If `y!=0` then the number of values of the pair "(x,y)" such that `x+y+(x)/(v)=(1)/(2)` and "`(x+y)(x)/(y)=-(1)/(2)` is

Similar Questions

Explore conceptually related problems

If y=0 then the number of values of the pair (x, y) such that x+y+x/y=1/2 and (x+y)x/y= -1/2 is:

If x and y are real then the number of ordered pairs (x,y) such that x+y+(x)/(y)=(1)/(2) and (x+y)(x)/(y)=-(1)/(2) is

Q) The number ofpositive integer pairs (x,y) such that (1)/(x)+(1)/(y)=(1)/(2007),x

" The number of pairs "(x,y)" such that "cos x sin y=1,0<=x,y<=2 pi" is "

Number of ordered pair (x, y) satisfying x^(2)+1=y and y^(2)+1=x is

(xy)/(x-y)=(1)/(2);(xy)/(x+y)=(1)/(5) wherex +y!=0;x-y!=0

The number of ordered pair(s) (x,y) which satisfy y=tan^(-1)tan x and 16(x^(2)+y^(2))-48 pi x+16 pi y+31 pi^(2)=0 is

If x - y= 0 and 2x - y = 2 , then values of x and y are