Q: How do the lengths of two radii of the same circle compare?

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Yes. All radii of the same circle have the same length.

Yes, providing that the radii are all in the same circle

Yes, within the same circle

No. To be similar ALL lengths must be in the same ratio. If two cylinders have the same radii, but different heights then the radii have one ratio (1:1) but the heights have a different ratio; thus they are not similar.

There are infinite diameters in a circle all of the same lengths.

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NO. All the radii of a circle are of exactly the same length. In fact, that is the definition of the locus of a point describing a circle.

Yes. All radii of the same circle have the same length.

Yes, providing that the radii are all in the same circle

Yes providing that they are in the same circle

The plural of 'radius' is 'radii', not 'radiuses'. A circle has an infinite number of radii, but they are all of the same length.

Yes, all radii of a circle have the same length. One often thinks of the radius as being this length.

yes

Yes, within the same circle

Yes, providing that each radius is in the same circle

Yes in a particular circle

Yes, all radii of a given circle have the same length. A circle is defined as all the points on a plane that have a specified distance from a given point, called the center. Any segment from the center to the circle is called a radius (plural radii). Thus, by definition, all such segments (all radii) have the same length.

A radius is the distance from the center of a circle, to the border. In a circle, all radii have the same length.