If `8^(x^y)=4096` where x and y are positve integers and `x ne 1` , then show that either `x=y or x gt y`.

If x^yxxy^x=800 , then find x-y (where x and y are positive integers and xgt y ).

If x^yxxy^x=256 ,then find y^2-x^2 where x and y are positive integers and x lt y ).

If (x-1)^2+(y-2)^2=0 , where x and y are integers, then the value of 2x+3y is :

Consider the following statements I. If x and y are composite integers, so x + y is also composite. II. If x and y are composite integers and x gt y, then x - y is also a composite integer. III. If x and y are composite integers, so also is xy. Of the above, the correct statement is/are

If x^yxxy^x=72 , then find the sum of x and y where x and y are positive integers (x ne 1 and y ne 1) .

Let m and n bwe positive integers and x,y gt 0 and x+y =k, where k is constnat. Let f (x,y) = x ^(m)y ^(n), then: