Statement I: In any right angled triangle `(a^(2)+b^(2)+c^(2))/(R^(2))` is always equal to 8.
Statement II: `a ^(2)=b^(2) +c^(2)`

Prove that, in any triangle ABC, cos C=(a^2+b^2-c^2)/(2ab) .

Statement I: If in a triangle ABC, sin ^(2) A+sin ^(2)B+sin ^(2)C=2, then one of the angles must be 90^(@). Statement II: In any triangle ABC cos 2A+ cos 2B+cos 2C=-1-4 cos A cos B cos C

Statement I In a DeltaABC, sum (cos ^(2)""(A)/(2))/(a ) has the value equal to (s^(2))/(abc). Statement II in a Delta ABC, cos ""A/2=sqrt(((s-b)(s-c))/(bc)) cos ""(beta)/(2)=sqrt(((s-a) (s-c))/(ac)), cos ""c/2= sqrt(((s-a)(s-b))/(ab))

In any triangle ABC, prove that : (b^2-c^2)/(a^2)= sin (B -C)/sin(B+C) .

Statement I In any triangle ABC a cos A+b cos B+c cos C le s. Statement II In any triangle ABC sin ((A)/(2))sin ((B)/(2))sin ((C)/(2))le 1/8

Statement I In any triangle ABC, the square of the length of the bisector AD is bc(1-(a^(2))/((b+c)^(2))). Statement II In any triangle ABC length of bisector AD is (2bc)/((b+c))cos ((A)/(2)).

Statement I If a, b,c, in R and not all equal, then sec theta=((bc+ca+ab))/((a^(2)+b^(2)+c^(2))) , Statement II sec theta le -1 and sec theta ge 1

Prove that, in any triangle ABC, cos B=(c^2+a^2-b^2)/(2ca) .

All the notations used in statemnt I and statement II are usual. Statement I: In triangle ABC, if (cos A)/(a )=(cos B)/(b)=(cos C)/(c). then value of (r_(1)+r_(2)+r_(3))/(r) is equal to 9. Statement II: In Delta ABC:(a)/(sin A) =(b)/(sin B) =(c)/(sin C)=2R, where R is circumradius.

If a, b are non-zero vectors such that |a+b|=|a-2b| , then Statement-I Least value of a*b+(4)/(|b|^(2)+2) is 2sqrt(2)-1 . Statement-II The expression a*b+(4)/(|b|^(2)+2) is least when magnitude of b is sqrt(2tan((pi)/(8))) .