![]() ![]() It has a gazillion different shapes! (Fourteen, to be exact. a cube, which is a special case of a rectangular prism – you may want to check out our comprehensive volume calculator. If you're searching for a calculator for other 3D shapes – like e.g. However, this can be automatically converted. Solve it manually, or find it using our calculator. The Trapezoid Volume (Rectangular) calculator computes the volume of trapezoid volume shape based on the dimensions: INSTRUCTIONS: Choose units and enter the following: (a) Width of Top (b) Length of Top (A) Width of Bottom (B) Length of Bottom (h) Height between Top and Bottom Trapezoid Volume (V): The calculator returns the volume in cubic meters. That's again the problem solved by the volume of a rectangular prism formula. Formula The formula is given below: Volume of a Trapezoidal Prism Let us solve some examples to understand the concept better. It is measured in cubic units such as m 3, cm 3, mm 3, ft 3. ![]() Your good old large suitcase, 30 × 19 × 11 inches or The volume of a trapezoidal prism is the space it occupies in the three-dimensional plane. The bottom of the swimming pool is a plane slopping gradually downward so that the depth of the water at one end is 4 ft. The length measured at the water line is 50 ft. You have to pack your stuff for the three weeks, and you're wondering which suitcase □ will fit more in: (a) Find the volume of water in a swimming pool with vertical ends and sides. You are going on the vacation of your dreams □. But how much dirt should you buy? Well, that's the same question as how to find the volume of a rectangular prism: measure your raised bed, use the formula, and run to the gardening center. For that, you need to construct a raised bed and fill it with potting soil. The time has come – you've decided that this year you'd like to grow your own carrots □ and salad □. It is a similar story for other pets kept in tanks and cages, like turtles or rats – if you want a happy pet, then you should guarantee them enough living space. If you're wondering how much water you need to fill it, simply use the volume of a rectangular prism formula. It's in a regular box shape, nothing fancy, like a corner bow-front aquarium. You bought a fish tank for your golden fish □. Where can you use this formula in real life? Let's imagine three possible scenarios: ![]()
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