![]() Where 'b' is base length, and 'h' is the height, and 'l' is the distance between the bases or height of the triangle of the prism.ħ. The volume of triangular prism = Base Area × height of the prism = 1/2 × (b × h) × l. The formula to calculate the volume of a triangular prism is: Volume of a triangular prism: A triangular prism has two triangular bases with three faces joining the sides. The formula to calculate the volume of a sphere is:Ħ. Volume of a sphere: A sphere is a geometric shape that resembles a ball. Where 'r' is the radius and 'h' is the height of a cone.ĥ. The base area of a cone is a circle which is πr 2. The formula to calculate the volume of a cone is: Volume of a cone: A cone has a circular base with triangular faces that meet at its apex. Where r is the radius, h is the height, and π(Pi) is a mathematical constant with an approximate value of 3.14 or 22/7.Ĥ. The base area of a cylinder is a circle which is πr 2. The formula to calculate the volume of a cylinder is: Volume of a cylinder: A cylinder has two parallel circular bases and is joined by a curved surface to form a tube-like structure. Volume of the cube: A cube can be thought of as a special case of a cuboid that has all equal sides.The formula to calculate the volume of the cube is:ģ. Where 'l' is the base length, 'b' is the base width, and 'h' is the height of the cuboid.Ģ. The base area of a cuboid is a rectangle which is l × b. The volume of a cuboid = Base Area × Height = l × b × h. The formula to calculate the volume of a cuboid is: Volume of a cuboid: A cuboid is a three-dimensional shape that is made up of 6 quadrilateral faces. The base area multiplied by the height gives the volume of most shapes.ġ. Step 4: Click on the " Reset" button to clear the fields and enter new values.ĭepending upon the shape there are a number of different formulas available to calculate volume.Step 3: Click on the " Calculate" button to find the volume.Step 2: Choose the shape from the drop-down list and enter the values in the input box of the volume calculator.Step 1: Go to Cuemath’s online volume calculator.Please follow the below steps to find the volume using the online volume calculator: To use the volume calculator, choose the shape from the drop-down menu and enter values in the input box. ![]() Then the volume of the bottle will be 50cm 3. Suppose we have a bottle that can hold 50 cm 3 of water up to the brim. Volume Calculator is an online tool used to calculate the volume of a three-dimensional shape. Volume can be defined as the total space that is enclosed within a three-dimensional closed shape. In this case, 6 x 4 x 1/3 = 8, which means the pyramid has a volume of 8 cubic centimeters.Volume Calculator helps to find the volume for a given shape like a sphere, cube, cylinder, cone, cuboid, triangular prism, or triangular pyramid. Next, multiply the area by the height of the pyramid, then multiply the product by 1/3. First, find the area of the triangle using the formula ½ x 2 x 4, which will give you a base area of 4 square centimeters. For example, say your pyramid has a base that’s a triangle with a base width of 2 cm and a height of 4 cm, and the pyramid has a height of 6 cm. From there, you can use the same formula that you used for the square-based pyramid. If you know the triangle’s height and the width of its base, plug those numbers into the formula ½ x b (base) x h (height) to find the area of the triangle. For pyramids with a triangular base, the technique is a little different. ![]() In this case, the pyramid has a volume of 12 cubic inches. Since you’re describing the volume of a 3-dimensional object, remember to write your answer in cubic units. For instance, if your pyramid has a square base that is 3 inches long by 3 inches wide, and a height of 4 inches, the volume would be (3 x 3 x 4)/3, or 12. Then, multiply the area of the base by the height of the pyramid, and multiply the result by 1/3-which is the same as dividing by 3. ![]() If the pyramid has a square or rectangular base, simply multiply the width of the base by its length to find the area. Once you have that information, you can find the volume using the formula V (volume) = 1/3 x Ab (the area of the base) x h (height). To calculate the volume of a pyramid, you need to know its height and the area of the base.
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