{"id":1331,"date":"2025-06-30T20:33:27","date_gmt":"2025-06-30T20:33:27","guid":{"rendered":"https:\/\/blog.ajsrp.com\/en\/?p=1331"},"modified":"2025-05-23T14:17:42","modified_gmt":"2025-05-23T14:17:42","slug":"mean-%c2%b1-sd-vs-mean-%c2%b1-se-understanding-the-difference-in-statistics","status":"publish","type":"post","link":"https:\/\/blog.ajsrp.com\/en\/mean-%c2%b1-sd-vs-mean-%c2%b1-se-understanding-the-difference-in-statistics\/","title":{"rendered":"Mean \u00b1 SD vs. Mean \u00b1 SE: Understanding the Difference in Statistics"},"content":{"rendered":"<p>In statistical analysis, it&#8217;s key to understand data well. Knowing the difference between <strong>Mean \u00b1 Standard Deviation (SD)<\/strong> and <strong>Mean \u00b1 Standard Error (SE)<\/strong> is vital.<\/p>\n<p>Many people get SD and SE mixed up, which can lead to wrong conclusions. <em>Standard Deviation<\/em> shows how spread out data points are. On the other hand, <em>Standard Error<\/em> tells us how sure we are about the sample mean.<\/p>\n<p>It&#8217;s important for researchers and analysts to know the difference. This ensures they report and interpret data correctly. This article will help you understand Mean \u00b1 SD and Mean \u00b1 SE better. It will also cover their uses and why using them right is important.<\/p>\n<h2>The Fundamentals of Statistical Reporting<\/h2>\n<p>How we report statistical data greatly affects how we understand research findings. Statistical notation is key for clear communication in research. It offers a standard way to share complex data.<\/p>\n<h3>Why Statistical Notation Matters<\/h3>\n<p>Statistical notation is important because it shapes how we grasp and use research results. <strong>Clear and consistent notation<\/strong> prevents confusion and ensures data is correctly understood. For example, knowing the difference between mean \u00b1 SD and mean \u00b1 SE is essential.<\/p>\n<h3>Common Formats for Reporting Statistical Data<\/h3>\n<p>There are several ways to report statistical data. These include:<\/p>\n<ul>\n<li>Mean \u00b1 Standard Deviation (SD)<\/li>\n<li>Mean \u00b1 Standard Error (SE)<\/li>\n<\/ul>\n<p>Each format has its own use and context. Mean \u00b1 SD shows data variability, while mean \u00b1 SE estimates the mean&#8217;s precision. Knowing when to use each is vital for good statistical reporting.<\/p>\n<h2>Understanding the Mean in Statistical Analysis<\/h2>\n<p>The mean is a key concept in statistics. It shows the average value of a dataset. It&#8217;s used in many statistical tasks.<\/p>\n<h3>Definition and Calculation of the Mean<\/h3>\n<p>To find the mean, you add up all the values and then divide by how many there are. This simple method makes it a favorite for showing a dataset&#8217;s center. The formula is: <em>mean = (sum of all values) \/ (number of observations)<\/em>. Knowing how to calculate the mean is vital for <strong>finding mean difference<\/strong> in studies.<\/p>\n<h3>Limitations of Using Only the Mean<\/h3>\n<p>While the mean is useful, using it alone can be wrong. It doesn&#8217;t show how spread out the data is. For example, two datasets can have the same mean but look very different.<\/p>\n<p>So, it&#8217;s important to look at other measures, like standard deviation. The <strong>significance of mean difference<\/strong> is clearer when you consider how spread out the data is.<\/p>\n<h2>Standard Deviation (SD): Definition and Purpose<\/h2>\n<p>Standard Deviation (SD) is a way to measure how spread out data values are. If SD is low, the data points are close to the mean. But if SD is high, the data points are spread out over a wider range.<\/p>\n<h3>How Standard Deviation Measures Variability<\/h3>\n<p>SD shows how much variation there is in a dataset. It helps us understand how reliable the mean is. When we use <strong>Mean Difference Analysis<\/strong>, SD tells us about the data&#8217;s spread from the <b>mean difference<\/b>.<\/p>\n<h3>Calculating Standard Deviation<\/h3>\n<p>To find SD, we first calculate the mean. Then, we find the deviations from the mean, square them, and average them. After that, we take the square root of this average.