The number of integral points on the hyperbola `x^2-y^2= (2000)^2` is (an integral point is a point both of whose co-ordinates are integer) (A) 98 (B) 96 (C) 48 (D) 24

The number of rational points on the circle x^(2)+(y-sqrt(3))^(2)=4 must belRational points are points whose both co-ordinates are rationall

Prove that all the vertices of an equilateral triangle can not be integral points (an integral point is a point both of whose coordinates are integers).

Prove that all the vertices of an equilateral triangle can not be integral points (an integral point is a point both of whose coordinates are integers).

Let f(r) be the number of integral points inside a circle of radius r and centre at origin (integral point is a point both of whose coordinates are integers),then lim_(r rarr oo)(f(r))/(pi r^(2)) is equal to

The number of integral points inside the triangle made by the line 3x+4y-12=0 with the coordinate axes which are equidistant from at least two sides is/are (an integral point is a point both of whose coordinates are integers.) (d) 4(c)3(a)1 (b) 2

The number of integral point inside the triangle made by the line 3x + 4y - 12 =0 with the coordinate axes which are equidistant from at least two sides is/are : ( an integral point is a point both of whose coordinates are integers. )

The number of integral point inside the triangle made by the line 3x + 4y - 12 =0 with the coordinate axes which are equidistant from at least two sides is/are : ( an integral point is a point both of whose coordinates are integers. )

The number of integral points (integral point means both the coordinates should be integers )exactly in the interior of the triangle withvertice(0,0), (0,21) and (21,0) is

The number of integral points (integral point means both the coordinates should be integer) exactly in the interior of the triangle with vertices (0,0), (0,21) and (21,0) is