Rectangular tank volume calculator

Held in the tank. Height of LiquidĮnter how high the liquid is from the bottom of the tank. Dividing by 231, which is the number of cubic inches in a gallon, will tell you exactly how many gallons your tank will hold when filled to capacity. Press the ÷ button, then enter 231 and hit a second time. This calculator requires the following measurements to determine the amount of liquid in the tank. Divide the tanks volume in cubic inches by 231 to convert to gallons. It is assumed that the tank is installed on level ground. If the tank holds 100,000 liters and is 5 meter deep. The filled depth must be greater than or equal to zero. All input values representing dimensions have to be greater than zero.This liquid volume calculator accepts integers, decimals, fractions, and numbers in e-notation as inputs. Where possible use internal dimensions to remove errors due to the thickness of the tank walls. The calculator will return the total capacity of a tank and the filled volume. This tool calculates the volume of liquid held in a rectangular shaped tank using the measured level of the fluid.

Rectangular TankInstructions:Enter the dimensions of your rectangular tank.Select the units of measurement for each dimension.Click "Calculate" to calculate the volume.Click "Clear" to reset the form.Click "Copy" to copy the result to the clipboard.Cylindrical TankInstructions:Enter the dimensions of your horizontal cylindrical tank.Select the units of measurement for each dimension.Click "Calculate" to calculate the volume.Click "Clear" to reset the form.Click "Copy" to copy the result to the clipboard. IntroductionThe Tank Volume Calculator is a valuable tool used to determine the volume of various types of tanks, such as cylindrical tanks, spherical tanks, and more. This calculator finds applications in various fields, including engineering, manufacturing, agriculture, and even everyday household tasks. In this article, we will explore the concept of the Tank Volume Calculator, the relevant formulae, example calculations, real-world use cases, and conclude with the significance of this tool in different industries.The ConceptThe Tank Volume Calculator serves a crucial role in determining the amount of liquid or substance a tank can hold. This is essential in industries like chemical processing, oil and gas, agriculture, and many others, where precise volume measurements are required. The calculator can estimate the tank’s capacity with great accuracy, which is particularly important in industries where even a small deviation can lead to significant problems.Formulae for Tank Volume CalculationCylindrical TanksFor cylindrical tanks, the formula for calculating the volume is straightforward:Volume = π * r^2 * hWhere:π (pi) is approximately 3.14159r is the radius of the tank’s baseh is the height of the tankThis formula assumes that the tank has a uniform cross-section along its height.Spherical TanksSpherical tanks are also common in various industries. The formula for calculating the volume of a spherical tank is:Volume = (4/3) * π * r^3Where:π (pi) is approximately 3.14159r is the radius of the sphereThis formula considers the spherical shape of the tank.Conical TanksIn cases where the tank has a conical shape, the volume can be calculated using the following formula:Volume = (1/3) * π * h * (R^2 + R * r + r^2)Where:π (pi) is approximately 3.14159h is the height of the conical portionR is the radius of the larger circular baser is the radius of the smaller circular topThis formula accounts for the varying cross-section of a conical tank.Example CalculationsLet’s illustrate these formulas with a couple of examples:Example 1: Cylindrical TankSuppose we have a cylindrical tank with a radius (r) of 2 meters and a height (h) of 5 meters. Using the formula, we can calculate its volume:Volume = π * (2^2) * 5 = 3.14159 * 4 * 5 = 62.83 cubic metersExample 2: Spherical TankImagine we have a spherical tank with a radius (r) of 3 meters. To find its volume, we can use the formula for spherical

Are,Dimensions of a tank = 8m × 6m × 2mWe know that,Volume of tank = l × b × h= 8 × 6 × 2= 96 m3= 96000 litres∴ The tank can contain 96000 litres of water.6. The capacity of a certain cuboidal tank is 50000 litres of water. Find the breadth of the tank, if its height and length are 10 m and 2.5 m respectively.Solution:Given details are,Capacity (volume) of cuboidal tank is = 50000 litre = 50 m3Height of tank = 10 mLength of tank = 2.5 mLet breadth of tank be ‘b’ mWe know that,Volume = l × b × hb = volume / (l × h)= 50/(10×2.5)= 2m∴ Breadth of tank is 2m7. A rectangular diesel tanker is 2m long, 2m wide and 40cm deep. How many litres of diesel can it hold?Solution:Given details are,Length of a tanker = 2mBreadth of a tanker = 2mHeight of a tanker = 40cm = 0.4mSo, Dimensions of rectangular diesel tank = 2m × 2m × 0.4mVolume of tank (amount of diesel it can hold) = l × b × h= 2 × 2 × 0.4= 1.6m3= 1600 litres∴ A rectangular diesel tanker can hold 1600 litres of diesel.8. The length, breadth and height of a room are 5 m, 4.5 m and 3 m respectively. Find the volume of the air it contains.Solution:Given details are,Length of a room = 5mBreadth of a room = 4.5mHeight of a room = 3mSo, Dimensions of a room are = 5m × 4.5m × 3mVolume of air = l × b × h= 5 × 4.5 × 3= 67.5m3∴ The room contains 67.5m3 volume of the air.9. A water tank is 3 m long, 2 m broad and 1 m deep. How many litres of water can it hold?Solution:Given details are,Length of water tank = 3mBreadth of water tank = 2mHeight of water tank = 1mSo, Dimensions of water tank is = 3m × 2m × 1mVolume the water tank can hold = l × b × h= 3 × 2 × 1= 6m3= 6000 litres∴ The water tank can hold 6000 litres of water.10. How many planks each of which is 3 m long, 15 cm broad and 5 cm thick can be prepared from a wooden block 6 m long, 75 cm broad and 45 cm thick?Solution:Given details are,Dimensions of one plank = 3m × 15cm × 5cm = 300cm × 15cm × 5cmDimensions of wooden block = 6m × 75cm × 45cm = 600cm × 75cm × 45cmWe know that,Number of planks that can be prepared = volume of wooden block / volume of one plank= (600 × 75 × 45) / (300 × 15 × 5)= 90 planks∴ 90 planks are required to prepare the block.11. How many bricks each of size 25 cm × 10 cm × 8 cm will be required to build a wall 5 m long, 3 m high and 16 cm thick, assuming that the volume of sand and cement used in the construction

