The volume V of a cone with radius r is given by the formula $$V=13πr2h. The volume of this cone with height 3 units and radius r is $$V=64π cubic units. This statement is true: $$64π=13πr2⋅3 What does the radius of this cone have to be? Explain how you know.
Cylinders
A cylinder is a three-dimensional solid shape with two parallel and congruent circular bases, joined by a curved surface at a fixed distance. A cylinder has an infinite curvilinear surface.
Cones
A cone is a three-dimensional solid shape having a flat base and a pointed edge at the top. The flat base of the cone tapers smoothly to form the pointed edge known as the apex. The flat base of the cone can either be circular or elliptical. A cone is drawn by joining the apex to all points on the base, using segments, lines, or half-lines, provided that the apex and the base both are in different planes.
The volume V of a cone with radius r is given by the formula $$V=13πr2h. The volume of this cone with height 3 units and radius r is $$V=64π cubic units. This statement is true: $$64π=13πr2⋅3 What does the radius of this cone have to be? Explain how you know.
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