The exradii `r_1,r_2` and `r_3` of ` A B C` are in H.P. Show that its sides `a , ba n dc` are in `AdotPdot`

In a A B C , if tan(A/2),tan(B/2),tan(C/2) are in AP, then show that cosA ,cosB ,cosC are in AdotPdot

R is relation in N xxN as (a,b) R (c,d) hArr ad = bc . Show that R is an equivalence relation.

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.

If in a triangle of base 'a', the ratio of the other two sides is r ( <1).Show that the altitude of the triangle is less than or equal to (ar)/(1-r^2)

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

A plane meets the coordinate axes in A ,B ,C such that eh centroid of triangle A B C is the point (p ,q ,r)dot Show that the equation of the plane is x/p+y/q+z/r=3.

Let A = {1, 2, 3} and R = {(a,b): a,b in A, a divides b and b divides a}. Show that R is an identity relation on A.

Six resistances each of v ale r= 6Omega are connected between points A,B and C as shown in the figure if R_(1),R_(2) and R_(3) are the net resistances between A and B, between B and C and between A and C respectively, the R_(1):R_(2):R_(3) will be equal to

if (m+1)th, (n+1)th and (r+1)th term of an AP are in GP.and m, n and r in HP. . find the ratio of first term of A.P to its common difference

Show that the point P(a, b + c), Q(b, c +a) and R(c, a + b) are collinear.