<\/p>\n<h3>Interpreting Standard Deviation Values<\/h3>\n<p>Understanding SD values is key to grasping data dispersion. A big SD means more variability, while a small SD means data is consistent. This <strong>Interpretation of Mean Difference<\/strong> is essential in statistics, shaping our conclusions from the data.<\/p>\n<table>\n<tr>\n<th>SD Value<\/th>\n<th>Interpretation<\/th>\n<\/tr>\n<tr>\n<td>Low<\/td>\n<td>Data points are close to the mean<\/td>\n<\/tr>\n<tr>\n<td>High<\/td>\n<td>Data points are spread out<\/td>\n<\/tr>\n<\/table>\n<h2>Standard Error (SE): Definition and Purpose<\/h2>\n<p>In statistical analysis, knowing how precise sample means are is key. This is where the <strong>standard error (SE)<\/strong> comes in. It measures how much the sample mean might vary from the true population mean.<\/p>\n<h3>How Standard Error Relates to Sampling<\/h3>\n<p>The <em>standard error<\/em> is closely tied to sampling. When we take a sample from a population, the sample mean is our guess of the population mean. But, because of the way we sample, the sample mean might not match the true population mean. The standard error shows how much this might happen.<\/p>\n<h3>Calculating Standard Error<\/h3>\n<p>To find the <strong>standard error<\/strong>, we use the sample&#8217;s standard deviation and its size. The formula is \\(SE = \\frac{SD}{\\sqrt{n}}\\), where \\(SD\\) is the sample&#8217;s standard deviation, and \\(n\\) is its size. This shows that bigger samples give us more accurate guesses of the population mean.<\/p>\n<h3>Interpreting Standard Error Values<\/h3>\n<p>Understanding the <em>standard error<\/em> helps us see how sure we are about our sample mean. A small standard error means we&#8217;re pretty sure about our guess. But a big standard error means we&#8217;re not as sure. Knowing how to use the <strong>implications of mean difference<\/strong> with standard error is key for making good choices in stats.<\/p>\n<h2>The Mathematical Relationship Between SD and SE<\/h2>\n<p>Understanding the link between Standard Deviation (SD) and Standard Error (SE) is key for good stats analysis. This connection is shown through a simple yet powerful formula. It shows how SD and SE are linked.<\/p>\n<h3>The Formula Connecting SD and SE<\/h3>\n<p>The formula that ties SD and SE is SE = SD \/ \u221an. Here, &#8216;n&#8217; is the sample size. This equation shows SE is tied to SD but changes with the sample size.<\/p>\n<h3>How Sample Size Affects This Relationship<\/h3>\n<p>When the sample size (n) grows, the denominator (\u221an) in the formula SE = SD \/ \u221an gets bigger. This makes SE smaller. So, bigger samples mean more accurate population estimates, shown by a smaller SE.<\/p>\n<p>Knowing the math behind SD and SE helps researchers understand their data better. The formula SE = SD \/ \u221an is key. It shows how important sample size is in stats, like <strong>Mean Difference<\/strong> and <strong>Average Difference<\/strong>.<\/p>\n<h2>Mean Difference: Understanding the Core Concept<\/h2>\n<p>Comparative studies often use the <b>mean difference<\/b> to show how groups differ. This measure is key in fields like clinical trials and social sciences. It helps researchers see the <b>average difference<\/b> between groups, making it very useful.<\/p>\n<h3>Definition of Mean Difference in Statistical Contexts<\/h3>\n<p>The <b>mean difference<\/b> is the difference in mean values between two groups. It&#8217;s a simple yet powerful tool for understanding the size of an effect or the difference between populations. For example, in clinical trials, it&#8217;s used to see if a new treatment works better than a control group.<\/p>\n<h3>Applications of Mean Difference Analysis<\/h3>\n<p><b>Mean difference analysis<\/b> is used a lot in research, mainly in comparative studies. It helps evaluate how well interventions work, compare different groups, and see how various factors affect outcomes. A study on <a href=\"https:\/\/pmc.ncbi.nlm.nih.gov\/articles\/PMC2405942\/\" target=\"_blank\" rel=\"nofollow noopener\">PubMed Central<\/a> shows it&#8217;s key for understanding treatment effects in clinical research.