1 cm2= 100 mm2
Find the area of each face separately and then add them together for the total surface area.
The surface area of a shape is expressed in square units.
To calculate the surface area of a pipe fitting, you need to first determine the individual shapes that make up the fitting, such as cylinders, cones, or spheres. Then, calculate the surface area of each shape using the appropriate formulas (e.g., for a cylinder, the formula is 2πrh + 2πr^2). Finally, sum up the surface areas of all the individual shapes to get the total surface area of the pipe fitting.
Please provide contact surface area of multimill
Total surface area is 176 units2
Find the area of each face separately and then add them together for the total surface area.
Total Surface Area = 6L2. Where L = the length of one side of the cube.
To calculate the surface area of the equilateral triangular-based prism, you need to calculate the area of the equilateral triangle and all the other sides of the prism. The total area of all the phases will give the total surface are of an equilateral triangular based prism.
Total surface area of a cube: 6 times a side squared
6*s2 where s is the length of an edge.
The total surface area! The total surface area! The total surface area! The total surface area!
You need to:* Calculate the surface area * Calculate the volume * Divide the surface area by the volume
The surface area of a shape is expressed in square units.
To calculate the pressure exerted on a surface, the force acting on the surface is divided by the surface area. Mathematically, pressure = force / area.
To calculate the surface area of a rectangular prism, you can use the formula: Surface Area = 2(lw + lh + wh), where l is the length, w is the width, and h is the height. You need to know the dimensions of the prism to find the total surface area. If you provide the specific measurements, I can help you calculate it further.
surface area divided by volume
To calculate the surface area to volume ratio, simply divide the surface area of the object by its volume. This ratio is commonly used in science to understand how efficiently an object exchanges materials with its environment, with a higher ratio indicating better surface area for exchange relative to its volume.