Math IOQM

 for a,b positive integers if ab+ 1 = k^2 i.e. perfect square then if we use c = a + b + 2k then bc + 1 and ac + 1 will also be perfect squares.

 x^2 - Dy^2 = 1 has infinitely many integer solutions (x,y) if D is a positive non-square integer. Trivial solution: (1,0) Fundamental solution: smallest positive values of x,y both of which are non-zero.

Q1.  Let (a,b,c) be distinct non-zero real numbers satisfying a + 2/b = b + 2/c = c + 2/a. Determine the value of |a^2.b + b^2.c + c^2.a|. S1. The fact that a,b,c are given as distinct => problem wants us to cancel out factors like a-b,b-c,c-a. a-b = 2(c-b)/bc similarly create other equations and multiply all to get (abc)^2 = 8 Then again simplify the given equations to get a^2b + ... = 3abc => answer = 6.sqrt(2) Q2. Let (S) be the set of all three-digit positive integers (abc) (where (a,b,c) are the digits) such that the two-digit number (ab) is divisible by (c), and the two-digit number (bc) is divisible by (a). If we exclude the trivial cases (a=b=c), what is the largest three-digit integer in set (S)? S2. a | bc and c | ab To make it largest, try a = 9 9 | bc c | 9b Now let's try values of bc bc = 99 trivial bc = 90 c can't be 0 as c | ab fails bc = 81 works since 1 | 98 So answer = 981 Q3. Find infinitely many triples ((a,b,c)) of positive integers such that (a, b, c...

Q1. Use mathematical induction to derive the following formula for all n>=1: 1.(1!) + 2.(2!) + 3.(3!) .... n.(n!) = (n+1)! - 1 S1. Pr. th. (n+1)(n+1)! + (n+1)! - 1 = (n+2)! - 1 => (n+1)!(n+2) - 1 = (n+2)! - 1 => (n+2)! = (n+2)! H.P. Q2. + 2 ( 2 ! ) + 3 ( 3 ! ) + ⋯ + n ( n ! ) = ( n + 1 ) S2. (a) Assuming it holds for 'n', i.e. 1/1^2 ... + 1/n^2 <= 2 - 1/n 1/1^2 ... + 1/(n+1)^2 <= 2 - 1/(n+1) If we can show that: 2 - 1/n + 1/(n+1)^2 <= 2 - 1/(n+1) we are done. If: 2 - 1/n + 1/(n+1)^2 <= 2 - 1/(n+1) Then: - 1/n + 1/(n+1)^2 <= - 1/(n+1) then: 1/(n+1)^2 <= 1/n - 1/(n+1) => 1/(n+1)^2 <= 1/n(n+1) which is true. H.P. (b) Pr. th. (n+1)/2^(n+1) + 2 - (n+2)/2^n = 2 - (n+3)/2^(n+1) => (n+1)/2^(n+1) - (n+2)/2^n = - (n+3)/2^(n+1) => (n+1)/2 - (n+2) = -(n+3)/2 => n + 2 = (2n+4)/2 H.P. Q3. S3. Using the second principle of induction, assume that the given relation holds for n,n-1,n-2, then: a_(n-1) = 5.2^(n-1) + 1 a_(n-2) = 5.2^(n-2) + 1 So a_n = ...