<\/p>\n<h3>Calculation Methods for Mean Differences<\/h3>\n<p>To calculate the mean difference, you subtract one group&#8217;s mean from another&#8217;s. This can be done for paired or unpaired data, with unpaired being more common in studies. The <strong>significance of mean difference<\/strong> is checked with tests like the t-test. This test shows if the difference is statistically significant.<\/p>\n<p>In summary, knowing about the mean difference is vital for researchers to understand comparative study results. By understanding its definition, uses, and how to calculate it, researchers can make better decisions from their data.<\/p>\n<h2>When to Report Mean \u00b1 SD<\/h2>\n<p>Knowing when to use mean \u00b1 SD is key for showing data accurately. This method is common in stats and shows how spread out data is. It gives insight into the range of values in a dataset.<\/p>\n<h3>Appropriate Contexts for Using Standard Deviation<\/h3>\n<p>Mean \u00b1 SD shows how data points vary within a sample. It&#8217;s great for research that looks at how data spreads out around the mean. <strong>Descriptive statistics<\/strong> use SD to clearly show data spread.<\/p>\n<h3>Examples in Research Literature<\/h3>\n<p>In research papers, mean \u00b1 SD is often seen. For example, in clinical trials, it might show the mean age \u00b1 SD of participants. This helps quickly see how the ages are spread out.<\/p>\n<h3>Descriptive vs. Inferential Applications<\/h3>\n<p>It&#8217;s important to know the difference between <em>descriptive<\/em> and <em>inferential<\/em> uses of SD. SD is used to describe data, but not for making guesses about a whole population. It&#8217;s used in bigger statistical plans for that.<\/p>\n<p>By knowing when to use mean \u00b1 SD, researchers can share data spread clearly. This makes their findings easier to understand.<\/p>\n<h2>When to Report Mean \u00b1 SE<\/h2>\n<p>Choosing between mean \u00b1 SD and mean \u00b1 SE depends on the situation. Mean \u00b1 SE is key in hypothesis testing. It shows how precise the estimates are.<\/p>\n<h3>Appropriate Contexts for Using Standard Error<\/h3>\n<p>Mean \u00b1 SE shows how precise the sample mean is. It&#8217;s great for testing hypotheses. <strong>Standard Error (SE)<\/strong> tells us how close the sample mean is to the true population mean.<\/p>\n<p>As noted by <\/p>\n<blockquote><p>&#8220;The use of SE in hypothesis testing allows researchers to determine the probability that the observed effect is due to chance.&#8221;<\/p><\/blockquote>\n<p>This shows why SE is vital in statistical inference.<\/p>\n<h3>Examples in Research Literature<\/h3>\n<p>In studies, mean \u00b1 SE is common in <em>hypothesis testing<\/em> and <em>comparative analyses<\/em>. For example, in clinical trials, it shows the precision of treatment effects.<\/p>\n<h3>Connection to Hypothesis Testing<\/h3>\n<p>Mean \u00b1 SE is linked to hypothesis testing. SE is key in calculating <strong>test statistics<\/strong> and <strong>p-values<\/strong>. Reporting mean \u00b1 SE helps interpret results better.<\/p>\n<p>Understanding <em>Implications of Mean Difference<\/em> and doing thorough <em>Mean Difference Analysis<\/em> is key. Using mean \u00b1 SE gives valuable insights, making research more reliable.<\/p>\n<h2>Confidence Intervals and Their Relationship to SE<\/h2>\n<p>Confidence intervals are key in statistics. They show a range where a population parameter might be. This is linked to the standard error (SE), showing how precise an estimate is.<\/p>\n<p>Researchers use confidence intervals to show how sure they are about their findings. They give a range of possible values for a parameter.<\/p>\n<h3>How Confidence Intervals Are Calculated<\/h3>\n<p>To find a confidence interval, you need the sample estimate, its standard error, and a critical value. The formula is <em>estimate \u00b1 (critical value \u00d7 SE)<\/em>. This shows how SE and confidence intervals are connected.