If `r_(2) +r_(3)+ r = r_(1),` then show that `Delta` is right angled.

If in a triangle r_(1) = r_(2) + r_(3) + r , prove that the triangle is right angled

If 8R^(2)=a^(2) +b^(2) +c^(2). then prove that the Delta is right angled.

In a triangle, if r_(1) gt r_(2) gt r_(3), then show a gtb gt c.

If in a triangle (1-(r_1)/(r_2))(1-(r_1)/(r_3))=2 then the triangle is right angled (b) isosceles equilateral (d) none of these

In a Delta ABC if (R )/(r ) le 2 , then show that the triangle is equilateral.

Statement I In a Delta ABC, if a lt b lt c and r is inradius and r_(1) , r_(2) , r_(3) are the exradii opposite to angle A,B,C respectively, then r lt r_(1) lt r_(2) lt r_(3). Statement II For, DeltaABC r_(1)r_(2)+r_(2)r_(3)+r_(3)r_(1)=(r_(1)r_(2)r_(3))/(r)

In triangle ABC, if r_(1) = 2r_(2) = 3r_(3) , then a : b is equal to

The three sides of a triangle are L_(r) + x cos theta_(r) + y sin theta _(r) - p_(r) = 0 where r = 1,2,3 . Show that the orthocentre is given by L_(1) cos (theta_(2)-theta_(3)) = L_(2)cos (theta_(3)-theta_(1)) = L_(3)cos (theta_(1)-theta_(2)) .

If r_(1),r_(2) and r_(3) are the position vectors of three collinear points and scalars l and m exists such that r_(3)=lr_(1)+mr_(2) , then show that l+m=1 .

The combined resistance of two resistors R_1 and R_@ (R_1,R_2>0) is given by 1/R= 1/R_1 + 1/R_2 . If R_1 + R_2 =C (a constant), show that maximum resistance R is obtained by choosing R_1 = R_2