Let C = A + B.

Let A = (a,b,c),B= (b,d,e) and C = (e,f,g) , verify that : (A uu B ) uu C = A uu ( Buu C )

Let A , B , C be the three angles such that A+B+C=pi . If T a nAtanB=2, then find the value of (cos(A-B))/(cosC)

Let A = (a,b,c),B= (b,d,e) and C = (e,f,g) , verify that : ( A nn B ) nn C = A nn (B nn C )

Let A , B , C be the three angles such that A+B+C=pi . If tanA.tanB=2, then find the value of (cosAcosB)/(cosC)

Let A = { a,b,c,d} = B ={b,c,e) and C = (d,e,f) Verify that : (A uu B ) uu C = A uu (B uu C )

Let a , b , c , d be positive integers such that (log)_a b=3/2a n d(log)_c d=5/4dot If (a-c)=9, then find the value of (b-d)dot

A B C is a right triangle right-angled at C . Let B C=a ,\ \ C A=b ,\ \ A B=c and let p be the length of perpendicular from C on A B , prove that (i) c p=a b

Let vec(C )= vec(A)+vec(B) then

Let a = {a, b, c} and R = {(a, a), (b, b), (c, c), (b, c), (a, b)} be a relation on A, then the

P is a point (a, b, c). Let A, B, C be images of Pin y-z, z-x and x-y planes respectively, then the equation of the plane ABC is