There exists some positive integer x such that `sqrt(x)inR` .

Let n be a positive integer such that sin(pi/(2n))+cos(pi/(2n))=(sqrt(n))/2 Then

The number of positive integers with the property that they cann be expressed as the sum of the cubes of 2 positive integers in two different ways is

The least positive integer n for which ((1+i)/(1-i))^n= 2/pi sin^-1 ((1+x^2)/(2x)) , where x> 0 and i=sqrt-1 is

If x and y are positive integers such that, xy+x+y=71,x^2 y+xy^2=880, then x^2+y^2=

lim_(x->0) (sin(nx)((a-n)nx – tanx))/x^2= 0 , when n is a non-zero positive integer, then a is equal to

Let x_(1),x_(2),x_(3), . . .,x_(k) be the divisors of positive integer 'n' (including 1 and x). If x_(1)+x_(2)+ . . .+x_(k)=75 , then sum_(r=1)^(k)(1)/(x_(i)) is equal to

Write the set {x : x is a positive integer and x^(2) < 40 } in the roster form.

Verify (i) x ^(3) + y ^(3) = (x + y) (x ^(2) -xy + y ^(2)) (ii) x ^(3) -y ^(3) = (x-y) (x ^(2) +xy +y ^(2)) using some non-zone positive integers and check by actual multiplication. Can you call these as identities ?

The least positive integer n for which ((1+i)/(1-i))^(n)=(2)/(pi)(sec^(-1)""(1)/(x)+sin^(-1)x) (where, Xne0,-1leXle1andi=sqrt(-1), is

If alpha be the smallest positive root of the equation sqrt(sin(1-x))=sqrt(cos x) , then the approximate integral value of alpha must be .