Maths-
General
Easy
Question
Compare the integers.,> , < or =
-252 + 312 - 400
-212 - 452 + 300
- <
- >
- =
- Not equal
The correct answer is: >
Consider -252 + 312 - 400
( (-) + (+) → +ve (sub) sign will be according to bigger number)
Consider -212 + 452 - 300
![left square bracket left parenthesis negative ve right parenthesis minus re not stretchy rightwards double arrow plus ve left parenthesis text Add end text right parenthesis right square bracket
left square bracket left parenthesis negative ve right parenthesis plus ve not stretchy rightwards arrow negative ve invisible function application left parenthesis sub right parenthesis right square bracket](data:image/png;base64,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)
Now, -340 > -364
because, -340 is on the right side of the number line
-252 + 312 - 400 is greater.
Related Questions to study
Maths-
Maths-General
Maths-
Maths-General
Maths-
Maths-General
Maths-
Maths-General
Maths-
if
and
then ![fraction numerator open parentheses x squared plus y squared close parentheses to the power of 4 over denominator x squared y squared end fraction equals](data:image/png;base64,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)
if
and
then ![fraction numerator open parentheses x squared plus y squared close parentheses to the power of 4 over denominator x squared y squared end fraction equals](data:image/png;base64,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)
Maths-General
Maths-
Maths-General
Maths-
If to
and
If to
and
Maths-General
Maths-
If sin
cos
m and sec
cosec
n, then ![n left parenthesis m plus 1 right parenthesis left parenthesis m minus 1 right parenthesis equals](data:image/png;base64,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)
If sin
cos
m and sec
cosec
n, then ![n left parenthesis m plus 1 right parenthesis left parenthesis m minus 1 right parenthesis equals](data:image/png;base64,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)
Maths-General
Maths-
if
sec A-tan A then lies in the quadrants
if
sec A-tan A then lies in the quadrants
Maths-General
Maths-
cosec cosec A +cot A=
