Write the expression for the difference of x and y is divided by 4, where x is greater than y'.

Divide x - 2 y by y, where y in 0.

The remainder when x^4-y^4 is divided by x-y is :

If x , y , z are three positive integers such that x is greater than y a n d y is geater than z then which of the following is definitely true? (a).x % of y is greater than y % of z (b).y % of x is greater than z % of y (c)z % of x is greater than y % of z (d)All of these

[m] is defined as the greatest integer less than m [m] is defined as the least integer greater than m. f(x, y)={x}+[y] g(x. Y)=[x]-{y} F(f(x, y))={f(x, y)}=[g(x, y)] G(g(x, y))=[f(x, y)]-{g(x, y)} Given that x^(2)=4 and y^(2)=9 and |F(f(x, y))|=|G(g(x, y))| then find the value of x+y :

If x and y are two distinct positive integers, then mean of x and y is always greater than______

[m] is defined as the greatest integer less than m [m] is defined as the least integer greater than m. f(x, y)={x}+[y] g(x. Y)=[x]-{y} F(f(x, y))={f(x, y)}=[g(x, y)] G(g(x, y))=[f(x, y)]-{g(x, y)} If x and y are consecutive integers, then find g(x, y)

a and b are any number and x and y are any non negative integers. f(a)= the greatest integer less than or equal to a g(a)= the smallest integer greater than or equal to a r(x, y)= the remainder when x is dividied by y. r(x, y) with both x and y not equal to zero is equal to :