{"id":4620,"date":"2023-12-13T19:25:34","date_gmt":"2023-12-13T13:55:34","guid":{"rendered":"http:\/\/physicscatalyst.com\/article\/?p=4620"},"modified":"2024-07-14T01:19:45","modified_gmt":"2024-07-13T19:49:45","slug":"mathematics-important-questions-class-12-board","status":"publish","type":"post","link":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/","title":{"rendered":"Mathematics Important Questions for Class 12 Board 2025"},"content":{"rendered":"\n<p>Here are some good Maths important questions for Class 12 Board 2025<\/p>\n\n\n\n<p><strong>Question (1)<\/strong><\/p>\n\n\n\n<p>The x-coordinate of a point on the line joining the points P(2, 2, 1) and Q(5, 1, \u2013 2) is 4. Find its z-coordinate<\/p>\n\n\n\n<p><strong>Question (2)<\/strong><\/p>\n\n\n\n<p>Write the principle value of&nbsp; tan<sup>-1<\/sup>(1) +cos<sup>-1<\/sup>(-1\/2)<\/p>\n\n\n\n<p><strong>Question (3)<\/strong><br>A fair coin is tossed 8 times, find the probability of<br>(i) exactly 5 heads<br>(ii) at least six heads<br>(iii) at most six heads<\/p>\n\n\n\n<p><strong>Question (4)<br><\/strong>Three cards are drawn successively with replacement from a well-shuffled pack of 52 cards. Find the mean and variance of the number of red cards<\/p>\n\n\n\n<p><strong>Question (5)<\/strong><\/p>\n\n\n\n<p>There are three coins. One coin is two headed coin. Second coin is biased one which comes up tail 25% times and third coin is unbiased one. One of the three coin is chosen at random and tossed and head comes. what is the probability that it was the two-headed coin?<\/p>\n\n\n\n<p><strong>Question (6)<\/strong><\/p>\n\n\n\n<p>Determine the values of \u2018a\u2019 and \u2018b\u2019 such that the following function is continuous<br>at x = 0<br><img decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQ0AAACBCAYAAADaF+8fAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACSrSURBVHhe7d0JXMzpHwfwT9OtKFfCiuSqdEnsX5SSe+2KdeRaVhbZdaxzWZbFsrnWWkeuhJy5IrIqKawiKulQKqUoutTUlJnf85+pX5rSNUyHet6786rnmWn86jfznd9zfmWIECiKoqqJw36lKIqqFho0KIqSCA0aFEVJhAYNiqIkQoMGRVESoUGDoiiJ0KBBUZREaNCgKEoiNGhQFCURGjQoipIIDRrlYNJD4LZnFw5fesTWUBRVjAaNMgSxx2E\/dQ\/e2czC99+YsLUURRWjQaOULLhvOAC1Zdth102JravHuPEIvBuBDIYtU1QtoEFDXP5D3IzqgcFfqrAV9RmDVPfVmDB+Oc4kCNg6iqp5NGiIE6TgDTTQRpYt12scaNgdQ9wLd8zu9FkcMNVA0KBRigB8WXkosqWax+B12H94kk7bF9TngwaND8gI\/\/tYfGTGheLp6+IgkIO4wADEZLPFD7xD0O7lOBD6ji2Xh4\/k287YvGY11u88gmOu3ogtbI0wyIq5CZdtRxGQW\/hACDIicP3QNpwKKQD3mSf2bViLLaeDK+nzkPR4KYoGDenhP4LTjEHoZWgKy\/ln8VrY1PFYOADG\/xuA6fuesQ+SXPb1n\/HdYUWMW7Yc0\/RicGjLRcTzhfURnjiwwh72q04iNE80TBwK911LMHPOWhx2dsTPG90RFX8TO6cOx9yzr4UhpowaOl6q4aNBQ1rkTDDb+Sbuu9hB1tMVLkf34J75aURGheCEgw77IEkVIMzLG3EyqlBvooqOg1djw4wukBPe01R3BBzGGL9vSnFaGMJ2\/hgYyfLB1bDFzsN7sMNpL+YaZ8D\/xn3hNU0ZNXK8VGNAg4ZUcdBy6FjYKPng6JOBWDauG9p20YWW2GAM994BrFiyBEsKb7\/AOTAed\/f\/wpaXYOlKFzwSXkkUUYCu1QDIuNrBbOh87PFNgdmCBbAojhTy8pATb0vJyQnL8mivo43CAWPZ9mirIQNuTg7KH1+p+ngpqiwaNKRNSRe62gLkCeTK7VBV1DLDkGHDMKzwNhi9tVqgY98hbFl4G2yCtmJnRX3Ebvh7b8VwgTuWDtKH8eRDeJLP3ilUef8LBxzhc1W6dXQVx0tRZdGgIVUM0rw88LazPpLv+uFZOR\/vcu2MYW1jA5vCmzUMNJuhvZEVW7bBICtDaL4\/KwyyU9LQ1Hwudvs8QdCxb4Hzi7HyZCp7\/6eq+ngpqiwaNKRBkI6YyGTkJlzAP6FGWDDbAl9E3oZ\/SiKuu\/ki7aNHVPmIOLQJx+NE72YV9JiwAtOMgXwe+4QMEf4vvBU\/v4ARhgFS+spC+P0HWSpq7HgrwkV84F1ElDOMw2TFIsDHG3eeplfQhKKKMe9PdN2iQUMKCgI3YZSRIcwWxWLIHGtomI2ETUs\/bJyyA1nG\/dHyE\/7KJOsGVnxlh98OnsHp3dtwq\/USrJqoCV68P5wvPUQuPxzXXbzw9NUz+By6gtB3PIRcOQLvyASEXz+Eq0\/4yAt2xxHfWPYZa\/Z4y8OkumP1hPFYfiZBLDAwSLy0CvN33sOLqBNwMOsOi3V32fsocdlBTpgzYRoWLV+AyXZL4Bb7vtOrboiSJVEs7nEybsDvJOwdW64uQSaJvh9KknlsWSg7LpREpfHZ0scSkMykBPLqVRS57+dD\/INfkBz2nk9SY8crgQw3MqWDJdkWJxAWeOTJ4XlkxpbbRfdR7wmSTpKJ2qZkVWDRyUo\/N43omK4kd7iFxTpBg4a4jw0alMR4N+YSLeVhxOkNW0GVI5\/cW65HlE3WkODi1yTXnUxvq06GO70QfqTUDdo8KUO1uSw6iiZCUFLDZMXgpss2HC2culqA5wEe8PCPQoYgDZFel3HF+zHeT0qVsoLUcNy+4YErly\/jsvjN4zZictgHVYqHBN+9WDhmKnYJm3rl+7SZtbwEX+xdOAZTdz0RPpMYfggueURDTkcXXYpfk4o90bNLLvwuX0cGW1XbaNAoIydDAFX2e0oKsiPgeWAF7O1X4aRo6qrwJSenoAwlOQ5kIAt5JWUoK8oJv5M2PmJPz0LvroawHPY1RtvawlZ4G\/3N6MKvY+e54lmlHw45iLqyFbOGD8Gck7kYvHkvftIv5wc+YWZtTtQVbJ01HEPmnETu4M3Y+5N+4cS99\/IiEBFL0EqzTUm9bGu0as5BfkwkogvYulpGgwZVs5rqYoTDGBi\/nwQih\/Ym1rDW04Aspzm6WthgUH9dtJDyK5EbfAJnMuxw6eF+TJtxFC8L+Eg9NQlmc64ik89HQfxeDC1vyxTh1U\/w6XWYavMVfrnZDNP238BVp8UY2a2CjxKJZ9YKkBZ8Guum2uCrX26i2bT9uHHVCYtHdvvgw4p5m4Us4aWHskoTsfk4wqArKwPCfYvsOkrdTrPGi8t1xfhhsTjjt5qtKBIXF4eHDx+yJUpPTw+6urpsqRpyz2Jiu2nI2vIC12a1LKzinZuMdlMy4Jh8FfbNC6sqxr2HA+vdEFVR60BGAQaTfsd3JmWvBAQI3zwRewyd8c\/QVPz9lT2yt\/yLVT3LuWJgMhHsugkbDgdByWImFs8fD5OWElz\/cC9hepfJeDj5Mu5stUJTtroEg8xgV2zacBhBShaYuXg+xpu0rPwKK\/0gRrSbi\/j5\/gh2\/BIKhZWZODRSE3OiHXAzbDv6F1XWKho0xFUQNLy8vODk5MSWqAkTJuDbb79lS9UgChrthUHD8SODBj8ZwX7heFNRv4eMLDT0LWFYMiuuSPolzJoahB8u\/A6jkFWw+K0dzlyZB63yrmqYDDxwWY\/f990BzL\/HkkXTYdFBgjmygqf4c4ARDvb9F092DGDf4OIYZDxwwfrf9+EOzPH9kkWYbtGh8lm4+d6Y1304LtpcROzBEUWPFcTA0UIPa5R3IPbfeWhXF20FUdCgWOzoCSVl3DNkgroSGba\/ZKgkz20Saa40nBxIYyukLpv4L+9PRu2OI3zCIz4\/GpJvDr2qesSBn0oeuK4hE\/v3JoNnbSUeUdnsHZURkDee28nKyaakSZ8NJLzSkWs+SX3gStZM7E96D55FtnpECY+0Im\/J+altiJLldhJffOC8q8S+vTLp+8cT4TPVDdqnQdUCBoQhwlvJpQKfl4cCJhc5OTUxbFKAp0e+x\/SLBpg\/rRNkC4Lh6ZsFdfU8hLs54XyF7Rwh2dYwnbQOJ\/19sGsUg\/PzrGE5ZR3OhJQzY\/WjZtbKorXpJKw76Q+fXaPAnJ8Ha8spWHcmBOkf\/ANNMeKn2dAPv45rL4uejBf4L\/w5Y7DYvkcNdB5XExs8KBF6pSEhAUk5YUfaq7YmZks92boy8uKI3z92pIucLOlgu4XciMokSfeOkxVWGoTDUSNfLnAml+8nEGlOjcm\/t5IYNutKZp5\/WXRlwfMmDh1liYx8ezLir2Ai2bwoHknw3UcW2U4iO0JLH2X+3SWkh0JLojfGkdx9K6zI8yIO2k2IltUicjq6+r8RL8GX7FtkSybtCC3n75BHQvaMJ5Zj1xIX121k5tDRZMOttDqboyFC+zTEVdCnQVUiJxaBj0JwdvstbLnwF1tZx7KfIThJHQY9ijsaRbuc3UeUTHf01lGX3pAhk4WYhwlQMTBAW7ZzIif+MZKb6aFbC+leB\/BePsbDOIJOxoZo14StrCO0eSIVFS\/Iqg4mMxVptTXmXtxEYNKR8loK\/6hqZ3SXC0NKj1FsRT3QVAfG7wOGCAdqXfqijzQDhghHDV16lwQMEdVOBlIPGCJKbQ3Qr1\/dBwwRGjSkoPwFWdVRgNjL\/2DnjWRwyhkFlCbec9GswxHQt9mIMFGTnqOIN\/5\/YfOJx8KQ97FEw4jncCrWGo4bBrF1VENHg4YUcDTscCzuBdxnd5Kgc4pBottC\/BraF7PHGaN5TZ6JgmcIfJiE+KDbiH4rWjwvogL9MQsw8tUfmOMUIQxfH4MDdeOxmD3ZHJrS\/3Cl6ikaNOqI4PkRLFjPxVgHM3zqFSfzOgz\/PUkXhqEKKOjAwnYcRplplglqijBwmIc2B+Zge2gdzUmmPjs0aEiAn3wbzpvXYPX6nThyzBXeRbkEyizIEgaEKlMJ5MJv62bc7fk1hlQwsYmfFoV7\/sFIzucjK+EJnlWyoutd0G4sPxD64ebBZXBkyzndSn0w2uIV\/t54vsyiMZregCofDRrVlX0dP393GIrjlmH5ND3EHNqCi0W5BEotyKpWKgGuN46dS0R3U1NhI6GsLATttce4xWcQ9SoQTr9Ngo2ePc6k19QglwKMTPSR7Xkcl1LZAEHTG1CVoEFDHC8Ej58GsYXSCsK84B0nA1X1JlDtOBirN8woWq5cZkFWdVIJFDy5g4A3KtDS1ixzAgoQvnsypl\/rjc37V+O7cd\/B4m0gQrWtMVin5joNFLU6oE1eIPwD2CYKTW9AVYIGDXEKWuigqc0WSlPQtcIAGVfYmQ3F\/D2+SDFbgAUluQQgL55LoIpUAkxiApKJKpo2K72XuODpXvy0iYvpjrPQvXDxQh5evsrCFwMHw0B8dEW0gGtFcRqEJfjFORDxd\/fjF7a8ZOlKuJTkQagSR00NqsIrnMTnr9kaEZregCofDRriOM2h3qwFWyhDfQR2+3tj63AB3JcOgr7xZByqdi6B0qkEmHfvhMGjzAbA4OHW37vwpP9cfN+j6KqCSbmMC7ebwHJIn9ILmxS1YDakOA3CMAzurYUWHfuWSo1gIp4HoSqiICf8wjBlmkA0vQFVDho0qonJTkFaU3PM3e2DJ0HH8C3OY\/HKkyjuBpCErKYmWslwkSO+IULBQ1z1egkDCwuoicpMOrzXb8SVd\/1gM6DM+IpcOxhbF6dBsIG1gSaatTeCFVu2GWT14YrPSjBcLnKF10St24gHTJregCofDRrVxI84hE3H4wqbFyo9JmBFUS4BdpizzIKsKlIJKBr2gXGTHCQliuVYZV7jdboAvNxc4UOzEHRsH67E5kGxrzWMw7wQmMU+7hOIjlE0I1T8sET4L14ghaOP3qbKH7kIi2pMaNAQV0lHKEgWbqz4Cna\/HcSZ07ux7VZrLFk1EZoF8fB3voSHuXyEX3eBV3BI1akE1Ifh28HN8PRxWMmkKoVesO6vjnu\/WcDU+kd4d5wIY\/nXePf8X5x8oQnDwsuPj8SkIey6K075J+NdvC+On\/JBZGbxu5+PmNBI8PuMwWgd2VpPb0B9fuiCNXFvHNBBJwqJWd5sRQkmKxlJPFnkJT4Vfm2GbiZGaP8JnYL5Ab\/C3J6L7Q92lORmzX+J0KAkqBn2RkdVgBsfhHCmC8w6f0rEqILgKRytvsLTpQE4OKq56BettUVY1OeJBg1xlQQN6eMiYMNE7Gj9F1xn69TZ3ghZNxZh0kVrOO8aBQ16FUFVA32Z1BkV9F15ED9kH8DfviklfRu1KDfyHHbf74cdO2jAoKqPXmmIq9UrjWJ8vHr0CLm6Zuhc3u7YNYV5iZAHPHTpo13OrFSKqhgNGuLqJGhQ1OeFXpRSFCURGjQoipIIDRoURUmEBg2KoiRCgwZFURKhQUOckh50tQ3ZAkVR5amloJGLxAc+8HmUDLHF5O9Vbwt\/Bukprz9yA9xqevcCL1Li2ELjIBBIMK2MG4\/AuxFi2xaWYLJiEeDjjTtPy8lEVlcY0cJBStpqPGgwabewaYo9dgc\/x\/lZ5vjpGo+9R0SSLfw5UHzjj782n8Djj99zv3ICLrh5jWETzFyEOf8Acy1VKMoro6Xe11hzNbGKNzuDVPfVmDB+Oc4kiD+SQeKlVZi\/8x5eRJ2Ag1l3WKy7y95XR7KD4DRnAqYtWo4Fk+2wxC0W1d+SiKqSaHJXjeFHk70jDcjEE8lEIEgn\/x07RHySihPKCUjC2bnEbkOgRGnyeKHbyMQp+0h4PlshTa9\/JFpq1myh4eL6LSUDrRzIjlPu5MLh1eQbHSXCaWZJtlWeubh8GW5kSgfhz8aJziuPPDk8j8zYcrvovrogSCInJ2oT01WBwqMRSj9HpumYkpV3JEvGSFWsBoOGgKSctiNf6C0hd8t5g\/PjDxFbw2nELZ2tqLY84r\/YlFhsCiFSjxuvHUgHtUFsoaHiEZ8djuSmKPcoK\/\/hamIiL0\/MHWMkzkTOuzGXaCkPI04lCeHrVP695URP2YSsCS7Oisol7tPbEvXhTuRFXSZAbUBqpnnCFCAz\/CSWrb6IZiNtYfJB06OyLfyr2jpfCX1GW+DV3xtxvpJt\/T8Gk98eWrrmbKmhUoTVwqUY2JQtCino9UNvDVlwRHsSVkiUD\/UmXLYdRVGmhgI8D\/CAh38UMgRpiPS6jCvej8ukQahITaVH4CPkkgei5XSgW7jrs4gievbsgly\/y7iewVZRn6RGggY36AR27HaGV1xztHnriWP\/ZZTukKpoC\/9qbp2vYGQC\/WxPHL+UKtWOLu79GHD6D2FLjUjOK6TkG2Lo0A4VLtHPjvDEgRX2sF91EqF5ohoO5BSUoSTHgYzwp+SVlKGsKFf1Ev8aTY+Qh4iIWJBWmmjz\/oNKFq1bNQcnPwaR0TQhlDTU2IK1rFPj0Xm+Ig7GHYNtmWWUBYErYNL\/IHqdfoFjtmWXdjJIOz8dRjMzsXC7CbJUJ8PBRIB3bcV2wi64hQV6g3HS\/CwSXL4p2vG7UBbcl47FtsCK0gbJQNHiV1xeb\/PBRrlMqheW2e2C1j\/nMV+3MW02I0D8nq8x9vGP8No7HBXkbiqUe2IsNL7PxY6ka5jVsqiOd24y2k3JgGPyVdhX9sOlVOMcC2W5L8XYbYEVJoGSUbTAr5fXw6b4ZDJJ2GXTGT+nLMLtR5vRt3BHd+Fxu45Bq+8eYNq1aOwbTLdI\/mSFjRSp45Ebc7SI6tB95GU57cg8NzuiLteRzPUq7Kr6UM5F8p2mCjFY7EPEmt4l3j0iq43kiYLVTpLwqe3Ut6HkzB+LySz7ZeTwgwzS2Jq9gheu5PuvfiG+mWxFJbhnJhA1pWFkv1j\/RZ7bJNJcaTg5IGnfVFXn+KOkkQPDFYmc7lLyn1iHV8bBEURRritZ5F8TveeNT830afDD4fffa\/Qw74\/W5fwL5W\/hL6bKrfPlRLvuC5\/ow01yJcXkJSH+VT6aduoFU51mtTVxpX7gPsKutQGw+ft3WFZzR8FKMzVIokbSI6hAW1sTMlnpKElIJ8CbtEwwslrQ6VzluD5VDTXyHmGS\/XA7uj3MB3Ytt41b7hb+71Vj63yGC26u8HXXug1alPoNMnHpZyuYm5tXcOsP65U3Sk0w42gMw9Kdf2FZ\/6f4dcxieDaW7bZ54XD+9SjUfnaEnTb7ZsoX\/l0\/dkKDRNG7eukRMi\/9DKtyz2PRrb\/1StwoNVtQEX1sLNAiPQZRr4rPIx\/R0c8hZzwIVm0a1UdCzWGvOKQq4\/gY0vwLe3K1oqHxtKPEVk2RWO1MKGkO8NNIdEQS4T53I2sdvUmK3yLSrdkw4pSUQDzP3iRvxNsNXDcyqYUi+d\/mKImHCCvGJ3G7hhOr9WFsuQHLCSF7Jg0j9rsukqtXrxbeLp\/ZQ5ZOWUU8stnHlIN7ajxppjiU7EtlK4Syj9sSFQVLsuN5NRp2kpzjj8ULJGtMW5Ohe18Uvbby\/MjC7h3I5DOpja7pWVNqIGjkkaszvyBa9h4kh635gCCVuH7bmrS3vyp8dJH8u0tID4WWRG+MI7krauTmeREH7SZEy2oROR1dPOZe5F3IGtKr2QCyJVJ6IUOEH\/0nsf56P1tqoN6FkB2D2hBZmcJrA7GbLNGa7Um4ovk1J+xIe9XWxGypJ\/tDwtMR50f+setC5GQ7ENstN0jUWwFJunecrLDSIByOGvlygTO5fD+BlD5TpUlyjj9FXsgeMt5yLFnr4kq2zRxKRm+4RdJoxJAa6QeN\/NvkZ31Dsly8J6ocvHuriGnPheRWcV+oIJNE3w8lyWJ9o9lxoSQqrWxg4JOoPweQrjPdicTzwqqSc4yMs\/qDLTRi2c9IgN95smT0ArZCSqp9jqUgL5mE3rlDQpLoTFBpk1IjLxux4fHIEX6X+58bgoxXYmEfdryrAop9f8HuCTHYc+QZCpu0HDV06V2Sa0NEtZPBh7k2snyw95YBtv0xstLhwY8iIw95ukpB+IfvjO5yYUjpMYqtkJLqnmNpUGoLg379YNiuTEpL6pNJJWgIIv7G5BHrcCXoDH53VsbSreNQdSrRj9jCPzcS53bfR78dOzCK7rlfQxhkBp\/DqVhrOG4YxNZRVAnpTO5iXuLW\/oPwJ70wbupIdFdl66ululv4M3gZ8gC8Ln2gXVN77ueexuSvnsLVZzVbQVFUWTSFgbhcV8y0e45Dl1ayFRRFlUWv8cvIzqh8VwmKauxo0KBqT3Aw+w31OaNBg6odvr6AiQmweTNbQX2uaNCgaoexMfDbb8Do0WwF9bmiQYOqHerqwNq1QI8ebAX1uaJBg6IoidCgQVGURGjQaKBy7h\/HYb+0SmbacpHgfwK7zz2u2VwyVINDg0YD1aSbJWx6qldyglXQ8o03bsQqVr2vJ0WJoUGjoShIRtC1C3D3CEB8AQNuWgISU\/MAnrDeLxiJCQHwuBaCkj2G8hHg+wZG\/ZXxLCalcGMiQXYSEl\/zASYDCQmZRQ+TCprprCGhQaNB4CPsry243XUIuj6\/g8CsNIQdWI7VHilIf34e6x3WweVOPJ4cnInlV9kMdwVB8AzMQ86Dk9g9ZyTmXYiA\/6GlGDd3F9wPbcGfx+4UPe5T8J7Dd+9CjNC3wcYwunq4oaBBo0HgQKMHH+dmzIKb5jAMbdkael01hLUcqHXqivYanWE5dhwmDmiJNy8Lk5aAH\/4vwvQdsOanZVgzQQtvXreExfzNmJx\/DdEW67F71cjCx328AjwLfIik+CDcjn4Lhq5wajBo0GggFMzX4dqJWeAcnIFVPsLGhsyHmwDLyIi26xK9ewV49m8w2n1lAzWk4ebj1rAd3gqctylQVBEgPvGdaM\/mT6QAHQtbjBtlBk3aadKg0KDxucpPRVSgL7zvRCJdwEek0wr8+UAePc1M0an5W0TFvERq3FM8j3uGxORERMcnCG+v8TJa+HiGh\/hUFbRXfAyv40eROnIFul74Gb+ezsGgWQaIOLwXvvFSGlPhyNIXWQNDl8aLS18GXb2niHh1ka2oh5hM3D\/wK7b91xT9hxkh\/cgSuHY\/htA\/TPA2LQPv1LTQTq06H+18ZCangGnZHi0UhaXsLOSrqEGFk4usbDmoNa1857XqKri7FIaDbsIu8B5+M6ApBBoC+iEgTkELHTS12UJ9xMX9P8fgBz9z\/HloE36cOAT6rYSNDUZG2KxQR2st7WoGDBE5qLcrChiFpaaigCH6ronUAgbVMNErDXG5rhg\/LBZn\/Ornzl0Fj9ah\/4hA2Adexg+tE3Dtz3lYdasXtpxah0G1sP0h994BrHeLqnAXVRkFA0z6\/btSCb\/plUbDQ4OGuHodNHjw\/KErvr7eAzO\/7QlOrgw6DJyKWd+aoGUtdTTyk4PhF\/6mwjkXMrIa0Lc0LLU\/LA0aDQ8NGuLqc9AQhGPj\/3phr9EFPDswXIqpDGsWDRoND+3TqEcEgkrGOWXU0FyNg9T\/ruE2O62zINEbeze7IqRo6kX9RET5dhkJ52lwER94FxEZ5fw9mCzEBvjA+85TpNebnRmFv98nD1F\/PmjQqHO5CHP+AeZaqlCUV0ZLva+x5mpiUS4YcZy2mLhkDvSe78aI7t1h3PtLfLM5FmZz7GBUL1N7MEgLuw7XU\/5IfhcP3+On4BNZvanpTKo7Vk8Yj+VnEkr9HZjES1g1fyfuvYjCCQczdLdYh7t1GjCzEeQ0BxOmLcLyBZNht8QNsY1h4quoeUKxuMfJuAG\/s4XawfVbSgZaOZAdp9zJhcOryTc6SoTTzJJsCy8\/6xjv5WPif\/M2eZxcnNCyscggblM6EMttcYU5WXlPDpN5M7aQ25Xknq1ZApJ0ciLRNl1FAgszxqWTc9N0iOnKO6Sh53SjQUNcrQcNHvHZ4UhuivKasvIfriYm8vLE3DFGismtGwDeDTJXS5kMc3rDVtSx\/HtkuZ4yMVkT\/D5\/Ldd9OmmrPpw4vWjYiWNp86ROKcJq4VIMbMoWhRT0+qG3hiw4nMZ7apisGNx02YajAUVtj4LnAfDw8EdUhgBpkV64fMUbj19XrxOBnxmH0KevhY2lIjlxgQiIyWZLLH4IttuNwaJ9vkhg1\/NVhR9yCR7RctDR7YLi7l3Fnj3RJdcPl69nsDUNEw0a9U3OK6TkG2Lo0A6Nc5+L7Ah4HlgBe\/tVOBmaV1jFkVOAspIcODKArLwSlJUVIVflH4ePR04zMKiXIUwt5+PsawFSPBZigPH\/MGD6PvYxLDkjLNy7HhbpLpg+cDDsHd0RWSaulJUXEYFY0gqabUpGhGRbt0JzTj5iIqMb9MZGNGjUKwLEnz6LF9+uhUPPRjo82VQXIxzGwFhsTFmuvQmsrfWgIctB864WsBnUH7otqnrpysFktjNu3neBnawnXF2OYs89c5yOjELICQf2MSU46vqwXekMHx8nTFDyxKLBFpi4xhUPUsvr2WTwNitLGJaUodJEbFkgRw6yMgTct9mFywIbKho06hEm6TTWXzPC9s3DP8iIn52djSzhC\/Vzv3G5XPY3qow85OXKrtH9OJyWQzHWRgk+R59g4LJx6Na2C3S1KkkG3KQzBs\/fg2t+p\/BTx2Bs\/MYcoxY540GmeHOII7zaUYJozXCpoeQCHvIZGSg1Uf5ghXFDQoNGfcF9hF1rA2Dz9++wVGPrxBgbG6NTp06f\/c3W1pb9jaogtXedEnR1tSHIE0BOkhlxhYMEwsOQV4ayijIUhVc54lS0taEpk4X09JKoIXiThkxGFlo6nd\/3czRIbIcoJVIHQ66F8p6QwwsXEufwwrG7IrwcklPcLd\/YcM+QCepKZNh+sZGSPDcyqbkSGX4gja2oHsEbT7J95WRi2qQP2VDBMHYp2dHEY9tsMqyfNflu4zkSllHBSMjb82RqGyViuT2+cAhYhHfVnrRX7kv+eNKwx73olYY4XggePw1iC7WEG4q9Mxfjrs5AtIn3wbVr13Dl7F4ss9+EW9XsyW94GBDhdT8Rn2bJ5yGvgEFuTs77kZCKCZAeE4nk3ARc+CcURgtmw+KLSNz2T0HidTf4lmyU+p4gLRin102B1eCfcEXWFrv\/9caRlWOgr17BW6TpCPw0Wx\/h16\/hZeHT8RD4rz84YxbDvkcD78Jmgwclkr2LDDZayBZqwbsQsmNQGyIrahwLT0XJTZZozfZs8JOEBCkniF17VdLabCnxTGM\/r\/PiiN8\/dqSLnCzpYLuF3Ih6SwRJ98jxFVZEg8Mhal8uIM6X75OEyq7C8u+SJT0USEu9McTxrmgSTB7xctAmTbSsyKLT0e\/nVbz37hHZOnEMWXLgNknKZ+uqIy+E7BlvScaudSGu22aSoaM3kFvFv0cDRhesiWM34fFIuojOjXK8s7blIDbwEULObset4afwl7W0luExyIp5iAQVAxi0ZZ8zJx6Pk5tBr1sLKQ9l8\/Dy8UPEkU4wNmyHejmjX8po80Qck4OcvGzkNYIwyvBeIyYoAq\/qdNGXKjp3l0NYSg+MMpXmul0O1Lr0LgkYIqqdYCD1gCGihLYG\/dCvkQQMERo0Gp0CPL\/tgkVWXaD3\/Qm8rMMAyWQG49ypWFg7bsCgckaMqPqJBo1GRwEd+4+AUSsZaA20gX4djg1y1I0xdvZkmNPtyj8rNGg0Rtm34BWoAgsbM2EIoSjJ0KDRCOX6e8KP\/z\/Y9CdIfHQL\/iHJKNmWgo\/MuFA8fb8gLAdxgQEou8aLarxo0Gh08hHoeRNvDdohesFIjJ35Pb7urYv+y3yQxX8EpxmD0MvQFJbzz+K1IAUeCwfA+H8DMH3fM\/bnqcaOBo3GpiAYnt4voKLQBgMdvRD48DGuLe6IMOcjuMk3wWznm7jvYgdZT1e4HN2De+anERkVghMOOuwTUI0dDRqNDD\/KE17xBpi9dTksNUW9oE2g36MT5GREmV9FOGg5dCxslHxw9MlALBvXDW276KKyNV5U40KDRqMiwPPrXojUHYWxesXDJnxEPo2DYq8vYVrcK6qkC11tAfIEcp\/NrudU7aFBozFhXuH69RB0shmO7sUxgxeA0+55GPvjBLQvfDUwSPPywNvO+ki+64dn9WbHb6q+oEGjFNF6bKbUDtgNStoNXH\/QBoNGGLNDrTm4v+U33LbaiT+GEsREJiM34QL+CTXCgtkW+CLyNvxTEnHdzRflrPGiGikaNMRxFCBH8pHVQN8gDNMBvS07IfXmMZx1OwLHZYvgovgLLvw1EuoPNmGUkSHMFsViyBxraJiNhE1LP2ycsgNZxv3Rkr5SKBZdsCYueysMOxzAnPAIOLRrqO8SPrKeh+FJsiw6GuijvSr7ezJZiHmYABUDA5Ss8XqM5GZ66NaCztikStCgIY55gWtr7LH57WKc\/2sw\/XSlqHLQoFEWk467\/6zGoefdMfr7KRil34K9g6IoERo0KsLPRFxkOrR7dmYrKIoSoUGDoiiJ0FY7RVESoUGDoiiJ0KBBUZREaNCgKEoCwP8B\/iSzM7G\/NmAAAAAASUVORK5CYII=\"><br><strong>Question (7)<\/strong><\/p>\n\n\n\n<p>Determine the value of \u2018k\u2019 for which the following function is continuous<br>at x = 3 :<\/p>\n\n\n\n<figure class=\"wp-block-image\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\"\/><\/figure>\n\n\n\n<p><strong>Question (8)<\/strong><\/p>\n\n\n\n<p>Find the value of k for which the function<\/p>\n\n\n\n<figure class=\"wp-block-image\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\"\/><\/figure>\n\n\n\n<p>is continuous at $x=\\frac {\\pi}{4}$<\/p>\n\n\n\n<p><strong>Question (9)<\/strong><\/p>\n\n\n\n<p>if x<sup>y<\/sup> + y<sup>x<\/sup>= a<sup>b<\/sup> find dy\/dx<\/p>\n\n\n\n<p><strong>Question (10)<\/strong><\/p>\n\n\n\n<p>Find the intervals in which the function f given by<br>f(x) = sin x + cos x, $0&nbsp;\\leq x \\leq 2\\pi$<br>is strictly increasing or strictly decreasing.