{"id":92631,"date":"2025-06-01T11:29:30","date_gmt":"2025-06-01T11:29:30","guid":{"rendered":"https:\/\/exam.pscnotes.com\/mcq\/?p=92631"},"modified":"2025-06-01T11:29:30","modified_gmt":"2025-06-01T11:29:30","slug":"how-many-prime-numbers-are-there-between-200-and-230","status":"publish","type":"post","link":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/","title":{"rendered":"How many prime numbers are there between 200 and 230?"},"content":{"rendered":"

How many prime numbers are there between 200 and 230?<\/p>\n

[amp_mcq option1=”1″ option2=”2″ option3=”3″ option4=”4″ correct=”option4″]<\/p>\n

\n
\n
This question was previously asked in<\/div>\n
UPSC CISF-AC-EXE – 2019<\/div>\n<\/div>\n
Download PDF<\/a>Attempt Online<\/a><\/div>\n<\/div>\n
\nTo find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number ‘n’ is prime, we can test for divisibility by prime numbers up to the square root of ‘n’. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13).<\/p>\n

Let’s check the numbers between 200 and 230:
\n– 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime.
\n– 202: Divisible by 2. Not prime.
\n– 203: $203 = 7 \\times 29$. Not prime.
\n– 204: Divisible by 2. Not prime.
\n– 205: Divisible by 5. Not prime.
\n– 206: Divisible by 2. Not prime.
\n– 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime.
\n– 208: Divisible by 2. Not prime.
\n– 209: $209 = 11 \\times 19$. Not prime.
\n– 210: Divisible by 10. Not prime.
\n– 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $\\sqrt{211} \\approx 14.5$. Primes to check up to 13. 211 is prime.
\n– 212: Divisible by 2. Not prime.
\n– 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime.
\n– 214: Divisible by 2. Not prime.
\n– 215: Divisible by 5. Not prime.
\n– 216: Divisible by 2. Not prime.
\n– 217: $217 = 7 \\times 31$. Not prime.
\n– 218: Divisible by 2. Not prime.
\n– 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime.
\n– 220: Divisible by 10. Not prime.
\n– 221: $221 = 13 \\times 17$. Not prime.
\n– 222: Divisible by 2. Not prime.
\n– 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{223} \\approx 14.9$. Primes to check up to 13. 223 is prime.
\n– 224: Divisible by 2. Not prime.
\n– 225: Divisible by 5. Not prime.
\n– 226: Divisible by 2. Not prime.
\n– 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{227} \\approx 15.07$. Primes to check up to 13. 227 is prime.
\n– 228: Divisible by 2. Not prime.
\n– 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{229} \\approx 15.13$. Primes to check up to 13. 229 is prime.<\/p>\n

The prime numbers between 200 and 230 are 211, 223, 227, and 229.
\nThere are 4 prime numbers in this range.
\n<\/section>\n

\n– A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself.
\n– To check for primality of a number ‘n’, one needs to test divisibility only by prime numbers up to $\\sqrt{n}$.
\n<\/section>\n
\nChecking primality efficiently requires testing only prime divisors. For numbers up to 230, the largest prime divisor we need to check is 13, since the next prime is 17, and $17^2 = 289 > 230$.
\nThe prime numbers less than or equal to 13 are 2, 3, 5, 7, 11, 13.
\n<\/section>\n","protected":false},"excerpt":{"rendered":"

How many prime numbers are there between 200 and 230? [amp_mcq option1=”1″ option2=”2″ option3=”3″ option4=”4″ correct=”option4″] This question was previously asked in UPSC CISF-AC-EXE – 2019 Download PDFAttempt Online To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. … <\/p>\n

