Let `alt=blt=c` be the lengths of the sides of a triangle. If `a^2+b^2

Let a<=b<=c be the lengths of the sides of a triangle.If a^(2)+b^(2)

If a, b,c are the lengths of the sides of triangle , then

Let a,b,c be the lengths of the sides of a triangle (no two of them are equal) and k in R .If the roots of the equation x^(2)+2(a+b+c)x+6k(ab+bc+ac)=0 are real,then:

Let a,b,c be the lengths of three sides of a triangle satistying the condition (a^(2)+b^(2))x^(2)-2b(a+c)x+(b^(2)+c^(2))=0 .If the set of all possible values of x is the interval (alpha,beta) ,then 12(alpha^(2)+beta^(2)) is equal to:

Let a,b,c denote the lengths of the sides of a triangle such that ( a-b) vecu + ( b-c) vecv + ( c-a) (vecu xx vecv) = vec0 For any two non-collinear vectors vecu and vecu ,then the triangle is

The product of the arithmetic mean of the lengths of the sides of a triangle and harmonic mean of the lengths of the altitudes of the triangle is equal to: a. 1 b. 2 c. 3 d. 4

Using vectors: Prove that if a,b,care the lengths of three sides of a triangle then its area Delta is given by Delta=sqrt(s(s-a)(s-b)(s-c)) where 2s=a+b+c

If a,b,c are the lengths of the sides of a triangle,then the range of (ab+bc+ca)/(a^(2)+b^(2)+c^(2))