In ` A B C ,` let `L ,M ,N` be the feet of the altitudes. The prove that `sin(/_M L N)+sin(/_L M N)+sin(/_M N L)=4sinAsinBsinC`

If a, b, c, l,m are in A.P, then the value of a-4b + 6c -4l +m is.

If cot theta (1 + sin theta ) = 4m and cot theta (1 - sin theta ) = 4n, prove that (m^(2) - n^(2))^(2) = mn.

Determine whether the given points are collinear. L(1,2), M(5, 3), N(8, 6)

Determine whether the points are collinear. L(-2,3), M(1,-3), N(5,4)

A B C is a right-angled triangle in which /_B=90^0 and B C=adot If n points L_1, L_2, ,L_nonA B is divided in n+1 equal parts and L_1M_1, L_2M_2, ,L_n M_n are line segments parallel to B Ca n dM_1, M_2, ,M_n are on A C , then the sum of the lengths of L_1M_1, L_2M_2, ,L_n M_n is (a(n+1))/2 b. (a(n-1))/2 c. (a n)/2 d. none of these

Let m divides n . Then G.C.D and L.C.M. of m,n are …… and …….