Detailed SolutionHow many prime numbers are there between 200 and 230?<\/span><\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[1089],"tags":[1119,1102],"class_list":["post-92631","post","type-post","status-publish","format-standard","hentry","category-upsc-cisf-ac-exe","tag-1119","tag-quantitative-aptitude-and-reasoning","no-featured-image-padding"],"yoast_head":"\nHow many prime numbers are there between 200 and 230?<\/title>\n<meta name=\"description\" content=\"To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number 'n' is prime, we can test for divisibility by prime numbers up to the square root of 'n'. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13). Let's check the numbers between 200 and 230: - 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime. - 202: Divisible by 2. Not prime. - 203: $203 = 7 times 29$. Not prime. - 204: Divisible by 2. Not prime. - 205: Divisible by 5. Not prime. - 206: Divisible by 2. Not prime. - 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime. - 208: Divisible by 2. Not prime. - 209: $209 = 11 times 19$. Not prime. - 210: Divisible by 10. Not prime. - 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $sqrt{211} approx 14.5$. Primes to check up to 13. 211 is prime. - 212: Divisible by 2. Not prime. - 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime. - 214: Divisible by 2. Not prime. - 215: Divisible by 5. Not prime. - 216: Divisible by 2. Not prime. - 217: $217 = 7 times 31$. Not prime. - 218: Divisible by 2. Not prime. - 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime. - 220: Divisible by 10. Not prime. - 221: $221 = 13 times 17$. Not prime. - 222: Divisible by 2. Not prime. - 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{223} approx 14.9$. Primes to check up to 13. 223 is prime. - 224: Divisible by 2. Not prime. - 225: Divisible by 5. Not prime. - 226: Divisible by 2. Not prime. - 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{227} approx 15.07$. Primes to check up to 13. 227 is prime. - 228: Divisible by 2. Not prime. - 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{229} approx 15.13$. Primes to check up to 13. 229 is prime. The prime numbers between 200 and 230 are 211, 223, 227, and 229. There are 4 prime numbers in this range. - A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself. - To check for primality of a number 'n', one needs to test divisibility only by prime numbers up to $sqrt{n}$.\" \/>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/\" \/>\n<meta property=\"og:locale\" content=\"en_US\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"How many prime numbers are there between 200 and 230?\" \/>\n<meta property=\"og:description\" content=\"To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number 'n' is prime, we can test for divisibility by prime numbers up to the square root of 'n'. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13). Let's check the numbers between 200 and 230: - 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime. - 202: Divisible by 2. Not prime. - 203: $203 = 7 times 29$. Not prime. - 204: Divisible by 2. Not prime. - 205: Divisible by 5. Not prime. - 206: Divisible by 2. Not prime. - 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime. - 208: Divisible by 2. Not prime. - 209: $209 = 11 times 19$. Not prime. - 210: Divisible by 10. Not prime. - 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $sqrt{211} approx 14.5$. Primes to check up to 13. 211 is prime. - 212: Divisible by 2. Not prime. - 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime. - 214: Divisible by 2. Not prime. - 215: Divisible by 5. Not prime. - 216: Divisible by 2. Not prime. - 217: $217 = 7 times 31$. Not prime. - 218: Divisible by 2. Not prime. - 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime. - 220: Divisible by 10. Not prime. - 221: $221 = 13 times 17$. Not prime. - 222: Divisible by 2. Not prime. - 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{223} approx 14.9$. Primes to check up to 13. 223 is prime. - 224: Divisible by 2. Not prime. - 225: Divisible by 5. Not prime. - 226: Divisible by 2. Not prime. - 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{227} approx 15.07$. Primes to check up to 13. 227 is prime. - 228: Divisible by 2. Not prime. - 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{229} approx 15.13$. Primes to check up to 13. 229 is prime. The prime numbers between 200 and 230 are 211, 223, 227, and 229. There are 4 prime numbers in this range. - A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself. - To check for primality of a number 'n', one needs to test divisibility only by prime numbers up to $sqrt{n}$.\" \/>\n<meta property=\"og:url\" content=\"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/\" \/>\n<meta property=\"og:site_name\" content=\"MCQ and Quiz for Exams\" \/>\n<meta property=\"article:published_time\" content=\"2025-06-01T11:29:30+00:00\" \/>\n<meta name=\"author\" content=\"rawan239\" \/>\n<meta name=\"twitter:card\" content=\"summary_large_image\" \/>\n<meta name=\"twitter:label1\" content=\"Written by\" \/>\n\t<meta name=\"twitter:data1\" content=\"rawan239\" \/>\n\t<meta name=\"twitter:label2\" content=\"Est. reading time\" \/>\n\t<meta name=\"twitter:data2\" content=\"2 minutes\" \/>\n<!