If O is the origin anf `A_(n)` is the point with coordinates `(n,n+1)` then `(OA_(1))^(2)+(OA_(2))^(2)+…..+(OA_(7))^(2)` is equal to

If the line y=3x meets the lines x=1,x=2……….,x=12 at points A_(1),A_(2)…….A_(12) respectively then (OA_(1))^(2),+(OA_(1))^(2)+....+(OA_(12))^(2) is equal to "___________".

If A_(1),A_(2)......A_(n) are points on the line y=x lying in the positive quadrant such that OA_(n)=n.OA_(n-1),O being the origin.If OA_(1)=1 then the co-ordinates of A_(8) are (3a sqrt(2),3a sqrt(2),) where a is equal to

The co-ordinates of a point A_(n) is (n,n,sqrtn) where n in N, If O(0,0) then sum_(i=1)^(12) (OA_(i))^(2) equals "_________".

If O is the origin and the coordinates of A and B are (51, 65) and (75, 81), respectively. Then OA xx OB cos angle AOB is equal to

For every interger n, a line L_(n) is drawn through the point P_(n)(n, n+1) perpendicular to the line x-y+1=0 meeting x-axis at A_(n) and y-axis at B_(n) . If O is the origin then sum_(n=0)^(10)(OA_(n)+OB_(n)) is equal to

If O be origin and A is a point on the locus y^(2)=8x .find the locus of the middle point of OA

Let A (a,b) be a fixed point and O be the origin of coordionates. If A_(1) is the mid-point of OA, A_(2) is the mid- poind of A A_(1),A_(3) is the mid-point of A A_(2) and so on. Then the coordinates of A_(n) are

The line x+y=1 meets X-axis at A and Y-axis at B,P is the mid-point of AB,P_(1) is the foot of perpendicular from P to OA, M_(1) is that of P_(1) from OP,P_(2) is that of M_(1) from OA,M_(2) is that of P_(2) from OP,P_(3) is that of M_(2) from OA and so on. If P_(n) denotes theb nth foot of the perpendicular on OA, then find OP_(n) .