cosec cosec A +cot A=
Maths-General
Maths-
The total amount of fee collection for 21 students is $31500. How much was paid by each student.
The total amount of fee collection for 21 students is $31500. How much was paid by each student.
Maths-General
Chemistry-
is a
is a
Chemistry-General
Chemistry-
In the reaction,
![](data:image/png;base64,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)
In the reaction,
![](data:image/png;base64,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)
Chemistry-General
Chemistry-
In the given action,
![](data:image/png;base64,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)
the product [X] will be:
In the given action,
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAX8AAACXCAMAAADK+qsOAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf///wAAAEpKStbe3u/m762trSEQGWtrazExMSkpGa1a70papXtalHta7xAxShkhIa1axUpae3taxZRaShBaSkpazhBaEOalnAgIEPf37+be3qWMlObWc+Z75uZac61anOYx5ubWMeZaMWNaKbVaGRla72MpGebWUuZaUmNaCGMIGWNjWkrv3krvWq2U70qt3kqtWq2lWkqtnEqtGa3vGa0ZnErvnErvGbUZSkoZ762lGXvvnHvv3nvvWnuU73vvGXsZnHulGUrO3krOWq2EWkrOnErOGa2EGXuEGXuEhKWllM7OxTo6QrW9tQgIALVaSjFaSkpa72MpSjFaEOa95ualvWMISuac5oScjNbW1rXFxXt7c1JaUtbWnOb3cxkppeb3IRkpe+ZateYQtealEOYpEBmM7xmMaxmMrRmMKZQpGRkpzhAIShkIpRkIe+ZalOYQlOaEEOYIEBmMzhmMShmMjBmMCJQIGRkIzghapQhae9Za5pxae9YQ5tbWENZaEJRKGQhazq3v763vrUoppa0p73ulpXsp73ula0ope60pxXspxa3F763Oa62lzkqM70qMa0qMrUqMKa3OKa0pe5QpSkopznvOrXvO73vOa3ulznvOKXspe63FlK3vzq3vjEoIpa0I73sI73ulSkoIe60IxXsIxa3OSq2EzkqMzkqMSkqMjEqMCK3OCK0Ie5QISkoIznvOjHvOznvOSnuEznvOCHsIezEISuZ7teYxtealMeYpMealc+Ypcxmt7xmtaxmtrRmtKbUpGRkp7xnv7xnvaxnvrRnvKeb3veaEc+YIcxnO7xnOaxnOrRnOKeZ7lOYxlOaEMeYIMealUuYpUhmtzhmtShmtjBmtCLUIGRkI7xnvzhnvShnvjBnvCOaEUuYIUhnOzhnOShnOjBnOCIyEhPfWnClapSlae/da5r1ae/cQ5vfWEPdaEJRrGSlazq3va63vSu/Wxa2MrXuEpXuEUmtKUhApCHtScykIAN737973/wAQAP/3/wAACAAAAC9wwL4AAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAAScklEQVR4Xu1d23KqShQUZhB8mldMPsEvkRGfo/D7fIGppCq1tU734iKamAiBaE6mc84OalDs6Vm3uTD5Jt7mWuvquP4NKKuVaj12GAO6yOOZMX5g+Uj5fhhmYbbBkecZz8uV/JXDSEhzz4tnqxhkswEe8NA7hImdzDMceX42L//OYRRsIi8urNI2QgNA6lqFONjwJY2miJz6R4UC7b6Y+JTmhj0ArE/FFGk8M5OWcBgLAUxMVh5amKAVjA31L6p3+h8dpLiUP5BA+KAbv6QfTPbk3+l/TBRH+aMD0N1qfbT/sD+O/1HBECesjoV/b0P7P8uXj2m2Bf/ernrRYQyQ/0b/Wzwwmvwf2BIlgupFhzHwDIZP9O+X/tdEU2NmyL4c/6PiRP/kP9Jz6N8EWj0oTe/g+B8TKRhu9M9YNNLU/6yMOh3/Y0PBxJTBPvAIuvPJBF63zL+E/1SOHEYCxL6uJY5jryjtfxl1Pjn9j40EoU6x5xHjfi/XkpJV/Dv7Mz6S2ItympuKfqn/xAlf0ivH//ig1Y+yDKwL/ZYHLEBPlBzloRuAGRe7BeN8NIIwvYzMFD9xMHnwjTFTL1YqcE0wJlT6uPCXtaHZK4sfOABlNxtlk80k8V0RdGyIC3Zw+JPYLMMnZ+Nvhy1CzofqeHiku18zhK/KxP+nsTEsfI4F4/0a/11IBvTjsNMR+Z8//p4UopmF9rMYV/8OXwH8R87/3gw6mXq5G2i/HULv4FLcGyLw1k7+N8TOi53+b4jEW98m8XAQBE7/N8XO2f+bIpGBd4duGC5jCmTim0MnpMPNzYf+Hf9doYYr6/6I/jfOxV9C9gP8pwvn4i8h/wH+g+wn+b9RIbkndt/k//5G7+2vMnbf0r9Ofd8P9PwoOZUE9tbr5n+V/r/Bf1rkked5xs9X5Up5VTzjiTjOfhUDt0V//tMY5MdFwl+cK/rAXQu81QuaIHI7F1wJWYVaHXcD1wybwMIGcfFGyqTEW2eBfktkMrvrAtcBZPXjH6xPqxUahZmiHaD+tcheI6aN3eTpq9Bb/48GZqa2MpmRtUvVcoKJQks8yZHDVwBtzSqwLkC7xWkdfOpC8Y3qgXy9iGGaymOHzwGr0YepFPJvzZvTKmF/qB6dru1z+Aw99U+G4/bAGWOfZjsJO/W8WXXs8Al0wOixYwPskeFsqP9WkKmZCTQDCemh1RkcLsGqQoJ3L+wyBJyGRcK9m97rv2lHxdi0OnY4RROY621k4n9raQBzfcqawrbsGH3WS7UFKgTljf75ajSx3ErO4RRvtbdVvmg/eBDqvGsXAQT463g7mSxa5p5gGtzsWMO9DQxbIXJzK85Qh4xJbjzjhwkps4zd/auoCmD3X5l2gf/j9hHKTrbgv0m6uHq4EB8tq1kdzrHLqPmXzXYHWw5QsHG5C+WnoPEpWd7hjCZxS6epRoOUe2fBstEZ2Mk+OXgrlwZ8gPQVBEWBmqdwoxm7RMh4ZvVVAwj9ZdFhzoCnVnd+sJMC71A5AHYnTvyX5NpV4s6glZjnoizZeItnYUixR5jwU7lK0lXvysH9Ow6LR6VskUuXsCb28uRtojO8IqGQplMw9mrX/jdAerxoOVEJNxk4Tv4J2BpxcVmvAdRvavonEoLiiQhvJ62mEr6+CCUSrTh/nuGjXA9oQUu0s9rtbcSDxoUC5UvFheGrvaX62/1jk9JqIQ6tNorTaRjzHeL8+K7sardZWHWX0OXODv4c1oIHZ1Pf5Enz8Z4DHG45ybgAXWRh1npOp8UqPHHjsrVKu5H/NCyCTtCx1SmNUFw8V883EI2/fpCMadbXZlcEM+9ORYOvUmeCiFLzcI2lqT+a8iMsncIhT85oZCTTc0wFp8ax20kF2NDfCv0wJRdDHQmKTHiiWG4Q7fkftdcVEBN0Zuj+IHZPxounxXZSCJmXKzM6IGF5axoN486uRdIWmJr1P/v/gY1MU4CEJfiPvwhJ2ABxXRTVND5x8o2JVuwB4Z/eSUhqbKYIylJP/mVKlKGPxFXgvo2mnvleHUcjDcir44HwLkrWqsL97ThRWhSDhDc3hytLApK6LmDyWaL49lbclrd6qI6HQRLlee7ntZnUqoims+nMzKSUXuQ9ndUIsFuWI02Ylq41ujIdeozj9cEPAg60fP/LMH4atAESvCERS0auWZeNojDi1VrKrVesNgoSQykjBwpIgn91OUZM1RTnRs08h/7gzTaG5GT/tsOFBTsoaoq3ZUC90ArdwPcidVebZ+olWVegkxR0CcRtOTo5zH0A5G4n1xi+a6EkqFLwLDCsCCqqb5byRhJ3pX8KBfQzsy0eq+euAB0cTxrqNgwK2ceQPgD853C10LqxvG9H1bYqxJdFc9wP/9