-- \/ Yoast SEO Premium plugin. -->","yoast_head_json":{"title":"How many prime numbers are there between 200 and 230?","description":"To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number 'n' is prime, we can test for divisibility by prime numbers up to the square root of 'n'. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13). Let's check the numbers between 200 and 230: - 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime. - 202: Divisible by 2. Not prime. - 203: $203 = 7 times 29$. Not prime. - 204: Divisible by 2. Not prime. - 205: Divisible by 5. Not prime. - 206: Divisible by 2. Not prime. - 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime. - 208: Divisible by 2. Not prime. - 209: $209 = 11 times 19$. Not prime. - 210: Divisible by 10. Not prime. - 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $sqrt{211} approx 14.5$. Primes to check up to 13. 211 is prime. - 212: Divisible by 2. Not prime. - 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime. - 214: Divisible by 2. Not prime. - 215: Divisible by 5. Not prime. - 216: Divisible by 2. Not prime. - 217: $217 = 7 times 31$. Not prime. - 218: Divisible by 2. Not prime. - 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime. - 220: Divisible by 10. Not prime. - 221: $221 = 13 times 17$. Not prime. - 222: Divisible by 2. Not prime. - 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{223} approx 14.9$. Primes to check up to 13. 223 is prime. - 224: Divisible by 2. Not prime. - 225: Divisible by 5. Not prime. - 226: Divisible by 2. Not prime. - 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{227} approx 15.07$. Primes to check up to 13. 227 is prime. - 228: Divisible by 2. Not prime. - 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{229} approx 15.13$. Primes to check up to 13. 229 is prime. The prime numbers between 200 and 230 are 211, 223, 227, and 229. There are 4 prime numbers in this range. - A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself. - To check for primality of a number 'n', one needs to test divisibility only by prime numbers up to $sqrt{n}$.","robots":{"index":"index","follow":"follow","max-snippet":"max-snippet:-1","max-image-preview":"max-image-preview:large","max-video-preview":"max-video-preview:-1"},"canonical":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/","og_locale":"en_US","og_type":"article","og_title":"How many prime numbers are there between 200 and 230?","og_description":"To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number 'n' is prime, we can test for divisibility by prime numbers up to the square root of 'n'. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13). Let's check the numbers between 200 and 230: - 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime. - 202: Divisible by 2. Not prime. - 203: $203 = 7 times 29$. Not prime. - 204: Divisible by 2. Not prime. - 205: Divisible by 5. Not prime. - 206: Divisible by 2. Not prime. - 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime. - 208: Divisible by 2. Not prime. - 209: $209 = 11 times 19$. Not prime. - 210: Divisible by 10. Not prime. - 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $sqrt{211} approx 14.5$. Primes to check up to 13. 211 is prime. - 212: Divisible by 2. Not prime. - 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime. - 214: Divisible by 2. Not prime. - 215: Divisible by 5. Not prime. - 216: Divisible by 2. Not prime. - 217: $217 = 7 times 31$. Not prime. - 218: Divisible by 2. Not prime. - 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime. - 220: Divisible by 10. Not prime. - 221: $221 = 13 times 17$. Not prime. - 222: Divisible by 2. Not prime. - 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{223} approx 14.9$. Primes to check up to 13. 223 is prime. - 224: Divisible by 2. Not prime. - 225: Divisible by 5. Not prime. - 226: Divisible by 2. Not prime. - 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{227} approx 15.07$. Primes to check up to 13. 227 is prime. - 228: Divisible by 2. Not prime. - 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $sqrt{229} approx 15.13$. Primes to check up to 13. 