<\/p>\n<p>For example, when comparing two groups&#8217; means, you use the mean difference, its standard error, and a critical value. This gives you insight into how precise the mean difference estimate is.<\/p>\n<h3>Interpreting Confidence Intervals<\/h3>\n<p>Understanding confidence intervals is important. A 95% confidence interval means 95% of intervals would contain the true parameter if the study was repeated. It doesn&#8217;t mean there&#8217;s a 95% chance the true parameter is in the interval.<\/p>\n<p>The width of the interval is also key. A narrow interval means a more precise estimate. A wide interval means more uncertainty. This is important for understanding mean differences in statistics.<\/p>\n<h3>When to Use Confidence Intervals Instead of SE<\/h3>\n<p>Use confidence intervals over SE when you want to show both precision and size of an estimate. SE shows variability, but confidence intervals add critical values for a fuller picture of reliability.<\/p>\n<p>In research, confidence intervals are great for showing effect sizes, like mean differences. They clearly show the likely range of the true effect. This helps in a more detailed <strong>interpretation of mean difference<\/strong>.<\/p>\n<h2>Common Misuses and Misconceptions<\/h2>\n<p>In statistical analysis, mistakes with SD and SE are common. These errors can lead to wrong conclusions. It&#8217;s important for researchers to know the difference between these measures.<\/p>\n<h3>Mistaking SD for SE and Vice Versa<\/h3>\n<p>Many people confuse Standard Deviation (SD) with Standard Error (SE). SD shows how spread out the data is. SE shows how close the sample mean is to the true population mean. Getting these mixed up can make data seem less reliable than it is.<\/p>\n<p>For example, using SD when you should use SE can make the sample mean seem too precise. Using SE when you should use SD can make the data&#8217;s spread seem too small. This mistake can greatly affect what we learn from research.<\/p>\n<h3>Inappropriate Applications in Research<\/h3>\n<p>Using SD and SE wrong in research can make results hard to understand. For example, talking about <strong>mean differences<\/strong> without showing variability can be confusing. Researchers need to pick the right measure for their study&#8217;s goals and design.<\/p>\n<h3>How These Errors Affect Interpretation<\/h3>\n<p>Using SD and SE wrong can have big effects. In clinical trials, using the wrong measure can make a new treatment seem more or less effective than it is. It&#8217;s key to understand how these mistakes affect our understanding of research.<\/p>\n<p>To show the differences and right uses of SD and SE, here&#8217;s a table:<\/p>\n<table>\n<tr>\n<th>Measure<\/th>\n<th>Purpose<\/th>\n<th>Application<\/th>\n<\/tr>\n<tr>\n<td>Standard Deviation (SD)<\/td>\n<td>Measures data variability<\/td>\n<td>Describing dataset dispersion<\/td>\n<\/tr>\n<tr>\n<td>Standard Error (SE)<\/td>\n<td>Measures sample mean variability<\/td>\n<td>Inferential statistics, hypothesis testing<\/td>\n<\/tr>\n<\/table>\n<h2>Visualizing Data: Graphical Representation with SD vs. SE<\/h2>\n<p>The difference between SD and SE is key in statistical graphics. It changes how we see data. Graphs like bar charts and line graphs use error bars to show data uncertainty.<\/p>\n<h3>Error Bars in Graphs and Charts<\/h3>\n<p>Error bars can show either SD or SE. The choice affects the graph&#8217;s message. SD error bars show data variability. SE error bars tell us about the mean&#8217;s precision.<\/p>\n<h3>How Different Representations Affect Perception<\/h3>\n<p>Choosing between SD and SE changes how we see data. SE might make data seem more precise with small samples. But SD shows data spread better, no matter the sample size.<\/p>\n<h3>Best Practices for Visual Communication<\/h3>\n<p>Choosing the right error bars is key for clear stats communication. SD is better for describing data, while SE is for making predictions. Always label the error bar type for clarity.