\"20px\" height=\"20px\" viewBox=\"0 0 24 24\" fill=\"none\"><path d=\"M6 6H4v2h2V6zm14 0H8v2h12V6zM4 11h2v2H4v-2zm16 0H8v2h12v-2zM4 16h2v2H4v-2zm16 0H8v2h12v-2z\" fill=\"currentColor\"><\/path><\/svg><svg style=\"fill: #999;color:#999\" class=\"arrow-unsorted-368013\" xmlns=\"http:\/\/www.w3.org\/2000\/svg\" width=\"10px\" height=\"10px\" viewBox=\"0 0 24 24\" version=\"1.2\" baseProfile=\"tiny\"><path d=\"M18.2 9.3l-6.2-6.3-6.2 6.3c-.2.2-.3.4-.3.7s.1.5.3.7c.2.2.4.3.7.3h11c.3 0 .5-.1.7-.3.2-.2.3-.5.3-.7s-.1-.5-.3-.7zM5.8 14.7l6.2 6.3 6.2-6.3c.2-.2.3-.5.3-.7s-.1-.5-.3-.7c-.2-.2-.4-.3-.7-.3h-11c-.3 0-.5.1-.7.3-.2.2-.3.5-.3.7s.1.5.3.7z\"\/><\/svg><\/span><\/label><input type=\"checkbox\" id=\"item\"><\/a><\/span><\/div>\n<nav><ul class='ez-toc-list ez-toc-list-level-1' style='display:block'><li class='ez-toc-page-1 ez-toc-heading-level-2'><a class=\"ez-toc-link ez-toc-heading-1\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#Introduction_to_value_of_log_10\" title=\"Introduction to value of log 10\">Introduction to value of log 10<\/a><ul class='ez-toc-list-level-3'><li class='ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-2\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#Definition_of_logarithmic_function\" title=\"Definition of logarithmic function.\">Definition of logarithmic function.<\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-3\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#The_Value_of_log_10_when_base_is_e\" title=\"The Value of log 10 when base is e\">The Value of log 10 when base is e<\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-4\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#The_Value_of_log_10_when_base_is_10\" title=\"The Value of log 10 when base is 10\">The Value of log 10 when base is 10<\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-5\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#Solved_problems_using_log_10\" title=\"Solved problems using log 10:\">Solved problems using log 10:<\/a><\/li><\/ul><\/li><li class='ez-toc-page-1 ez-toc-heading-level-2'><a class=\"ez-toc-link ez-toc-heading-6\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#Frequently_asked_questions_about_log_10\" title=\"Frequently asked questions about log 10\">Frequently asked questions about log 10<\/a><ul class='ez-toc-list-level-3'><li class='ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-7\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#What_is_the_value_of_log_10_to_the_base_10\" title=\"What is the value of log 10 to the base 10 \">What is the value of log 10 to the base 10 <\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-8\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#What_is_the_value_of_log_10_of_zero\" title=\"What is the value of log 10 of zero? \">What is the value of log 10 of zero? <\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-9\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#What_is_the_value_of_log_2_to_log_10\" title=\"What is the value of log 2 to log 10\">What is the value of log 2 to log 10<\/a><ul class='ez-toc-list-level-4'><li class='ez-toc-heading-level-4'><a class=\"ez-toc-link ez-toc-heading-10\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#What_is_log_under_10\" title=\"What is log under 10 \">What is log under 10 <\/a><\/li><\/ul><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-11\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#How_do_you_solve_log_base_10\" title=\"How do you solve log base 10 \">How do you solve log base 10 <\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-3'><a class=\"ez-toc-link ez-toc-heading-12\" href=\"https:\/\/infinitylearn.com\/surge\/topics\/the-value-of-log-10\/#What_is_base_10_called\" title=\"What is base 10 called? \">What is base 10 called? <\/a><\/li><\/ul><\/li><\/ul><\/nav><\/div>\n<h2><span class=\"ez-toc-section\" id=\"Introduction_to_value_of_log_10\"><\/span>Introduction to value of log 10<span class=\"ez-toc-section-end\"><\/span><\/h2>\n<p>The value of log of 10 to the base &#8216;a&#8217; (log\u2090(10)) represents the power to which &#8216;a&#8217; must be raised to obtain 10. In mathematical notation, log\u2090(10) = x is equivalent to a^x = 10. The specific numerical value of log10(10) is exactly 1, but for other bases, log values can be irrational or transcendental numbers, depending on the base &#8216;a&#8217;..<\/p>\n<h3><span class=\"ez-toc-section\" id=\"Definition_of_logarithmic_function\"><\/span>Definition of logarithmic function.