A = (2, 2), B = (6, 3), C(4, 1) are the vertices of a triangle. If D, E are the midpoints of BC, CA then DE =

If A(2, 2), B(6, 3) and C(4, 11) are vertices of a triangle ABC and D, E are the midpoints of bar(BC) and bar(CA) respectively, then the length of bar(DE) is

If A = (0, 0), B = (3, 0), C = (0, 4) are the vertices of a triangle then match the following {:("I. Centroid",(a)(1,1)),("II. Orthocentre",(b)(1,4//3)),("III. Circumcentre",(c)(0,0)),("IV. Incentre",(d)(4,5)),(,(e)(3//2,2)):}

A (3, 2, -1), B (4, 1, 1), C(6, 2, 5) are three points. If D, E, F are three points which divide BC, CA, AB respectively in the same ratio 2 : 1 then the centroid of Delta DEF is