# I need to find 5 or more ordered pairs (x,y)

In which xy = x + y

like (0,0) and (2,2)

0,0
2,2
1/2,-1
-1,1/2

i need one more

How about two different x's and y''s?

(2,3) = 1,5)

this is the problem: xy= x+y
or the product of xy equals the sum of x and y.

example: x= .5 and y= -1

where x times y equals -0.5 and x plus y also equals -0.5.

i need one more example so far I have:

(0,0)
(2,2)
(1/2,-1)
(-1,1/2)

xy= x+y ---->

xy - x = y --->

x(y-1) = y ---->

x = y/(y-1)

Take e.g. y = 9/10 ---> x = -9

## To find another ordered pair (x, y) that satisfies the equation xy = x + y, we can substitute different values for y and solve for the corresponding x value.

Let's take y = 3/4 as an example:

xy = x + y

x(3/4) = x + (3/4)

3x/4 = x + 3/4

Now, we can multiply both sides of the equation by 4 to eliminate the fraction:

3x = 4x + 3

Subtract 4x from both sides:

3x - 4x = 3

-x = 3

Divide both sides by -1:

x = -3

So, when y = 3/4, x = -3. Therefore, the ordered pair (x, y) = (-3, 3/4) satisfies the equation xy = x + y.