No, the circle is inscribed in the quadrilateral.
It is an inscribed quadrilateral or cyclic quadrilateral.
you dont
cyclic
Of the shapes listed, only the rhombus is a quadrilateral.
Oh, dude, a circle is like the black sheep of the quadrilateral family. It's not really a quadrilateral because it's got that whole round thing going on, you know? So, technically, no, a circle doesn't belong to the quadrilateral family. But hey, who really cares about geometry rules anyway, right?
No, the circle is inscribed in the quadrilateral.
false
It is an inscribed quadrilateral or cyclic quadrilateral.
A quadrilateral has four sides. A circle does not have four sides. Therefore, a circle is not a quadrilateral.
A quadrilateral is inscribed in a circle it means all the vertices of quadrilateral are touching the circle. therefore it is a cyclic quadrilateral and sum of the opposite angles in cyclic quadrilateral is supplementary. suppose if one angle is A then another will be 180 degree - angle A.
No. You can have a very "thin" quadrilateral that is completely in the top half of the circumscribing circle. Then the centre of the circle will be below and OUSIDE the quadrilateral. The diagonals of the quadrialteral will be INSIDE the quadrilateral while they are within the circle and so cannot pass through the centre.
you dont
cyclic
no because it has an infinate number of sides a quadrilateral has exactly 4
Of the shapes listed, only the rhombus is a quadrilateral.
The opposite angles of a quadrilateral inscribed in a circle are supplementary, meaning they add up to 180 degrees. This is due to the property that the sum of the opposite angles of any quadrilateral inscribed in a circle is always 180 degrees. This property can be proven using properties of angles subtended by the same arc in a circle.