Let `C` be any circle with centre `(0,sqrt(2))dot` Prove that at most two rational points can be there on `Cdot` (A rational point is a point both of whose coordinates are rational numbers)

Let C be any circle with centre ( 0, sqrt( 2)) . Prove that at most two rational points can be there on C. ( A rational point is a point both of whose coordinates are rational numbers . )

Let C be any circle with centre (0,sqrt(2)) . Prove that at most two rational points can be there on C. (A rational point is a point both of whose cordinates are rational numbers)

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 sqrt(2) is not a rational number.

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

Write any two irrational numbers whose product is rational number.

Can -2 be the absolute value of any rational number?

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. )

Write any two rational numbers between 0.5 and 0.6.