<\/p>\n\n\n\n<p><strong>Question (11)<\/strong><\/p>\n\n\n\n<figure class=\"wp-block-image\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\"\/><\/figure>\n\n\n\n<p><strong>Question (12)<\/strong><\/p>\n\n\n\n<p>Find the intervals in which the function given by<\/p>\n\n\n\n<p>f(x) = 2x<sup>3<\/sup> \u2013 3x<sup>2<\/sup> \u2013 36x + 7 is<\/p>\n\n\n\n<p>(a) Strictly increasing<\/p>\n\n\n\n<p>(b) Strictly decreasing<\/p>\n\n\n\n<p><strong>Question (13)<\/strong><\/p>\n\n\n\n<figure class=\"wp-block-image\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\"\/><\/figure>\n\n\n\n<p><strong>Question (14)<\/strong><\/p>\n\n\n\n<p>Find the value of the below<\/p>\n\n\n\n<figure class=\"wp-block-image\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\"\/><\/figure>\n\n\n\n<p><strong>Question (15)<\/strong><\/p>\n\n\n\n<p>If <strong>a<\/strong> ,<strong>b<\/strong> and <strong>c<\/strong> are mutually perpendicular vectors of equal magnitudes, find the angles which the vector 2<strong>a<\/strong> +<strong>b<\/strong>+ 2<strong>c<\/strong> makes with the vectors <strong>a<\/strong> ,<strong>b<\/strong> and <strong>c<\/strong> .<\/p>\n\n\n\n<p><strong>Question (16)<\/strong><br>Solve the following linear programming problem graphically:<br>Minimize: z = 3x + 9y<br>When:  $x + 3y \\leq 60$<br>$x + y \\geq 10$<br>$x \\leq &nbsp;&nbsp;y$<br>$x \\geq 0$, $y \\geq 0$<\/p>\n\n\n\n<p><strong>Question (17)<\/strong><\/p>\n\n\n\n<p>There are 4 cards numbered 1, 3, 5 and 7, one number on one card. Two cards are drawn at random without replacement. Let X denote the sum of the numbers on the two drawn cards. Find the mean and variance of X<\/p>\n\n\n\n<p><strong>Question (18)<\/strong><\/p>\n\n\n\n<p>Using Integration, find the area of the following region<\/p>\n\n\n\n<p>{(x, y) : $y<sup>^2<\/sup>  &gt;ax$, $x^2+ y^2 \\leq 2ax$,a &gt; 0,$x,y \\geq 0$}<\/p>\n\n\n\n<p><strong>Question (19)<\/strong><\/p>\n\n\n\n<p>The random variable X has a probability distribution P(X)  of the following form, where  k is some real number<\/p>\n\n\n\n<figure class=\"wp-block-image size-full\"><a href=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png\"><img loading=\"lazy\" decoding=\"async\" width=\"167\" height=\"99\" src=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png\" alt=\"\" class=\"wp-image-9274\"\/><\/a><\/figure>\n\n\n\n<p>(i) Determine the value of k.<br>(ii) Find P (X>2)<br>(iii) Find P (X>2)<\/p>\n\n\n\n<p><strong>Question (20)<\/strong><\/p>\n\n\n\n<p>Let f : R &#8211; (-4\/3) -&gt; R be function defined as f(x)=4x\/3x + 4. Show that f is a one-one<br>function. Also check whether f is an onto function or not. Hence find f<sup>-1<\/sup> in<br>(Range of f) -&gt; R &#8211; (-4\/3)<\/p>\n\n\n\n<p><strong>Question (21)<\/strong><\/p>\n\n\n\n<p>$\\int { \\frac {x^2 -1}{x^4 +1}} dx $<\/p>\n\n\n\n<p><strong>Question (22)<\/strong><\/p>\n\n\n\n<p>$\\int {\\left (\\sqrt {tanx} + \\sqrt {cot x} \\right)} dx$<\/p>\n\n\n\n<p><strong>Question (23)<\/strong><\/p>\n\n\n\n<p>Find the area of the ellipse $x^2 + 9 y^2 = 36$ using integration<\/p>\n\n\n\n<p><strong>Question (24)<\/strong><\/p>\n\n\n\n<p>Prove that the greatest integer function defined by ?(?) = [?], 0 &lt; ? &lt; 2 is not differentiable at ? = 1<\/p>\n\n\n\n<p><strong>Question (25)<\/strong><\/p>\n\n\n\n<p>A company produces two different products. One of them needs 1\/4 of an hour of assembly work per unit, 1\/8 of an hour in quality control work and Rs1.2 in raw<br>materials. The other product requires 1\/3 of an hour of assembly work per unit, 1\/3 of an hour in quality control work and Rs 0.9 in raw materials. Given the<br>current availability of staff in the company, each day there is at most a total of 90 hours available for assembly and 80 hours for quality control. The first product<br>described has a market value (sale price) of Rs 9 per unit and the second product described has a market value (sale price) of Rs 8 per unit. In addition, the maximum amount of daily sales for the first product is estimated to be 200 units, without there being a maximum limit of daily sales for the second product.