![]() ![]() In addition to storage, knowing the volume of your packaged product will come in handy in the shipping process. Both of these examples (large and medium-sized businesses) clearly show that without taking into account the total volume of packaged finished products, it is almost impossible to establish the smooth operation of an enterprise - everything must fit and everything must be sold. ![]() In any case, you will try to expand the assortment to increase sales and, as a result, profits - which means you just need to have at least a few copies of each item on hand in the backroom of the store. Or you are the owner of a store of, say, household goods. Imagine that you are engaged in the production of any product, while you can use a huge warehouse for storing finished products, but we guarantee you that sooner or later you will not have enough space for the entire range of products. Why is it important to know the exact volume of a rectangular box?Īs we noted earlier, cardboard boxes are mainly used for storing and transporting goods and cargo. This point is very important to understand before calculating the volume of the box you need. So, boxes made of corrugated cardboard are used for packing oversized and oversized cargo, as well as cargo of various weights. Such boxes are used for a variety of purposes - they have proven themselves equally well for packaging finished products, and for transport operations, and as "containers for everything in the world." At the same time, the range of goods and types of products that are packed in cardboard boxes is very extensive and varied. All the other versions may be calculated with our triangular prism calculator.They are the most common type of cardboard boxes in Ukraine. The only option when you can't calculate triangular prism volume is to have a given triangle base and its height (do you know why? Think about it for a moment). Using law of sines, we can find the two sides of the triangular base:Īrea = (length * (a + a * (sin(angle1) / sin(angle1+angle2)) + a * (sin(angle2) / sin(angle1+angle2)))) + a * ((a * sin(angle1)) / sin(angle1 + angle2)) * sin(angle2) Triangular base: given two angles and a side between them (ASA) ![]() Using law of cosines, we can find the third triangle side:Īrea = length * (a + b + √( b² + a² - (2 * b * a * cos(angle)))) + a * b * sin(angle) Triangular base: given two sides and the angle between them (SAS) However, we don't always have the three sides given.
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