<\/p>\n<table>\n<tr>\n<th>Representation<\/th>\n<th>Purpose<\/th>\n<th>Interpretation<\/th>\n<\/tr>\n<tr>\n<td>SD<\/td>\n<td>Describes data variability<\/td>\n<td>Indicates spread of data<\/td>\n<\/tr>\n<tr>\n<td>SE<\/td>\n<td>Indicates precision of the mean<\/td>\n<td>Reflects reliability of mean estimate<\/td>\n<\/tr>\n<\/table>\n<p>Knowing about mean difference is also important. It helps us understand group differences in graphs.<\/p>\n<h2>Historical Context: Evolution of Statistical Reporting<\/h2>\n<p>The use of SD and SE in statistics has a long history. It shows how science reporting has changed over time. Knowing this history helps us understand statistical data better.<\/p>\n<p>Statistical reporting has changed a lot over the years. At first, it focused on just describing data. SD was key for showing how data varied.<\/p>\n<h3>Early Uses of SD and SE in Scientific Literature<\/h3>\n<p>In the beginning, SD was used to show data variability. Later, SE became important for <strong>Mean Difference Analysis<\/strong>. It helps guess population data from samples.<\/p>\n<ul>\n<li>SD was first for describing data.<\/li>\n<li>SE became vital for making guesses about data.<\/li>\n<\/ul>\n<h3>Changes in Reporting Standards Over Time<\/h3>\n<p>Reporting standards have gotten clearer and more precise over time. Now, the <em>implications of Mean Difference<\/em> are clearer. Researchers use both SD and SE to fully understand their data.<\/p>\n<p>Important changes include:\n<\/p>\n<ol>\n<li>Reports now show more about how statistics were done.<\/li>\n<li>SD and SE are used more to explain research findings.<\/li>\n<\/ol>\n<p>As statistical reporting keeps changing, knowing its history is key. It&#8217;s important for researchers and analysts to understand SD and SE&#8217;s role.<\/p>\n<h2>The Impact of Sample Size on SD and SE<\/h2>\n<p>It&#8217;s key for researchers to know how sample size affects SD and SE. This knowledge helps in designing studies that give accurate results. The size of the sample greatly impacts the reliability of research findings.<\/p>\n<h3>Behavior of SD with Changing Sample Sizes<\/h3>\n<p>Standard Deviation (SD) shows how spread out data points are. SD doesn&#8217;t change with sample size. It always shows the data&#8217;s spread, no matter the number of observations.<\/p>\n<h3>Behavior of SE with Changing Sample Sizes<\/h3>\n<p>Standard Error (SE) changes a lot with sample size. SE shows how sure we are about the sample mean. As more data is collected, SE gets smaller, meaning we&#8217;re more certain about the true mean.<\/p>\n<h3>Practical Implications for Research Design<\/h3>\n<p>SD and SE behave differently with sample size changes. A bigger sample size means we can be more precise (smaller SE). But it doesn&#8217;t change the data&#8217;s natural spread (SD). Researchers must find a balance between precision and practical data collection limits.<\/p>\n<table>\n<tr>\n<th>Measure<\/th>\n<th>Effect of Increasing Sample Size<\/th>\n<th>Implication<\/th>\n<\/tr>\n<tr>\n<td>SD<\/td>\n<td>No direct effect<\/td>\n<td>Variability remains unchanged<\/td>\n<\/tr>\n<tr>\n<td>SE<\/td>\n<td>Decreases<\/td>\n<td>More precise estimate of the mean<\/td>\n<\/tr>\n<\/table>\n<p>In summary, knowing how sample size affects SD and SE is vital for good research design. By understanding these factors, researchers can make sure their studies are strong and their results are trustworthy.<\/p>\n<h2>Practical Examples: Analyzing Real Data Sets<\/h2>\n<p>Real data sets offer deep insights into how SD and SE are used in research. They help researchers understand the practical effects of their statistical choices.<\/p>\n<h3>Case Study1: Clinical Trial Data<\/h3>\n<p>In a clinical trial, the mean difference in patient outcomes was key. The <strong>standard deviation (SD)<\/strong> showed how varied patient responses were. The <strong>standard error (SE)<\/strong> showed how precise the mean difference was.<\/p>\n<p>For example, a study might show a 10 mmHg mean reduction in blood pressure. It would have an SD of 5 mmHg and an SE of 1 mmHg. This indicates a precise estimate.