If we take a number of circular sheets of paper and stack them up what we get is the right circular cylinder. Since it has been kept at right angles to the circular base it is called a right circular cylinder. A right circular cylinder is a 3D shape with circular bases at the ends. The circular bases have the same radius and are parallel to each other. All the points on the circular base are at a fixed distance from the straight line called the axis of the cylinder. The right circular cylinder is the most commonly used geometric figure. Example: A cold drink can, a gas cylinder, etc. Show Right Circular Cylinder DefinitionRight circular cylinder definition states that- A cylinder whose base is a circle is called a circular cylinder. If the axis of the cylinder is perpendicular to its base then the cylinder is called a right circular cylinder. From the below figure segment AB is the axis of the cylinder it joins the centre of the two bases of the cylinder. The oblique cylinder is another type of cylinder, which does not have parallel bases, it resembles a tilted structure. (the image will be uploaded soon) Properties of Right Circular CylinderThe line joining the centres of the circular base is called the axis of the right circular cylinder. If a plane cuts the right cylinder horizontally parallel to the bases, then the shape we get is a circle. The section obtained on cutting a right circular cylinder by a plane, which contains two elements and parallels to the axis of the cylinder is the rectangle. When we revolve a rectangle about one side as the axis of revolution, a right cylinder is formed. Formulas for Right Circular CylinderSome important terms used in the formulas for the right circular cylinder are: Base: Each of the circular ends of a right circular cylinder is called it is base. Axis: The line segment joining the centres of two circular bases and is perpendicular to the base of the right circular cylinder is called the axis of the right circular cylinder. Radius(r): The radius is referred to as the radius of the circular base. Height(h): the length of the axis of the cylinder is called the height of the cylinder. The perpendicular distance between the circular bases is referred to as the height of the right circular cylinder. Lateral Surface: The curved surface between the two bases of a right circular cylinder that joins the bases is called its lateral surface. Now let us study the formulas for the total surface area of the right circular cylinder, curved or lateral surface area, and volume of a right circular cylinder. (Image will be uploaded soon) Curved Surface Area The curved surface joining the two bases of a right circular cylinder is called its lateral surface. The formula for the Lateral Surface Area or Curved Surface Area is given by Where, r = radius of the circular base h = height of the right circular cylinder π= 3.14 or 227 Total Surface Area The sum of the lateral surface area or curved surface area and the base areas of both the circles will give the total surface area of a right circular cylinder. The formula for the total surface area of the right circular cylinder(TSA) is given by Where, r = radius of the circular base h = height of the right circular cylinder π = 3.14 or 227 VolumeThe volume of the right circular cylinder is the product of any of the areas of the top or bottom circle and the height of the cylinder. The volume of the right circular cylinder is measured in terms of cubic units. The formula for the volume of a right circular cylinder is given by The volume of Right Circular Cylinder(V) = Area of the circular base ✕ Height of the Right Cylinder Solved Examples
Solution: Let r be the radius and h be the height of the cylinder. Then, The curved surface area of right circular cylinder = 2 πr h = 88 h = 14cm 2 π r h = 88 \[2\times \frac{22}{7}\times r\times 7 = 88 (\pi =\frac{22}{7})\] 44r = 88 \[r= \frac{88}{44}\] r = 2cm Diameter = 2r = 2 x 2 = 4cm So the radius and diameter of the right circular cylinder are 2cm and 4cm respectively.
Solution: Given that, r = 10 cm h = 15 cm Volume of a right circular cylinder = πr2h Volume = 3.14 × 102 × 15 = 3.14 × 10 × 10 × 15 = 314 x 15 =4710 cm3. Therefore the volume of the right circular cylinder is 4710 cubic centimetres. Quiz Time
Quick SummaryBelow is a quick summary on the topic right circular cylinder. For more details, you can access the free resources available on the Vedantu website for the state board, CBSE, ICSE, and competitive examinations.
Slice Slanted Across Figure: In a right rectangular pyramid, as seen at the right, a cross section can be cut on a slant to produce a variety of additional shapes. At the right, a slanted slice produced a pentagon. So the cross sections for a right rectangular pyramid can be 2-dimensional shapes that are triangles, quadrilaterals, or pentagons.
If you cut into a three-dimensional object and looked at the plane you made with the cut, you would have a two-dimensional cross-section of the object. Cutting into objects in different ways will get you different cross-sections. |