One of the diameter of a circle circumscribing the rectangle ABCD is `4y = x + 7`, If A and B are the points `(-3, 4)` and `(5, 4)` respectively, then the area of rectangle is

One of the diameters of the circle circumscribing the rectangle ABCD is 4y = x + 7. If A and B are the points (-3, 4) and (5, 4) respectively, then find the area of the rectangle.

Column I|Column II The length of the common chord of two circles of radii 3 units and 4 units which intersect orthogonally is k/5 . Then k is equal to|p. 1 The circumference of the circle x^2+y^2+4x+12 y+p=0 is bisected by the circle x^2+y^2-2x+8y-q=0. Then p+q is equal to|q. 24 The number of distinct chords of the circle 2x(x-sqrt(2))+y(2y-1)=0 , where the chords are passing through the point (sqrt(2),1/2) and are bisected on the x-axis, is|r. 32 One of the diameters of the circle circumscribing the rectangle A B C D is 4y=x+7. If Aa n dB are the poinst (-3,4) and (5, 4), respectively, then the area of the rectangle is|s. 36

One diameter of the circle circumscribing the rectangle ABCD is 4y= x+7 . If A and B are the points (-3,4) and (5,4) respectively , then

One of the diameters of the circle circumscribing the rectangle ABCD is 4y=x+y . If A and B are the points (-3, 4) and (5, 4) respectively, find the area of the rectangle and equation of the circle.

One of the diameters of the circle circumscribing the rectangle ABCD is 4y=x+y . If A and B are the points (-3, 4) and (5, 4) respectively, find the area of the rectangle and equation of the circle.

One of the diameters of circle circumscribing the rectangle ABCD is 4y=x+7 . If A and B are the points (-3,4) and (5,4) respectively and area of rectangle is p then p/4 is equal to

One of the diameters of circle circumscribing the rectangle ABCD is 4y=x+7 . If A and B are the points (-3,4) and (5,4) respectively and area of rectangle is p then p/4 is equal to

One of the diameters of the circle circumscribing the rectangle ABCD is 4y = x + 7. If A and B are (-3, 4), (5, 4) then find the area of the rectangle.

One of the diameters of the circle circumscribing the rectangle ABCD is 4y=x+7 . If A and B are the points (-3, 4) and (5, 4) and slope of the curve y = (ax)/(b-x) at point (1, 1) be 2 , then centre of circle is : (A) (a, b) (B) (b, a) (C) (-a, -b ) (D) (a, -b)

2x-y+4=0 is a diameter of a circle which circumscribes a rectangle ABCD. If the coordinates of A, B are (4, 6) and (1, 9) respectively, find the area of this rectangle ABCD.