<\/p>\n<h3>Case Study2: Survey Research<\/h3>\n<p>Survey research often looks at mean scores or proportions from large samples. The SE is key for making population inferences. For instance, a survey might report an average income of $50,000 with an SE of $1,000.<\/p>\n<p>This allows researchers to build confidence intervals to guess the true population mean.<\/p>\n<h3>Case Study3: Laboratory Experiments<\/h3>\n<p>In lab experiments, precise measurements are vital. SD shows the variability of measurements, while SE shows the reliability of the mean. For example, an experiment might report the mean growth rate with SD and SE.<\/p>\n<p>This gives a full view of the data&#8217;s variability and the mean&#8217;s precision.<\/p>\n<h4>Case Study4: Economic and Financial Data<\/h4>\n<p>Economic and financial analyses often deal with complex data. Understanding the mean difference and its variability is key. For example, analyzing stock prices before and after an economic event uses SD and SE.<\/p>\n<p>A table showing the use of SD and SE in economic indicators can offer practical insights.<\/p>\n<table>\n<tr>\n<th>Economic Indicator<\/th>\n<th>Mean Difference<\/th>\n<th>SD<\/th>\n<th>SE<\/th>\n<\/tr>\n<tr>\n<td>Stock Prices<\/td>\n<td>5%<\/td>\n<td>3%<\/td>\n<td>1%<\/td>\n<\/tr>\n<tr>\n<td>GDP Growth Rate<\/td>\n<td>2%<\/td>\n<td>1.5%<\/td>\n<td>0.5%<\/td>\n<\/tr>\n<tr>\n<td>Inflation Rate<\/td>\n<td>1.2%<\/td>\n<td>0.8%<\/td>\n<td>0.3%<\/td>\n<\/tr>\n<\/table>\n<p>These case studies show that choosing between mean \u00b1 SD or mean \u00b1 SE depends on the research context. It depends on what aspect of the data is being highlighted\u2014variability or precision.<\/p>\n<h2>Conclusion: Making the Right Choice Between SD and SE<\/h2>\n<p>Choosing between Standard Deviation (SD) and Standard Error (SE) is key in statistical reporting. It affects how we understand data. The choice depends on the research question and the context, mainly when looking at Mean Difference or <b>Average Difference<\/b>.<\/p>\n<p>Calculating Mean Difference is a basic part of statistics. Knowing when to use SD or SE is critical for showing data accurately. SD shows how spread out data is within a group. SE, on the other hand, shows how reliable a mean estimate is.<\/p>\n<p>Understanding the roles of SD and SE helps researchers make their reports clear and correct. This is important for sharing complex data insights well.<\/p>\n<p>In the end, picking SD or SE should be based on the research&#8217;s context and needs. This ensures the statistical report is exact and relevant.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Discover the key differences between mean \u00b1 SD and mean \u00b1 SE, and learn how to correctly interpret these statistical measures for your research or data analysis.<\/p>\n","protected":false},"author":1,"featured_media":1332,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[8],"tags":[1139,1138,1136,1137,669,671],"class_list":["post-1331","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-discovery","tag-data-interpretation","tag-mean-calculation","tag-standard-deviation","tag-standard-error","tag-statistical-analysis","tag-statistical-significance"],"_links":{"self":[{"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/posts\/1331","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/comments?post=1331"}],"version-history":[{"count":1,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/posts\/1331\/revisions"}],"predecessor-version":[{"id":1333,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/posts\/1331\/revisions\/1333"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/media\/1332"}],"wp:attachment":[{"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/media?parent=1331"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/categories?post=1331"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/blog.ajsrp.com\/en\/wp-json\/wp\/v2\/tags?post=1331"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}