B/OJkzre307WXsFpnaYJSxB3wdeV2NDTjHm0HqsdxHq646pQvex+BwP/zLCtM94pmkU/df+og5tRmweGbB0nC1UOgfIudGvVMm9s1W4gDjjLvSPzS8/Xxo5T1CygvmdUCTAbPQGj/4JqB/L2d0ZlJOdzlJUPBB9xN/PuM6e6guZL1NTYcsHu8RJfYr4n0AVc6cYXDM6S5t/u9L/8h96oHxLoBhzTjIOKD+JQ2oJ61/F6L/IkzwdjLdom1/osr+D2bsvgNODeyhBvBfTB6GtP+AeoFgh5Em7X91bRs0a3XfrIRjcXQK8iEqUGHfsu1goNvrXr7hd4D+p96yemIYWJiG10EaAGFFk5cvcCxdXOehTidzv3pJZqVWd/S4GeCdekRjLHouB9c/rgYphT/EEl0anVpWCIDiUudzHXpb+F+ZG6k5A+zmd9G1cFQ9bqUG/oe3/0A69cwQw2FwuofGtLAxIiUTmWJ0r+dyKYjNvSzoFnWPgE3svXbPYZktFRx0H9b+ADQcybZ60BuKN49oZqDK0J6fA1LksGXEgU+6vuTBt/pUFl/+wQXYWBLFjoDpZGQXn095+D5UwRr4yRVppbruQc0lBq24QtbfECbb68D3pjlamHMko+v8b5r7C8k4BUGRFVmKS9RbteHvjZ8v/ay46q3OAf23k8MrUfIP+zOC93pCvtT6KloXUbTqaCdUnvt+W93qcVkUywBsSZldmoYfdJ0BZW+Sgh5RvgGVl8RRRA9IrwX0ssXQ/6y7/mF/cAHJej3C1IW5WXurmjobclIM/+v27TRRHZ9inmS7pUzsnmyC+LOh7iNgquDCq2uSYrkM2PGAodRcBYUEJD3QT/9z8J9Mdrj84fnf847n1dIAUVZebHJIdYx9C5JjlPoZng/t2qBizZ6BH31VbQAkIeoBxD/tlSpXgqFzwSBjBP4ne8ptRV2K1Gh2WZvwwu5xwld4vJD86+BkjhPE3R6g1rwYuKXV8WzekroX/z3tv9RQkn+j8F/efZXvzHV8ZYYxZww58IfhaweX9I/YVB1pQV7e/mx+e2NT2IDGw7NJftL+G+/VToLDSPyTbajiIV834uB37rkVyMcI8igofO/jMScOC7Yys3Nxw9h4ftTOnTmJprf9796vwUa8ZV4zDv9iWqeKlctmapb9B5cz3KeJkYOZu/SO4DNsBrYXZ/yLXTy0Z1FQHj+r/3Wxx2UNOmjbBr6hRYS+bnJzhus9LOVFpOHKhJdj9iCKvXL9G/DOuOOJU8/BkeZe+k9iDkl3xZzWgH2Og6yjIPCX3CnlWGBi0NE21jrJsmz79JjaAD9pmto02Ey2H2jpcZkVy9OfzD492iC0drPFefaDEzXXk9TyAt2n5KLnc2LFEX3tv4ar65H/cug3Iv+9+tw10GhYmtmmNkv+24tl3mgDEJbG8SGuYWbxLDJRZl7CZRhmGf7HAasP5+CJ09hU58mJJsKJuZyEf4py9UhpX8H/iaHl4p7TwEmhu/TiAjlUn14N05yTn4Hrn6cg/80HBOtT/e+FH2BNMvmrGvLqiC/Okk/EhbT1L+b/tHCto+iqTOId4H9nPe7whQ44rv4naaKTg3do7D8bw7SuVBfhIjQv+SpIgixLQmLB/xZhjl95UeTRMkiWkcn9CE8t+Hz1CyfmeWSShYmC+kSeCeTJMl+YxSqXKckmE23aQ/uLcsjQnI1Vw/7HvdKTMtLrDLDh85/RZo6nsZdxJUL+Vj1B/t8FoJzTVh1+ACk5a7ufv/8btd+rDU7+WHp4Wy3LOYtyRbpuGxekXXGKaOBk2JwJ6UmHuBYIw/weEwjJ/xv++Th9/D5g3xBtwu4izRDIYFUPofSF8qdHd4MgseEf6ofpQe848QgslFi0Z+exI7i1PjU0UJ/xsrjZwwiA+g+F5adMq1VoKRpkVGdzipSzYZrmVq8N/7D9YnkgjfawrZ55B4tG67y34yM6Uj/9FzR64wyfyhIofBHGGS/yhehrfnKVDKdlHu05nGQlA6kNQq8K0ely3xIurm/DXtv1Kr+jfwS9o9gfoV/cG9T2Ly42VuHzovAH104EJ98MbIv+t7IonWaJTJ/cgh1PwCrxyW5s4pR+868QkeGyxqg/MJepayKK5X8E6