|
||
|
Title: 3 JEE matrix problems Post by towr on Jul 14th, 2018, 1:08pm On behalf of navdeep1771 I'm posting the follow problems from the 2010 Joint Entrance Exam |
||
|
Title: Re: 3 JEE matrix problems Post by navdeep1771 on Jul 15th, 2018, 4:08am I was unable to post this image file. As it requires some minimum number of posts. So towr posted this from my side. Thanks towr :) Well these 3 problems are new to everyone (including towr). |
||
|
Title: Re: 3 JEE matrix problems Post by towr on Jul 15th, 2018, 7:18am I hadn't heard of skew-symmetric matrices before. But from the definition I'd say it's either a red herring or we're missing a statement that we're operating modulo p. [hide]On the other hand, it doesn't really matter. For odd p, a has to be 0 in a skew-symmetric matrix, because only then a=-a, and b = -c, so det(Tp)=b^2, which isn't divisible by p. Now if we try p=5, the only answer that fits turns out to be D: 2p-1[/hide] |
||
|
Title: Re: 3 JEE matrix problems Post by navdeep1771 on Jul 18th, 2018, 12:30am [hide] That's Correct. Well mathematical proof goes like this:- We must have a^2 − b^2 = kp ⇒ (a + b) (a − b) = kp ⇒ either a − b = 0 or a + b is a multiple of p when a = b; number of matrices is p and when a + b = multiple of p ⇒ a, b has p − 1 ∴ Total number of matrices = p + p − 1 = 2p − 1. [/hide] But what about '43' and '44'? |
||
|
Title: Re: 3 JEE matrix problems Post by towr on Jul 19th, 2018, 10:55pm [hide] Since a < p and p is odd, then 2a is only divisible by p when a = 0 If a= 0 then det (A) is a multiple p only if b=0 or c=0, which are 2p - 1 cases This seems irrelevant, because it's exactly what's not asked in either question 43 or 44 However, together with 43 and 44 it covers all possible A, so answer(43) + answer(44) + (2p - 1) must be p^3 Which means the answers to 43 and 44 should be C and D [/hide] ;D |
||
|
Title: Re: 3 JEE matrix problems Post by navdeep1771 on Jul 20th, 2018, 8:15am [hide] @towr You are insane. [/hide] |
||
|
Powered by YaBB 1 Gold - SP 1.4! Forum software copyright © 2000-2004 Yet another Bulletin Board |