X and Y are single digit natural number satisfying `X^(2)+Y^(3)=793` find X+Y

The number of distinct pairs (x,y) of the real number satisfying x=x^(3)+y^(4) and y=2xy is

The number of distinct pairs (x,y) of the real number satisfying x=x^(3)+y^(4)and y=2xy is :

The number of ordered pairs (x,y) of real number satisfying 4x^(2)-4x+2=sin^(2)y and x^(2)+y^(2)<=3 equal to

(x+2y-1)(x+3y-3)=1271 where x and y are the naturals numbers and (x+2y-1),(x+3y-3) are the prime numbers then the value of (y)/(x) is

If x^(y)=y^(x) where x and y are distinct natural numbers , then find x+y .

Let x and y be two 2-digit numbers such that y is obtained by recersing the digits of x. Suppose they also satisfy x^(2)-y^(2)=m^(2) for same positive integer m. The value of x + y + m is-

if a,b x,y are positive natural number such that (1)/(x)+(1)/(y)=1 then (a^(x))/(x)+(a^(y))/(y)=

Let [a] denotes the larger integer not exceeding the real number a if x and y satisfy the equations y=2[x]+3 and y=3[x-2[ simultaneously determine [x+y]