<br>Formulate and solve graphically the LPP and find the maximum profit<\/p>\n\n\n\n<p><strong>Question (26)<\/strong><\/p>\n\n\n\n<figure class=\"wp-block-image size-full\"><a href=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions-fig-2.png\"><img loading=\"lazy\" decoding=\"async\" width=\"343\" height=\"267\" src=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions-fig-2.png\" alt=\"\" class=\"wp-image-9275\" srcset=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions-fig-2.png 343w, https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions-fig-2-300x234.png 300w\" sizes=\"auto, (max-width: 343px) 100vw, 343px\" \/><\/a><\/figure>\n\n\n\n<p>In an elliptical sport field the authority wants to design a rectangular soccer field with the maximum possible area. The sport field is given by the graph of<br>$ \\frac {x^2}{a^2} + \\frac {y^2}{b^2} =1$<br>(i) If the length and the breadth of the rectangular field be 2x and 2y respectively, then find the area function in terms of x.<br>(ii) Find the critical point of the function.<br>(iii) Use First derivative Test to find the length 2x and width 2y of the soccer field (in terms of a and b) that maximize its area.<br>OR<br>(iii) Use Second Derivative Test to find the length 2x and width 2y of the soccer field (in terms of a and b) that maximize its area.<\/p>\n\n\n\n<p><strong>Related Articles<\/strong><\/p>\n\n\n\n<p><a href=\"https:\/\/physicscatalyst.com\/article\/cbse-class-12-maths-syllabus\/\">Class 12 Maths Syllabus<\/a>( Latest)<br><a href=\"https:\/\/physicscatalyst.com\/article\/definite-integration-formulas\/\">Definite integration formulas<\/a><br><a href=\"https:\/\/physicscatalyst.com\/article\/integrals-class-12-important-questions\/\">Integrals class 12 important questions<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"<p>Here are some good Maths important questions for Class 12 Board 2025 Question (1) The x-coordinate of a point on the line joining the points P(2, 2, 1) and Q(5, 1, \u2013 2) is 4. Find its z-coordinate Question (2) Write the principle value of&nbsp; tan-1(1) +cos-1(-1\/2) Question (3)A fair coin is tossed 8 times, [&hellip;]<\/p>\n","protected":false},"author":8,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"_uag_custom_page_level_css":"","site-sidebar-layout":"default","site-content-layout":"","ast-site-content-layout":"default","site-content-style":"default","site-sidebar-style":"default","ast-global-header-display":"","ast-banner-title-visibility":"","ast-main-header-display":"","ast-hfb-above-header-display":"","ast-hfb-below-header-display":"","ast-hfb-mobile-header-display":"","site-post-title":"","ast-breadcrumbs-content":"","ast-featured-img":"","footer-sml-layout":"","theme-transparent-header-meta":"","adv-header-id-meta":"","stick-header-meta":"","header-above-stick-meta":"","header-main-stick-meta":"","header-below-stick-meta":"","astra-migrate-meta-layouts":"set","ast-page-background-enabled":"default","ast-page-background-meta":{"desktop":{"background-color":"","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"tablet":{"background-color":"","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"mobile":{"background-color":"","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""}},"ast-content-background-meta":{"desktop":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"tablet":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"mobile":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""}},"footnotes":""},"categories":[498],"tags":[],"class_list":["post-4620","post","type-post","status-publish","format-standard","hentry","category-maths"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v27.3 - https:\/\/yoast.com\/product\/yoast-seo-wordpress\/ -->\n<title>Mathematics Important Questions for Class 12 Board 2025<\/title>\n<meta name=\"description\" content=\"Check out Mathematics Important Questions for Class 12 Board for 2024.These are good questions to practice before board examination..\" \/>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/\" \/>\n<meta property=\"og:locale\" content=\"en_US\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Mathematics Important Questions for Class 12 Board 2025\" \/>\n<meta property=\"og:description\" content=\"Check out Mathematics Important Questions for Class 12 Board for 2024.These are good questions to practice before board examination..