Two sides of a rhombus OABC (lying in the first or third quadrant) of area equal to 2 sq. units are `y=x//sqrt(3), y=sqrt(3)x.` Then the possible coordinates of B is are (O being the origin)

Two sides of a rhombus OABC ( lying entirely in first quadrant or fourth quadrant) of area equal to 2 sq. units, are y =x/sqrt(3), y=sqrt(3)x Then possible coordinates of B is/are (O being the origin).

Two sides of a rhombus OABC ( lying entirely in first quadrant or fourth quadrant) of area equal to 2 sq. units, are y =x/sqrt(3), y=sqrt(3)x Then possible coordinates of B is / are ('O' being the origin)

Two sides of a rhombus lying in the first quadrant are given by 3x-4y=0 and 12 x-5y=0 . If the length of the longer diagonal is 12, then find the equations of the other two sides of the rhombus.

Two sides of a rhombus lying in the first quadrant are given by 3x-4y=0a n d12 x-5y=0 . If the length of the longer diagonal is 12, then find the equations of the other two sides of the rhombus.

The equations of two sides of a square whose area is 25 sq.units are 3-4y=0 and 4x+3y=0. The equation of the other two sides of the square are

Area lying in the first quadrant and bounded by the circle x^(2)+y^(2)=4 the line x=sqrt(3)y and x-axis , is

The area of the region in first quadrant bounded by the curves y = x^(3) and y = sqrtx is equal to

Find the area lying in the first quadrant and bounded by the curve y=x^3 and the line y=4xdot

The area (in sq. units) covered by [x-y]=-3 with the coordinate axes is (where [.] is the greatest integer function)

Find the area of the region in the first quadrant enclosed by x-axis, the line y=sqrt(3\ )x and the circle x^2+y^2=16