If x and y satisfy the equations `max(|x+y|,|x-y|)=1 and |y|=x-[x]`, the number of ordered paris (x, y).

Find the area enclosed by the curves max(|x+y|,|x-y|)=1

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]

The system of equations x+2y=3,2x-3y=5 and x -12y =1 has

The equation x+2y=3,y-2x=1 and 7x-6y+a=0 are consistent for

If x,y in R and satisfy the equation xy(x^(2)-y^(2))=x^(2)+y^(2) where xne0 then the minimum possible value of x^(2)+y^(2) is

If x_(1),x_(2) "and" y_(1),y_(2) are the roots of the equations 3x^(2) -18x+9=0 "and" y^(2)-4y+2=0 the value of the determinant |{:(x_(1)x_(2),y_(1)y_(2),1),(x_(1)+x_(2),y_(1)+y_(2),2),(sin(pix_(1)x_(2)),cos (pi//2y_(1)y_(2)),1):}| is

Find all number of pairs x,y that satisfy the equation tan^(4) x + tan^(4)y+2 cot^(2)x * cot^(2) y=3+ sin^(2)(x+y) .

The curve satisfying the equation (dy)/(dx)=(y(x+y^3))/(x(y^3-x)) and passing through the point (4,-2) is

Let f(x) be a real valued function satisfying the relation f(x/y) = f(x) - f(y) and lim_(x rarr 0) f(1+x)/x = 3. The area bounded by the curve y = f(x), y-axis and the line y = 3 is equal to

If the distance of any point (x,y) from origin is defined as d(x,y)=max{|x|,|y|} , then the locus of the point (x,y) where d(x,y)=1 is