If `aN = {ax:x in N} and bNnncN=dN,`where`b,cin N` are relatively prime, then show that `d=bc`.

If aN= {ax : x in N}" then "3N cap 7N="………."

A determinant of the second order is made with the elements 0 and 1. If (m)/(n) be the probability that the determinant made is non negative, where m and n are relative primes, then the value of n-m is

For let h(x)={1/q if x=p/q and 0 if x is irrational where p & q > 0 are relatively prime integers 0 then which one does not hold good?

A sum of money is rounded off to the nearest rupee, if ((m)/(n))^2 be the probability that the round off error is atleast ten paise, where m and n are positive relative primes, then value of (n-m) is

Let lambda be the greatest integer for which 5p^(2)-16,2plambda,lambda^(2) are jdistinct consecutive terms of an AP, where p in R . If the common difference of the Ap is ((m)/(n)),n in N and m ,n are relative prime, the value of m+n is

If each of the observation x_(1), x_(2), ...,x_(n) is increased by 'a', where a is a negative or positive number, show that the variance remains unchanged.

Let a,b,c,d be positive real numbers with altbltcltd . Given that a,b,c,d are the first four terms of an AP and a,b,d are in GP. The value of (ad)/(bc) is (p)/(q) , where p and q are prime numbers, then the value of q is

Let A and B be two sets such that n(A) =3 and n(B) =2. If (x, 1), (y, 2), (z,1) are in A xx B, find A and B, where x, y and z are distinct elements.

If D ,Ea n dF are three points on the sides B C ,C Aa n dA B , respectively, of a triangle A B C such that AD,BE and CF are concurrent, then show that (B D)/(C D),(C E)/(A E),(A F)/(B F)=-1

Use the principle of mathematical induction : A sequence d_1,d_2,d_3,……… is defined by letting d_1= 2 and d_k = (d_k - 1)/(k) , for all natural numbers, k gt= 2 . Show that d_n = (2)/(n!) , for all n in N