229 is prime. The prime numbers between 200 and 230 are 211, 223, 227, and 229. There are 4 prime numbers in this range. - A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself. - To check for primality of a number 'n', one needs to test divisibility only by prime numbers up to $sqrt{n}$.","og_url":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/","og_site_name":"MCQ and Quiz for Exams","article_published_time":"2025-06-01T11:29:30+00:00","author":"rawan239","twitter_card":"summary_large_image","twitter_misc":{"Written by":"rawan239","Est. reading time":"2 minutes"},"schema":{"@context":"https:\/\/schema.org","@graph":[{"@type":"WebPage","@id":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/","url":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/","name":"How many prime numbers are there between 200 and 230?","isPartOf":{"@id":"https:\/\/exam.pscnotes.com\/mcq\/#website"},"datePublished":"2025-06-01T11:29:30+00:00","dateModified":"2025-06-01T11:29:30+00:00","author":{"@id":"https:\/\/exam.pscnotes.com\/mcq\/#\/schema\/person\/5807dafeb27d2ec82344d6cbd6c3d209"},"description":"To find the number of prime numbers between 200 and 230, we need to check each integer in this range (from 201 to 229) for primality. A prime number is a natural number greater than 1 that has no positive divisors other than 1 and itself. To check if a number 'n' is prime, we can test for divisibility by prime numbers up to the square root of 'n'. The square root of 230 is approximately 15.17. So, we need to check for divisibility by primes up to 13 (2, 3, 5, 7, 11, 13). Let's check the numbers between 200 and 230: - 201: Divisible by 3 (sum of digits 2+0+1=3). Not prime. - 202: Divisible by 2. Not prime. - 203: $203 = 7 \\times 29$. Not prime. - 204: Divisible by 2. Not prime. - 205: Divisible by 5. Not prime. - 206: Divisible by 2. Not prime. - 207: Divisible by 3 (sum of digits 2+0+7=9). Not prime. - 208: Divisible by 2. Not prime. - 209: $209 = 11 \\times 19$. Not prime. - 210: Divisible by 10. Not prime. - 211: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $14^2 = 196$, $15^2 = 225$. $\\sqrt{211} \\approx 14.5$. Primes to check up to 13. 211 is prime. - 212: Divisible by 2. Not prime. - 213: Divisible by 3 (sum of digits 2+1+3=6). Not prime. - 214: Divisible by 2. Not prime. - 215: Divisible by 5. Not prime. - 216: Divisible by 2. Not prime. - 217: $217 = 7 \\times 31$. Not prime. - 218: Divisible by 2. Not prime. - 219: Divisible by 3 (sum of digits 2+1+9=12). Not prime. - 220: Divisible by 10. Not prime. - 221: $221 = 13 \\times 17$. Not prime. - 222: Divisible by 2. Not prime. - 223: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{223} \\approx 14.9$. Primes to check up to 13. 223 is prime. - 224: Divisible by 2. Not prime. - 225: Divisible by 5. Not prime. - 226: Divisible by 2. Not prime. - 227: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{227} \\approx 15.07$. Primes to check up to 13. 227 is prime. - 228: Divisible by 2. Not prime. - 229: Check divisibility by primes 2, 3, 5, 7, 11, 13. Not divisible by any of these. $\\sqrt{229} \\approx 15.13$. Primes to check up to 13. 229 is prime. The prime numbers between 200 and 230 are 211, 223, 227, and 229. There are 4 prime numbers in this range. - A prime number is a natural number greater than 1 with no positive divisors other than 1 and itself. - To check for primality of a number 'n', one needs to test divisibility only by prime numbers up to $\\sqrt{n}$.","breadcrumb":{"@id":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/#breadcrumb"},"inLanguage":"en-US","potentialAction":[{"@type":"ReadAction","target":["https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/"]}]},{"@type":"BreadcrumbList","@id":"https:\/\/exam.pscnotes.com\/mcq\/how-many-prime-numbers-are-there-between-200-and-230\/#breadcrumb","itemListElement":[{"@type":"ListItem","position":1,"name":"Home","item":"https:\/\/exam.pscnotes.com\/mcq\/"},{"@type":"ListItem","position":2,"name":"UPSC CISF-AC-EXE","item":"https:\/\/exam.pscnotes.com\/mcq\/category\/upsc-cisf-ac-exe\/"},{"@type":"ListItem","position":3,"name":"How many prime numbers are there between 200 and 230?"}]},{"@type":"WebSite","@id":"https:\/\/exam.pscnotes.com\/mcq\/#website","url":"https:\/\/exam.pscnotes.com\/mcq\/","name":"MCQ and Quiz for Exams","description":"","potentialAction":[{"@type":"SearchAction","target":{"@type":"EntryPoint","urlTemplate":"https:\/\/exam.pscnotes.com\/mcq\/?s={search_term_string}"},"query-input":"required name=search_term_string"}],"inLanguage":"en-US"},{"@type":"Person","@id":"https:\/\/exam.pscnotes.com\/mcq\/#\/schema\/person\/5807dafeb27d2ec82344d6cbd6c3d209","name":"rawan239","image":{"@type":"ImageObject","inLanguage":"en-US","@id":"https:\/\/exam.pscnotes.com\/mcq\/#\/schema\/person\/image\/","url":"https:\/\/secure.gravatar.com\/avatar\/761a7274f9cce048fa5b921221e7934820d74514df93ef195a9d22af0c1c9001?s=96&d=mm&r=g","contentUrl":"https:\/\/secure.gravatar.com\/avatar\/761a7274f9cce048fa5b921221e7934820d74514df93ef195a9d22af0c1c9001?s=96&d=mm&r=g","caption":"rawan239"},"sameAs":["https:\/\/exam.pscnotes.com"],"url":"https:\/\/exam.pscnotes.com\/mcq\/author\/rawan239\/"}]}},"amp_enabled":true,"_links":{"self":[{"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/posts\/92631","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/comments?post=92631"}],"version-history":[{"count":0,"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/posts\/92631\/revisions"}],"wp:attachment":[{"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/media?parent=92631"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/categories?post=92631"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/exam.pscnotes.com\/mcq\/wp-json\/wp\/v2\/tags?post=92631"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}