Can a triangle be formed by line segment of lengths a,b and c, such that `a gt b-c`?

Can a triangle be formed by line segment of lengths a,b and c, such that a=b-c ?

The number of triangles that can be formed with the sides of lengths a,b and c where a,b,c are integers such that a<=b<=c is

If the centroid of the triangle formed by the points (a,b),(b,c) and (c,a) is at the origin, then find the value of a^(3)+b^(3)+c^(3).

If the centroid of the triangle formed by the points (a,b),(b,c) and (c,a) is at the origin,then a^(3)+b^(3)+c^(3)=abc(b)0(c)a+b+c(d)3abc

Taking any three of the line segments out of segments of length 2 cm, 3 cm, 5 cm and 6 cm, the number of triangles that can be formed is :

If in a right angle triangle,a and b are the length of the sides and and c is the length of the hypotenuse and c-b!=1,c+b!=1 then show that log_(c+b)(a)+log_(c-b)(a)=2log_(c+b)(a)log_(c-b)(a)

If the centroid of the triangle formed by points P(a,b),Q(b,c) and R(c,a) is at the origin, what is the value of a+b+c?

In Figure, A B C\ a n d\ ABD are two triangles on the base A Bdot If line segment C D is bisected by A B\ a t\ O , show that a r\ ( A B C)=a r\ (\ A B D)

If in a right angled triangle, a a n d b are the lengths of sides and c is the length of hypotenuse and c-b!=1, c+b!=1 , then show that (log)_("c"+"b")"a"+(log)_("c"-"b")"a"=2(log)_("c"+"b")adot(log)_("c"-"b")adot