Prove that `2R cos A = 2R + r - r_(1)`

Prove that r_(1) r_(2) + r_(2) r_(3) + r_(3) r_(1) = (1)/(4) (a + b + c)^(2)

If I is the incenter of Delta ABC and R_(1), R_(2), and R_(3) are, respectively, the radii of the circumcircle of the triangle IBC, ICA, and IAB, then prove that R_(1) R_(2) R_(3) = 2r R^(2)

Prove that cos A+cos B+cos C=1+(r)/(R)

Prove that cos A+cos B+cos C=1+(r)/(R)

Prove that if two bubbles of radii r_(1) and r_(2)(r_(1)ltr_(2)) come in contact with each other then the radius of curvature of the common surface r=(r_(1)r_(2))/(r_(2)-r_(1))

Prove that if two bubbles of radii r_(1) and r_(2) coalesce isothermally in vacuum then the radius of new bubble will be r=sqrt(r_(1)^(2)+r_(2)^(2))

Prove the questions a(r r_(1) + r_(2)r_(3)) = b(r r_(2) + r_(3) r_(1)) = c (r r_(3) + r_(1) r_(2))

Prove the questions cos A + cos B + cos C = 1 + (r )/(R )

If t_r is the rth term is the expansion of (1+a)^n , in ascending power of a , prove that r (r +1) t_(r+2) = (n - r + 1) (n - r) a^2 t_r

DEF is the triangle formed by joining the points of contact of the incircle with the sides of the triangle ABC : prove that its sides are 2r cos (A)/(2), 2r cos (B)/(2)," and " 2r cos (C )/(2) .