Any point whose distance from the centre of the circle is smaller than the radius of the circle.
It's at the point where the bisectors of the triangle's interior angles meet.
Yes
The boundary which defines the area of a circle is known as the circumference of the circle.However if one wants to be precise, the circumference is the distance around the outside of the circle, not the circle itself. The term "circle" itself means the boundary. It has an interior and an exterior.A circle can be defined as all the points that are the same distance from a given point.
The line from the center of a circle to a point on the circle is the radius.
It is the circle's center point
exterior and interior of a circle
the interior of a circle is called a cabret
This is the definition of an inscribed angle in geometry. An inscribed angle is formed by two chords in a circle that also share a common point called the vertex.
The term "point in the interior" refers to a location within a geometric shape that is not on the boundary or edge of that shape. For example, in a circle, any point that lies inside the circumference is considered a point in the interior. This concept is important in various fields, such as mathematics and topology, as it helps define properties and behaviors of shapes and spaces. Understanding interior points is crucial for concepts like open sets and continuity in analysis.
It's at the point where the bisectors of the triangle's interior angles meet.
Yes
the disk
A point has no interior and so cannot have interior angles.
inscribed angle
The boundary which defines the area of a circle is known as the circumference of the circle.However if one wants to be precise, the circumference is the distance around the outside of the circle, not the circle itself. The term "circle" itself means the boundary. It has an interior and an exterior.A circle can be defined as all the points that are the same distance from a given point.
A line that intersects a circle at two points is called a "secant." This line passes through the interior of the circle, creating two distinct intersection points on the circle's circumference. In contrast, a line that touches the circle at exactly one point is known as a "tangent."
The union of a circle and its interior refers to the combination of all points on the circle itself and all points inside the circle. This forms a set that includes both the boundary of the circle and its interior region. In mathematical terms, this union is represented as the circle itself along with all points within the circle, denoted as the closed disk.