Find the value of the determinant `|(bc,ca, ab),( p, q, r),(1, 1, 1)|,`where `a ,b ,a n d` c are respectively, the pth, qth, and rth terms of a harmonic progression.

The value of the determinant {:abs((1,a,b+c),(1,b,c+a),(1 , c,a+b)):} is

The value of |(1,1,1),(bc,ca,ab),(b+c,c+a,a+b)|

Evaluate Delta = {:|(1,a,bc),( 1,b,ca),(1,c,ab)|:}

Using properties of determinants prove that : |(1+a,1,1),( 1,1+b,1),(1,1,1+c)| =abc +bc +ca +ab

Evaluate Delta -|(1,a,bc),(1,b,ca),(1,c,ab)|

Find the value of lamda so that the points P, Q, R and S on the sides OA, OB, OC and AB, respectively, of a regular tetrahedron OABC are coplanar. It is given that (OP)/(OA) = (1)/(3), (OQ)/(OB) = (1)/(2), (OR)/(OC) = (1)/(3) and (OS)/(AB)= lamda .

T_p,T_q,T_r are the pth , qth and rth terms of an A.P., then |(T_p,T_q,T_r),(p,q,r),(1,1,1)| equals :

Find he value of sum_(r=1)^(4n+7)\ i^r where, i=sqrt(- 1).

The sum of the first three terms of an A.P is 33 . If the product of the first terms and third term exceeds the 2nd term by 29 then find the A.P . The pth qth and rth term of an A.P . Are a b and c respectively . Prove that a (q-r)+ b(r-P)+c(p-q)=0

If a, b, c are the pth, qth and rth terms of an H.P., then the lines bcx+py+1=0, cax+qy+1=0 and abx+ry+1=0 :