\" \/>\n<meta property=\"og:url\" content=\"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/\" \/>\n<meta property=\"og:site_name\" content=\"physicscatalyst&#039;s Blog\" \/>\n<meta property=\"article:publisher\" content=\"https:\/\/www.facebook.com\/PhysicsCatalyst\" \/>\n<meta property=\"article:author\" content=\"https:\/\/www.facebook.com\/PhysicsCatalyst\" \/>\n<meta property=\"article:published_time\" content=\"2023-12-13T13:55:34+00:00\" \/>\n<meta property=\"article:modified_time\" content=\"2024-07-13T19:49:45+00:00\" \/>\n<meta property=\"og:image\" content=\"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png\" \/>\n<meta name=\"author\" content=\"physicscatalyst\" \/>\n<meta name=\"twitter:label1\" content=\"Written by\" \/>\n\t<meta name=\"twitter:data1\" content=\"physicscatalyst\" \/>\n\t<meta name=\"twitter:label2\" content=\"Est. reading time\" \/>\n\t<meta name=\"twitter:data2\" content=\"6 minutes\" \/>\n<!-- \/ Yoast SEO plugin. -->","yoast_head_json":{"title":"Mathematics Important Questions for Class 12 Board 2025","description":"Check out Mathematics Important Questions for Class 12 Board for 2024.These are good questions to practice before board examination..","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:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/","og_locale":"en_US","og_type":"article","og_title":"Mathematics Important Questions for Class 12 Board 2025","og_description":"Check out Mathematics Important Questions for Class 12 Board for 2024.These are good questions to practice before board examination..","og_url":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/","og_site_name":"physicscatalyst&#039;s Blog","article_publisher":"https:\/\/www.facebook.com\/PhysicsCatalyst","article_author":"https:\/\/www.facebook.com\/PhysicsCatalyst","article_published_time":"2023-12-13T13:55:34+00:00","article_modified_time":"2024-07-13T19:49:45+00:00","og_image":[{"url":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png","type":"","width":"","height":""}],"author":"physicscatalyst","twitter_misc":{"Written by":"physicscatalyst","Est. reading time":"6 minutes"},"schema":{"@context":"https:\/\/schema.org","@graph":[{"@type":"Article","@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#article","isPartOf":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/"},"author":{"name":"physicscatalyst","@id":"https:\/\/physicscatalyst.com\/article\/#\/schema\/person\/9b302efdc9b32e459cb1e61ab7506d3f"},"headline":"Mathematics Important Questions for Class 12 Board 2025","datePublished":"2023-12-13T13:55:34+00:00","dateModified":"2024-07-13T19:49:45+00:00","mainEntityOfPage":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/"},"wordCount":785,"commentCount":0,"publisher":{"@id":"https:\/\/physicscatalyst.com\/article\/#organization"},"image":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#primaryimage"},"thumbnailUrl":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png","articleSection":["Maths"],"inLanguage":"en-US","potentialAction":[{"@type":"CommentAction","name":"Comment","target":["https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#respond"]}]},{"@type":"WebPage","@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/","url":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/","name":"Mathematics Important Questions for Class 12 Board 2025","isPartOf":{"@id":"https:\/\/physicscatalyst.com\/article\/#website"},"primaryImageOfPage":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#primaryimage"},"image":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#primaryimage"},"thumbnailUrl":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png","datePublished":"2023-12-13T13:55:34+00:00","dateModified":"2024-07-13T19:49:45+00:00","description":"Check out Mathematics Important Questions for Class 12 Board for 2024.These are good questions to practice before board