How many integers `x` in `{1,2,3....99,100}` are there such that `x^(2)+x^(3)` is the square of an integer?

If two positive integers a and b are expressible as a = x^(3) y and b = x^(2) y^(3) x and y being prime numbers, then HCF (a, b) is ..........

How many points having integer co-ordinates are there in the feasible region of the inequality 3x+4y le 12, x ge 0" and "y ge 1 ?

If n is an odd integer but not a multiple of 3, then prove that xy(x+y)(x^(2)+y^(2)+xy) is a factor of (x+y)^(n)-x^(n)-y^(n).

Match roster forms with the set builder form. (i) {p,r,I,n,c,a,l} (a) {x : x is a positive integer and is a divisor of 18} (ii) {0} (b) {x : x is an integer and x^(2)-9=0} (iii) {1,2,3,6,9,18} (c) {x : x is an integer and x+1=1} (iv) {3,-3} (d) {x : x is a letter of the word PRINCIPAL}

Match each of the set on the left described in the roster form with the same set on the right described in the set-builder form : (i) {P, R, I, N, C, A, L} (a) { x : x is a positive integer and is a divisor of 18} (ii) { 0 } (b) { x : x is an integer and x^(2) – 9 = 0 } (iii) {1, 2, 3, 6, 9, 18} (c) {x : x is an integer and x + 1= 1 } (iv) {3, –3} (d) {x : x is a letter of the word PRINCIPAL}

How many real numbers x satisfy the equation 3^(2x+2)-3^(x+3)-3^(x)+3 = 0 ?

If f(x) = (x)/(1+(log x)(log x)....oo), AA x in [1, 3] is non-differentiable at x = k. Then, the value of [k^(2)] , is (where [*] denotes greatest integer function).

Solve 24x lt 100 , when (i) x is a natural number, (ii) x is an integer.

An equilateral triangle has each side equal to a. If the coordinates of its vertices are (x_(1), y_(1)), (x_(2), y_(2)) and (x_(3), y_(3)) then the square of the determinant |(x_(1),y_(1),1),(x_(2),y_(2),1),(x_(3),y_(3),1)| equals

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