Let ` vec O A- vec a , hat O B=10 vec a+2 vec ba n d vec O C= vec b ,w h e r eO ,Aa n dC` are non-collinear points. Let `p` denotes the areaof quadrilateral `O A C B ,` and let `q` denote the area of parallelogram with `O Aa n dO C` as adjacent sides. If `p=k q ,` then find`kdot`

Let vec O A- vec a , vec O B=10 vec a+2 vec ba n d vec O C= vec b ,w h e r eO ,Aa n dC are non-collinear points. Let p denotes the areaof quadrilateral O A C B , and let q denote the area of parallelogram with O Aa n dO C as adjacent sides. If p=k q , then find kdot

Let vec O A= vec a , vec O B=10 vec a+2 vec ba n d vec O C= vec b ,w h e r eO ,Aa n dC are non-collinear points. Let p denotes the areaof quadrilateral O A C B , and let q denote the area of parallelogram with O Aa n dO C as adjacent sides. If p=k q , then find kdot

vec OA-vec a,widehat OB=10vec a+2vec b and vec OC=vec b, where O,A and C are non-collinear points.Let p denotes the areaof quadrilateral OACB, and let q denote the area of parallelogram with OA and OC as adjacent sides.If p=kq, then find k.

Let vec(OA)= vec(a), vec(OB)= 10vec(a) + 2vec(b), vec(OC )= vec(b) where O, A, C are non-collinear points. Let lamda denote the area of the quadrilateral OABC and let mu denote the area of parallelogram with vec(OA) and vec(OC) as ajacent sides show that lamda= 6mu

Let vec O A= vec a , vec O B=10 vec a+2 vec b ,a n d vec O C=bw h e r eO is origin. Let p denote the area of th quadrilateral O A B Ca n dq denote the area of teh parallelogram with O Aa n dO C as adjacent sides. Prove that p=6qdot

Let overset(to)(OA) = overset(to)(a), vec(OB)= 10vec(a) + 2vec(b) " and " overset(to)(OC)=overset(to)(b) where O,A and C are non-collinear points . Let P denotes the area of the quadrilateral OABC and let q denots the area of the parallelogram with OA and OC as adjacent sides. If p =kq , then k=........

vec(OA)= vec(a), vec(OB)= 10vec(a) + 2vec(b), vec(OC)= vec(b) where O, A, C are non-collinear points. Let 'p' denote area of quadrilateral OABC, 'q' denote area of parallelogram with OA, OC as adjacent sides, then (p)/(q) =

vec OA=vec a,vec OB=10vec a+2vec b, and vec OC=b where O is origin.Let p denote the area of th quadrilateral OABC and q denote the area of teh parallelogram with OA and OC as adjacent sides.Prove that p=6q.

Let vec(OA)=vec(a),vec(OB)=10vec(a)+2vec(b) and vec(OC)=vec(b) where O is origin. Let P denotes the area of the quadrilateral OABC and q denote the area of the parallelogram with OA and OC as adjacent side. Prove that P = 6q.