The line `x+y=p` meets the x- and y-axes at `Aa n dB` , respectively. A triangle `A P Q` is inscribed in triangle `O A B ,O` being the origin, with right angle at `QdotP` and `Q` lie, respectively, on `O Ba n dA B` . If the area of triangle `A P Q` is `3/8t h` of the are of triangle `O A B ,` the `(A Q)/(B Q)` is equal to (a)`2 `(b) `2/3` (c) `1/3` (d)` 3`

The line x+y=p meets the x- and y-axes at Aa n dB , respectively. A triangle A P Q is inscribed in triangle O A B ,O being the origin, with right angle at QdotP and Q lie, respectively, on O Ba n dA B . If the area of triangle A P Q is 3/8t h of the are of triangle O A B , the (A Q)/(B Q) is equal to 2 (b) 2/3 (c) 1/3 (d) 3

(1)A triangle formed by the lines x+y=0 , x-y=0 and lx+my=1. If land m vary subject to the condition l^2+m^2=1 then the locus of the circumcentre of triangle is: (2)The line x +y= p meets the x-axis and y-axis at A and B, respectively. A triangle APQ is inscribed in triangle OAB, O being the origin, with right angle at Q. P and Q lie, respectively, on OB and AB. If the area of triangle APQ is 3/8th of the area of triangle OAB, then (AQ)/(BQ) is: equal to

The line x + y = p meets the axis of x and y at A and B respectively. A triangle APQ is inscribed in the triangle OAB, O being the origin, with right angle at Q, P and Q lie respectively on OB and AB. If the area of the triangle APQ is 3//8^(th) of the area of the triangle OAB, then (AQ)/(BQ) is equal to

The line x+y=a meets the axes of x and y at A and B respectively. A triangle AMN is inscribed in the triangle OAB , O being the origin, with right angle at N, M and N lie respectively on OB and AB. If the area of the triangle AMN is 3/8 of the area of the triangle OAB , then (AN)/(BM) is equal to:

The line x+y=p meets the x-and y-axes at A and B, respectively. A triangle APQ is inscribed in triangle OAB, O being with right at Q.P and Q lie, respectivley, on OB and AB. If the area of triangle APQ is 3//8 th of the area of triangle OAB, then AQ/BQ is equal to

The line L_1-=4x+3y-12=0 intersects the x-and y-axies at Aa n dB , respectively. A variable line perpendicular to L_1 intersects the x- and the y-axis at P and Q , respectively. Then the locus of the circumcenter of triangle A B Q is

O P Q R is a square and M ,N are the midpoints of the sides P Q and Q R , respectively. If the ratio of the area of the square to that of triangle O M N is lambda:6, then lambda/4 is equal to (a)2 (b) 4 (c) 2 (d) 16

A line meets the axes at P and Q such that the centroid of the triangle O P Q is (h, h) . The equation of the line P Q is

O P Q R is a square and M ,N are the midpoints of the sides P Q and Q R , respectively. If the ratio of the area of the square to that of triangle O M N is lambda:6, then lambda/4 is equal to 2 (b) 4 (c) 2 (d) 16