If all the vertices of a triangle have integral coordinates, then the triangle may be (a) right-angled (b) equilateral (c) isosceles (d) none of these

If the vertices of a triangle have rational coordinates, then prove that the triangle cannot be equilateral.

What is the minimum area of a triangle with integral vertices ?

If in a triangle (1-(r_1)/(r_2))(1-(r_1)/(r_3))=2 then the triangle is right angled (b) isosceles equilateral (d) none of these

If sinA=sin^2Ba n d2cos^2A=3cos^2B then the triangle A B C is right angled (b) obtuse angled (c)isosceles (d) equilateral

The three points (-2,2)(9,-2),a n d(-4,-3) are the vertices of (a) an isosceles triangle (b) an equilateral triangle (c) a right-angled triangle (d) none of these

The points (0,8/3),(1,3) , and (82 ,30) are the vertices of (A) an obtuse-angled triangle (B) an acute-angled triangle (C) a right-angled triangle (D) none of these

If cos^2A+cos^2B+cos^2C=1,t h e n A B C is (a)equilateral (b) isosceles (c)right angles (d) none of these

In triangle ABC if 2sin^(2)C=2+cos2A+cos2B , then prove that triangle is right angled.

Can all the three sides of a right angled triangle be odd numbers ? Why ?

Let S be the set of all triangles in the xy-plane, each having one vertex at the origin and the other two vertices lie on coordinate axes with integral coordinates. If each triangle in S has area 50 eq. units, then the number of elements in the set S is