examination..","breadcrumb":{"@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#breadcrumb"},"inLanguage":"en-US","potentialAction":[{"@type":"ReadAction","target":["https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/"]}]},{"@type":"ImageObject","inLanguage":"en-US","@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#primaryimage","url":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png","contentUrl":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/07\/class12-maths-board-questions.png"},{"@type":"BreadcrumbList","@id":"https:\/\/physicscatalyst.com\/article\/mathematics-important-questions-class-12-board\/#breadcrumb","itemListElement":[{"@type":"ListItem","position":1,"name":"Home","item":"https:\/\/physicscatalyst.com\/article\/"},{"@type":"ListItem","position":2,"name":"Maths","item":"https:\/\/physicscatalyst.com\/article\/maths\/"},{"@type":"ListItem","position":3,"name":"Mathematics Important Questions for Class 12 Board 2025"}]},{"@type":"WebSite","@id":"https:\/\/physicscatalyst.com\/article\/#website","url":"https:\/\/physicscatalyst.com\/article\/","name":"physicscatalyst's Blog","description":"Learn free for class 9th, 10th science\/maths , 12th and IIT-JEE Physics and maths.","publisher":{"@id":"https:\/\/physicscatalyst.com\/article\/#organization"},"potentialAction":[{"@type":"SearchAction","target":{"@type":"EntryPoint","urlTemplate":"https:\/\/physicscatalyst.com\/article\/?s={search_term_string}"},"query-input":{"@type":"PropertyValueSpecification","valueRequired":true,"valueName":"search_term_string"}}],"inLanguage":"en-US"},{"@type":"Organization","@id":"https:\/\/physicscatalyst.com\/article\/#organization","name":"physicscatalyst","url":"https:\/\/physicscatalyst.com\/article\/","logo":{"@type":"ImageObject","inLanguage":"en-US","@id":"https:\/\/physicscatalyst.com\/article\/#\/schema\/logo\/image\/","url":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/08\/cropped-logo-1.jpg","contentUrl":"https:\/\/physicscatalyst.com\/article\/wp-content\/uploads\/2024\/08\/cropped-logo-1.jpg","width":96,"height":96,"caption":"physicscatalyst"},"image":{"@id":"https:\/\/physicscatalyst.com\/article\/#\/schema\/logo\/image\/"},"sameAs":["https:\/\/www.facebook.com\/PhysicsCatalyst","https:\/\/x.com\/physicscatalyst","https:\/\/www.youtube.com\/user\/thephysicscatalyst","https:\/\/www.instagram.com\/physicscatalyst\/"]},{"@type":"Person","@id":"https:\/\/physicscatalyst.com\/article\/#\/schema\/person\/9b302efdc9b32e459cb1e61ab7506d3f","name":"physicscatalyst","sameAs":["https:\/\/physicscatalyst.com","https:\/\/www.facebook.com\/PhysicsCatalyst","https:\/\/x.com\/physicscatalyst"]}]}},"uagb_featured_image_src":{"full":false,"thumbnail":false,"medium":false,"medium_large":false,"large":false,"1536x1536":false,"2048x2048":false,"shareaholic-thumbnail":false},"uagb_author_info":{"display_name":"physicscatalyst","author_link":"https:\/\/physicscatalyst.com\/article\/author\/physicscatalyst\/"},"uagb_comment_info":0,"uagb_excerpt":"Here are some good Maths important questions for Class 12 Board 2025 Question (1) The x-coordinate of a point on the line joining the points P(2, 2, 1) and Q(5, 1, \u2013 2) is 4. Find its z-coordinate Question (2) Write the principle value of&nbsp; tan-1(1) +cos-1(-1\/2) Question (3)A fair coin is tossed 8 times,&hellip;","_links":{"self":[{"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/posts\/4620","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/users\/8"}],"replies":[{"embeddable":true,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/comments?post=4620"}],"version-history":[{"count":5,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/posts\/4620\/revisions"}],"predecessor-version":[{"id":9276,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/posts\/4620\/revisions\/9276"}],"wp:attachment":[{"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/media?parent=4620"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/categories?post=4620"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/physicscatalyst.com\/article\/wp-json\/wp\/v2\/tags?post=4620"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}