<span class=\"ez-toc-section-end\"><\/span><\/h3>\n<p>The logarithmic function is the inverse of the exponential function. It is denoted by &#8220;log&#8221; and has a base that indicates the number to which the logarithm is applied. For example, log\u2090(b) represents the power to which &#8216;a&#8217; must be raised to obtain &#8216;b&#8217;. In mathematical notation, log\u2090(b) = c is equivalent to a^c = b. Logarithmic functions are used to solve exponential equations and find the unknown exponent in various mathematical and scientific applications.<\/p>\n<h3><span class=\"ez-toc-section\" id=\"The_Value_of_log_10_when_base_is_e\"><\/span>The Value of log 10 when base is e<span class=\"ez-toc-section-end\"><\/span><\/h3>\n<p>The value of ln (natural logarithm) of 10 is approximately 2.302585092994046. This means &#8216;e&#8217; (Euler&#8217;s number) raised to the power of approximately 2.302585092994046 equals 10. In mathematical notation:<\/p>\n<p>e^2.302585092994046 \u2248 10<\/p>\n<p>So, ln(10) \u2248 2.302585092994046.<\/p>\n<h3><span class=\"ez-toc-section\" id=\"The_Value_of_log_10_when_base_is_10\"><\/span>The Value of log 10 when base is 10<span class=\"ez-toc-section-end\"><\/span><\/h3>\n<p>The value of log base 10 of 10 (log\u2081\u2080(10)) is 1. This means 10 raised to the power of 1 equal 10. In mathematical notation: 10^1 = 10<\/p>\n<p>So, log\u2081\u2080(10) = 1.<\/p>\n<p><a href=\"https:\/\/infinitylearn.com\/surge\/articles\/math-articles\"><button class=\"btn btn-dark mx-2 my-2 px-4\" style=\"border-radius: 50px;\" type=\"button\">Math Articles<br \/>\n<\/button><\/a> <a href=\"https:\/\/infinitylearn.com\/surge\/formulas\/math-formulas\/\"><button class=\"btn btn-dark mx-2 my-2 px-4\" style=\"border-radius: 50px;\" type=\"button\">Math Formulas<\/button><\/a> <a href=\"https:\/\/infinitylearn.com\/surge\/articles\/tables-21-to-30\/\"><button class=\"btn btn-dark mx-2 my-2 px-4\" style=\"border-radius: 50px;\" type=\"button\">Tables 21 to 30<\/button><\/a><\/p>\n<h3><span class=\"ez-toc-section\" id=\"Solved_problems_using_log_10\"><\/span>Solved problems using log 10:<span class=\"ez-toc-section-end\"><\/span><\/h3>\n<p><strong>Example 1: Exponential Growth<\/strong><\/p>\n<p>Suppose a population of bacteria doubles every hour. To find how long it takes for the population to reach 10,000 bacteria, we can use the formula:<\/p>\n<p>N(t) = N\u2080 * e^(rt)<\/p>\n<p>where N(t) is the population at time &#8216;t&#8217;, N\u2080 is the initial population, &#8216;r&#8217; is the growth rate, and &#8216;e&#8217; is Euler&#8217;s number.<\/p>\n<p>If the initial population N\u2080 is 1, and we want to find when the population reaches 10,000 (N(t) = 10,000), we get:<\/p>\n<p>10,000 = 1 * e^(r * t)<\/p>\n<p>Taking the natural logarithm of both sides:<\/p>\n<p>ln(10,000) = ln(e^(r * t))<\/p>\n<p>ln(10,000) = r * t<\/p>\n<p>Since ln(10,000) \u2248 9.21034 and &#8216;r&#8217; is known, we can solve for &#8216;t&#8217;.<\/p>\n<p>Example 1: Binary Exponential Representation<\/p>\n<p>In computer science, the <a href=\"https:\/\/infinitylearn.com\/surge\/articles\/the-value-of-log2\/\"><strong>value of log\u2082(2)<\/strong><\/a> is frequently used to represent numbers in binary (base-2) format. For instance:<\/p>\n<p>log\u2082(2) = 1<\/p>\n<p>Thus, in binary, 2 is represented as 10.<\/p>\n<p>Example 2: Decibel Scale<\/p>\n<p>The decibel (dB) scale used in acoustics and telecommunications is logarithmic. For sound intensity, the formula is:<\/p>\n<p>L(dB) = 10 * log\u2081\u2080(I \/ I\u2080)<\/p>\n<p>where L(dB) is the sound level in decibels, I is the sound intensity, and I\u2080 is the reference intensity (usually the threshold of human hearing).<\/p>\n<p>Suppose the sound intensity I is 100 times greater than the reference intensity (I = 100 * I\u2080), we can find the sound level in decibels:<\/p>\n<p>L(dB) = 10 * log\u2081\u2080(100) = 10 * 2 = 20 dB.<\/p>\n<p>These examples show how the value of log of 10 is used in various fields, including population modeling and the decibel scale for measuring sound levels..<\/p>\n<h2><span class=\"ez-toc-section\" id=\"Frequently_asked_questions_about_log_10\"><\/span>Frequently asked questions about log 10<span class=\"ez-toc-section-end\"><\/span><\/h2>\n\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h3><span class=\"ez-toc-section\" id=\"What_is_the_value_of_log_10_to_the_base_10\"><\/span>What is the value of log 10 to the base 10 <span class=\"ez-toc-section-end\"><\/span><\/h3>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tSolution: The value of log base 10 of 10 (log\u2081\u2080(10)) is exactly 1. This means 10 raised to the power of 1 equals 10. In mathematical notation:<br \/>\n10^1 = 10<br \/>\nSo, log\u2081\u2080(10) = 1. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h3><span class=\"ez-toc-section\" id=\"What_is_the_value_of_log_10_of_zero\"><\/span>What is the value of log 10 of zero? <span class=\"ez-toc-section-end\"><\/span><\/h3>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tThe value of log base 10 of zero (log\u2081\u2080(0)) is undefined in the real number system. In other words, log\u2081\u2080(0) is not a real number. Logarithms are only defined for positive real numbers, so taking the logarithm of zero is not a valid operation in the real number system. The logarithm function approaches negative infinity as the input approaches zero, but it is undefined at exactly zero. In mathematical notation, log\u2081\u2080(0) is undefined. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h3><span class=\"ez-toc-section\" id=\"What_is_the_value_of_log_2_to_log_10\"><\/span>What is the value of log 2 to log 10<span class=\"ez-toc-section-end\"><\/span><\/h3>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tTo find the value of log\u2082 to log\u2081\u2080 (log\u2082\/log\u2081\u2080), we can use the change of base formula:<br \/>\nlog\u2082\/log\u2081\u2080 = log\u2082 \/ (log\u2082(10))<br \/>\nSince log\u2082(10) \u2248 3.32193, we can simplify the expression:<br \/>\nlog\u2082\/log\u2081\u2080 \u2248 log\u2082 \/ 3.32193 However, without knowing the specific value of log\u2082, we cannot calculate the exact numerical value of log\u2082 to log\u2081\u2080. It depends on the specific value of log\u2082, which can be any positive real number. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h4><span class=\"ez-toc-section\" id=\"What_is_log_under_10\"><\/span>What is log under 10 <span class=\"ez-toc-section-end\"><\/span><\/h4>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tIf you meant to ask for the logarithm of a number 'x' to the base 10, it is denoted as log\u2081\u2080(x), which represents the power to which 10 must be raised to obtain the number 'x'. For example, log\u2081\u2080(100) = 2, since 10^2 = 100. Similarly, log\u2081\u2080(1000) = 3, since 10^3 = 1000. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h3><span class=\"ez-toc-section\" id=\"How_do_you_solve_log_base_10\"><\/span>How do you solve log base 10 <span class=\"ez-toc-section-end\"><\/span><\/h3>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tThe general form of a log base 10 equation is:<br \/>\nlog\u2081\u2080(x) = y<br \/>\nThis equation means that 10 raised to the power of 'y' equals 'x'.<br \/>\nTo solve for 'y', take the logarithm of 'x' to the base 10. In mathematical notation:<br \/>\ny = log\u2081\u2080(x)<br \/>\nFor example: log\u2081\u2080(100) = 2, because 10^2 = 100.<br \/>\nlog\u2081\u2080(1000) = 3, because 10^3 = 1000. You can use a calculator or logarithm tables to find the logarithm of a number to the base 10 when the value is not easily recognizable. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"sc_fs_faq sc_card \">\n\t\t\t<div>\n\t\t\t\t<h3><span class=\"ez-toc-section\" id=\"What_is_base_10_called\"><\/span>What is base 10 called? <span class=\"ez-toc-section-end\"><\/span><\/h3>\t\t\t\t<div>\n\t\t\t\t\t\t\t\t\t\t<p>\n\t\t\t\t\t\tBase 10 is called the decimal or denary system. It is a positional numeral system where each digit's value is multiplied by an increasing power of 10 as you move from right to left. In the decimal system, the digits range from 0 to 9, and the place values are powers of 10: 1, 10, 100, 1000, and so on. It is the most commonly used number system in everyday life and is widely used in mathematics, science, and commerce. \t\t\t\t\t<\/p>\n\t\t\t\t<\/div>\n\t\t\t<\/div>\n\t\t<\/section>\n\t\t\n<script type=\"application\/ld+json\">\n\t{\n\t\t\"@context\": \"https:\/\/schema.org\",\n\t\t\"@type\": \"FAQPage\",\n\t\t\"mainEntity\": [\n\t\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"What is the value of log 10 to the base 10 \",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"Solution: The value of log base 10 of 10 (log\u2081\u2080(10)) is exactly 1. This means 10 raised to the power of 1 equals 10. In mathematical notation:<br\/>\n10^1 = 10<br\/>\nSo, log\u2081\u2080(10) = 1.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t,\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"What is the value of log 10 of zero? \",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"The value of log base 10 of zero (log\u2081\u2080(0)) is undefined in the real number system. In other words, log\u2081\u2080(0) is not a real number. Logarithms are only defined for positive real numbers, so taking the logarithm of zero is not a valid operation in the real number system. The logarithm function approaches negative infinity as the input approaches zero, but it is undefined at exactly zero. In mathematical notation, log\u2081\u2080(0) is undefined.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t,\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"What is the value of log 2 to log 10\",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"To find the value of log\u2082 to log\u2081\u2080 (log\u2082\/log\u2081\u2080), we can use the change of base formula:<br\/>\nlog\u2082\/log\u2081\u2080 = log\u2082 \/ (log\u2082(10))<br\/>\nSince log\u2082(10) \u2248 3.32193, we can simplify the expression:<br\/>\nlog\u2082\/log\u2081\u2080 \u2248 log\u2082 \/ 3.32193 However, without knowing the specific value of log\u2082, we cannot calculate the exact numerical value of log\u2082 to log\u2081\u2080. It depends on the specific value of log\u2082, which can be any positive real number.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t,\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"What is log under 10 \",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"If you meant to ask for the logarithm of a number 'x' to the base 10, it is denoted as log\u2081\u2080(x), which represents the power to which 10 must be raised to obtain the number 'x'. For example, log\u2081\u2080(100) = 2, since 10^2 = 100. Similarly, log\u2081\u2080(1000) = 3, since 10^3 = 1000.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t,\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"How do you solve log base 10 \",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"The general form of a log base 10 equation is:<br\/>\nlog\u2081\u2080(x) = y<br\/>\nThis equation means that 10 raised to the power of 'y' equals 'x'.<br\/>\nTo solve for 'y', take the logarithm of 'x' to the base 10. In mathematical notation:<br\/>\ny = log\u2081\u2080(x)<br\/>\nFor example: log\u2081\u2080(100) = 2, because 10^2 = 100.<br\/>\nlog\u2081\u2080(1000) = 3, because 10^3 = 1000. You can use a calculator or logarithm tables to find the logarithm of a number to the base 10 when the value is not easily recognizable.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t,\t\t\t\t{\n\t\t\t\t\"@type\": \"Question\",\n\t\t\t\t\"name\": \"What is base 10 called? \",\n\t\t\t\t\"acceptedAnswer\": {\n\t\t\t\t\t\"@type\": \"Answer\",\n\t\t\t\t\t\"text\": \"Base 10 is called the decimal or denary system. It is a positional numeral system where each digit's value is multiplied by an increasing power of 10 as you move from right to left. In the decimal system, the digits range from 0 to 9, and the place values are powers of 10: 1, 10, 100, 1000, and so on. It is the most commonly used number system in everyday life and is widely used in mathematics, science, and commerce.\"\n\t\t\t\t\t\t\t\t\t}\n\t\t\t}\n\t\t\t\t\t\t]\n\t}\n<\/script>\n\n","protected":false},"excerpt":{"rendered":"<p>Introduction to value of log 10 The value of log of 10 to the base &#8216;a&#8217; (log\u2090(10)) represents the power [&hellip;]<\/p>\n","protected":false},"author":53,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_yoast_wpseo_focuskw":"Value of log 10","_yoast_wpseo_title":"Value of log 10 - Definition, Value when base is 10 and e and Examples","_yoast_wpseo_metadesc":"The value of log 10 is 1. It tells us the power we need to raise 10 to get a certain number. For example, log 10 of 10 is 1 because 10^1 = 10.","custom_permalink":"topics\/the-value-of-log-10\/"},"categories":[8594,8591],"tags":[],"table_tags":[],"acf":[],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v17.9 - https:\/\/yoast.com\/wordpress\/plugins\/seo\/ -->\n<title>Value of log 10 - Definition, Value when base is 10 and e and Examples<\/title>\n<meta name=\"description\" content=\"The value of log 10 is 1. It tells us the power we need to raise 10 to get a certain number. 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