Is negligible?Solution:Given details are,Size of one brick = 25cm × 10cm × 8cmDimensions of wall = 5m × 3m × 16cm = 500 cm × 300 cm × 16cmWe know that,Number of bricks required to build a wall = volume of wall / volume of one brick= (500×300×16) / (25×10×8)= 1200 bricks∴ 1200 bricks are required to build the wall.12. A village, having a population of 4000, required 150 litres water per head per day. It has a tank which is 20 m long, 15 m broad and 6 m high. For how many days will the water of this tank last?Solution:Given details are,Population of village = 4000Dimensions of water tank = 20m × 15m × 6mWater required per head per day = 150 litresTotal requirement of water per day = 150 × 4000 = 600000 litresVolume of water tank = l × b × h= 20 × 15 × 6= 1800m3= 1800000 litresWe know that,Number of days water last in the tank = volume of tank / total requirement= 1800000/600000= 3 days∴ Water in the tank last for 3 days.13. A rectangular field is 70 m long and 60 m broad. A well of dimensions 14 m × 8 m × 6 m is dug outside the field and the earth dug-out from this well is spread evenly on the field. How much will the earth level rise?Solution:Given details are,Dimensions of rectangular field = 70m × 60mDimensions of well = 14m × 8m × 6mAmount of earth dug out from well (volume) = l × b × h= 14 × 8 × 6 = 672m3We know that,Rise in earth level = dimensions of rectangular field / amount of earth dug up= (70×60) / 672= 0.16m= 16cm∴ Rise in earth level on a rectangular field is 16cm.14. A swimming pool is 250 m long and 130 m wide. 3250 cubic metres of water is pumped into it. Find the rise in the level of water.Solution:Given details are,Dimensions of swimming pool = 250 m × 130mVolume of water pumped in it = 3250 m3We know that,Rise in water level in pool = volume of water pumped / dimensions of swimming pool= 3250/(250×130)= 0.1m∴ Rise in level of water is 0.1m15. A beam 5 m long and 40 cm wide contains 0.6 cubic metre of wood. How thick is the beam?Solution:Given details are,Length of beam = 5 mWidth of beam = 40 cm = 0.4 mVolume of wood in beam = 0.6 m3Let thickness of beam be ‘h’ mWe know that,Volume = l × b × hh = volume/(l × b)= 0.6/(5×0.4)= 0.3m∴ Thickness of the beam is 0.3m16. The rainfall on a certain day was 6 cm. How many litres of water fell on 3 hectares of field on that day?Solution:Given details are,Area of field = 3 hectare = 3×10000 m2 = 30000 m2Depth of water on the field = 6cm = 6/100 = 0.06mVolume of water = area of field × depth of water= 30000 × 0.06= 1800 m3We know

Tanks:Volume = (4/3) * π * (3^3) = (4/3) * 3.14159 * 27 = 113.10 cubic metersReal-World Use CasesThe Tank Volume Calculator finds application in various industries and everyday situations:Industrial TanksIn industries like oil and gas, chemical processing, and water treatment, accurate volume calculations are crucial. Engineers use this tool to determine the capacity of storage tanks, ensuring they are filled or emptied correctly and safely.AgricultureFarmers use tank volume calculations to manage irrigation systems and store liquids such as fertilizers and pesticides. Accurate measurements help in optimizing resource usage and crop yields.Household TasksEven in everyday life, the Tank Volume Calculator proves useful. For example, when filling a swimming pool, homeowners can estimate the volume of water needed, saving time and resources.ConstructionIn construction, the calculator is employed to determine the volume of concrete needed for structures like foundations and retaining walls. This ensures cost-effective and efficient construction processes.ConclusionThe Tank Volume Calculator is a versatile tool that simplifies the calculation of tank volumes in various shapes, from cylinders to spheres and conical tanks. The formulae provided in this article are essential for accurate volume calculations, ensuring efficient resource management in industries and everyday tasks.This tool plays a vital role in industries such as manufacturing, agriculture, and construction, where precise volume measurements are crucial for successful operations. Whether you are an engineer designing industrial tanks or a homeowner filling a pool, the Tank Volume Calculator is a valuable ally in your endeavors.In conclusion, this calculator empowers professionals and individuals to make informed decisions, save resources, and contribute to the overall efficiency of processes in various sectors.ReferencesHibbeler, R. C. (2012). Engineering Mechanics: Dynamics. Pearson.Blevins, R. D. (2001). Applied Fluid Dynamics Handbook. Van Nostrand Reinhold.