J4phhiWvxr6ZNMp6F92bKzGYfTEGuQOpq1c8LjB1SIN6BaGQmF9+rXo/8GMwn9xYtZ0GMeRf9t5Og+V/7UcRGMRSpcJd+vLw2DBFe6tWXWL5rV/4keuRan/Ufi35nRG0nyzeZiP0MwdoL5ObkX/VPNL9cSVAP/v1rlfgfH0z0guufUm6Wcg/0HwdvGitOKiJsuV0FGdr1yJt6iv/hH/wP4P7ROtWTdrW+8GD8hukfBcCi25oywA/led9biBkHuIrdF/x+b+CipaG3/TIyAeFYx+PfNy0bI/ZVnuc8R037mUo1fif7s2gVRkh7f/DK/HcOnfhLbB0+MXiVVPzYBD2J+040RgVgOGt/97uzDIe++P/xFhJY9G/zJWylVXIiX/sP/DrRgC9DI+DX3+ADZrxj/cPgkZTvXcFdB5mFL/zUSpQeB7F8bD/7+A/mfhXlL+OOowvs2/hO0acvzxzf9z6pfQFhn1HKErxBfnJ4OaX0AV6yHtP6vNY5Wz7xiy21WeaNlDzMuv3ghGh9N/IKxLg30K0L+O+pQCfzuoOxb19pxtxmzgKg5YkfRmBkZrmBbgVfyx0KeGLhbg0le63HTbD7626Vp2KA738B59Vu+9B3de7DjF+f+EBPF8nNmHIjL/rrg/l2yTxdiTWyfFRbsO2BOsp/9d+ieT3esBpsSW2wPDC3zWAtzGBbTL9LwNzVCzMqQ37KrzwNH/DQGkPH2yUgLwVvZyIJLmHASqTbWV3Q+/OTefzuSP048GEOO/0xx69szFeyPIn7VtBdcCn03P6wbFZb/mBwcX7xQpN4n/hwC0YBcwH85s0LJTUHbic8UcfWNugkwnc7ckBBHl8PJuUnBTstkHqUBK9b/bo4GbJ3nL3kVj9Dd3U9QS1jfeqwn1XKzMeWj/8IQnP9qhgbPfe/uAAuf+eeNfg3MuoeV0HkxxcLLfv5hpL8o+KlSLCernA+hthq3i/WqoLTKhdexrJfsKt2Z8h+bgTS+t1fvYB2htv5ofR/W3p5U7aNnY0NcwRjio7pqpuOft+cbbbYgTPekBepP5kRe/hGFYNkIgc41PHK0ssbjDAa/bQvai9EPe9SUqZ+HJpplevvmEKfEBy+Mq2a0UM/hOcOV42ZaBK4xNq8rNyQ5O/efQJd2I8dOST7EuX411yR/ldS0iLSsTSrbI5d0Gs4PnZ4lsr370IAHaObi30fZ7gBR46iRLmD01HB9BkdyoIvcR9JdlCVgm8A/1y/wN3lujqfKnfJIrjRzOYbn+Q/Ks1OdKtKvyKyZwMoimFziqmy8B/wirqgUjTBbKu07R0Qy/gcr/BlzynxcbSXi5QfQ1sCEUTdmHOKk2MzozfJO6OTipXLw6jdzC8X8RUoljJry+flAsXcOi0/mC/8av2mL375hjce4KJ/fTH99696/7huK4DIjsMMKiw8XhSeRfR66AEqnXMxvmHG8LZW+HPitf/xK4q8dZse1LaAb7pLi9Ywj5b8wRvXnA0HPmjM8X0Jkfdp7SCMioTHVMkP+mGfnATubZHd2F4o7Ry0RQ/2f8H3e6sDD8pN7F/aOBm2W0+efmAfUgpUwmdtIfFRoSP/rfyYQDBO34x7NO/KOCGm9G5W3GXKIpzsE4TY9rOx3GAFdiNh1g4aVwAHWdTfI6F/ePizdaHJ/TCXWRec+8wUZV9mHa1TZNDqNAxgO8vHiCteECv2ckxtFzUciNzF3cPz5UQR9AlIWfZFY9LO+J5jA65ski9/MmfdZJEfEuk2mfhM6hH/RJnKmKbrWMO8bW2dBbQud1Od3hJvjR3UAcHBwcHH4VJpP/AOIeA7Md5P5nAAAAAElFTkSuQmCC)
the product [X] will be:
Chemistry-General
Chemistry-
In the reaction sequence,
![](data:image/png;base64,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)
In the reaction sequence,
![](data:image/png;base64,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)
Chemistry-General