Калькулятор онлайн земельного участка: Калькулятор площади земельного участка онлайн

Строительные калькуляторы: расчёт строительных материалов онлайн

Быстрый расчёт объемов стройматериалов!

Перпендикуляр.pro предлагает профессиональные строительные калькуляторы для расчета необходимых материалов, их расхода при строительстве.

Стоимость постройки дома и выполнения ремонта напрямую зависит от количества бетона, арматуры, пиломатериалов, песка, щебня. Для получения величин потребуются счетные устройства и специальные формулы из школьного курса, некоторые из которых за давностью лет стерлись из памяти.

Сколько понадобится кирпича, керамической плитки, обоев, гипсокартона? В вашем распоряжении надежные программы для определения их количества. Наш бесплатный сервис расчета строительных материалов – это более чем 50 онлайн-калькуляторов. Все ответы имеются на Перпендикуляр.pro

Поможем точно рассчитать параметры строительных конструкций!

Программа для лестниц поможет оценить удобство конструкции, определить ее безопасность, представить сооружение в просторах помещения. Больше о калькуляторах лестниц тут.

Порядок работы:

• выбираете конструкцию;
• указываете ширину и высоту проема, размеры ступеней и лестницы, мм;
• учитываете конструктивные особенности, отмечаете галочками;
• нажимаете кнопку: Рассчитать.

Через секунду на странице подводятся итоги. В случае отклонений от удобства или безопасности, предлагаются варианты решений. Дополнительные фишки: возможность распечатать результат, визуально оценить конструкцию в режиме 3D, подробные чертежи, необходимые для строительства, расчет стройматериалов и строительных конструкций.

Посетители Перпендикуляра имеют возможность использовать наши онлайн калькуляторы стройматериалов бесплатно.

Нахождение объемов

Строительные расчеты размеров траншеи, котлована, колодца помогут оценить фронт деятельности, определить стоимость услуги и оценить варианты удешевления.

• В приведенную форму необходимо ввести размеры и указать расценки в удобной валюте, используемой для региона. Калькулятор материалов для ремонта или стройки подводит итог, в котором, кроме объемов, площади подробно описана полная стоимость работы.
• Полученный результат можно использовать как для определения объема грунта, который потребуется удалить, так и для подбора экономически целесообразного варианта выполнения работы.
• Определение площади, объема труб, цистерны, цилиндра, размеров земельного участка пригодятся ежедневно для решения жизненных задач.
• Программа определения количества щебня, песка или грунта на основании геометрических размеров кучи потребуется для вычисления объемов, оценки имеющихся в распоряжении хозяина ресурсов.

Как рассчитать материалы для строительных работ

• Специальные программы помогут определить параметр конструкций при изготовлении фундамента, теплицы, полового покрытия. Точность результата зависит от правильности замера и введенных размеры в мм. Замеры выполняются согласно приведенным на сайте чертежам. Калькулятор расхода стройматериалов выдает результат в виде данных о необходимом количестве, приводит общие советы по изготовлению.
• В отношении фундамента — это сроки застывания, по теплицам приводятся рекомендации о создании хорошей теплоизоляции, параметры кровли пересекаются с данными по выбору угла наклона. Приводится величина объема полученного мансардного помещения.
• С помощью имеющихся на сайте инструментов, посетители Перпендикуляра.pro за считанные секунды могут получить дельные советы и точные данные. Все, что требуется от вас — правильно по чертежу выполнить замеры, ввести их в ячейки программы. Из специальных приспособлений достаточно одной рулетки.

90000 Area Calculator 90001 90002 The following are calculators to evaluate the area of ​​seven common shapes. The area of ​​more complex shapes can usually be obtained by breaking them down into their aggregate simple shapes, and totaling their areas. This calculator is especially useful for estimating land area. 90003 90004 90005 Rectangle 90006 90007 90008 90009 90010 90011 90012 90010 90014 90015 90016 90005 Triangle 90006 90007 90008 90009 90010 90011 90024 90002 Use the Triangle Calculator to determine 90016 all three edges of the triangle 90016 given other parameters.90003 90010 90014 90015 90016 90005 Trapezoid 90006 90007 90008 90009 90010 90011 90040 90010 90014 90015 90016 90005 Circle 90006 90007 90008 90009 90010 90011 90052 90010 90014 90015 90016 90005 Sector 90006 90007 90008 90009 90010 90011 90064 90010 90014 90015 90016 90005 Ellipse 90006 90007 90008 90009 90010 90011 90076 90010 90014 90015 90016 90005 Parallelogram 90006 90007 90008 90009 90010 90011 90088 90010 90014 90015 90016 RelatedSurface Area Calculator | Volume Calculator 90002 Area is a quantity that describes the size or extent of a two-dimensional figure or shape in a plane.It can be visualized as the amount of paint that would be necessary to cover a surface, and is the two-dimensional counterpart of the one-dimensional length of a curve, and three-dimensional volume of a solid. The standard unit of area in the International System of Units (SI) is the square meter, or 90094 m 90095 2 90096 90097. Provided below are equations for some of the most common simple shapes, and examples of how the area of ​​each is calculated. 90003 90099 Rectangle 90100 90002 A rectangle is a quadrilateral with four right angles.It is one of the simplest shapes, and calculating its area only requires that its length and width are known (or can be measured). A quadrilateral by definition is a polygon that has four edges and vertices. In the case of a rectangle, the length typically refers to the longer two edges of the quadrilateral, while the width refers to the shorter of the two edges. When the length and width of a rectangle are equal, the shape is a special case of a rectangle, called a square. The equation for calculating the area of ​​a rectangle is as follows: 90003 90103 area = length × width 90003 90002 90094 The Farmer and his Daughter — Unsold Land 90097 90003 90002 Imagine a farmer trying to sell a piece of land that happens to be perfectly rectangular.Because he owns some cows that he did not want frolicking freely, he fenced the piece of land and knows the exact length and width of each edge. The farmer also lives in the United States, and being unfamiliar with the use of SI units, still measures his plot of land in terms of feet. The foot was defined to be exactly 0.3048 meters in 1959 after having changed over an extensive period of time, as historically, the human body was often used to provide a basis for units of length, and unsurprisingly, was inconsistent based on time and location.Tangent aside, the farmer’s plot of land has a length of 220 feet, and a width of 99 feet. Using this information: 90003 90103 area = 220 × 99 = 21780 sq ft 90003 90002 The farmer’s plot of land, which has an area of ​​21,780 square feet, equates to half an acre, where an acre is defined as the area of ​​1 chain by 1 furlong, which are defined by something else, and so on, and is why SI now exists. Unfortunately for the farmer, he lives in an area predominated by foreign investors with smaller feet, who felt that they should be getting more square feet for their money, and his land remains unsold today.90003 90099 Triangle 90100 90002 There are many equations for calculating the area of ​​a triangle based on what information is available. As mentioned in the calculator above, please use the Triangle Calculator for further details and equations for calculating the area of ​​a triangle, as well as determining the sides of a triangle using whatever information is available. Briefly, the equation used in the calculator provided above is known as Heron’s formula (sometimes called Hero’s formula), referring to the Hero of Alexandria, a Greek mathematician and engineer considered by some to be the greatest experimenter of ancient times.The formula is as follows: 90003 90103 90120 90003 90002 90094 The Farmer and his Daughter — Triangle Daze 90097 90003 90002 At this point in time, through extreme effort and perseverance, the farmer has finally sold his 21,780 sq ft plot of land and has decided to use some of the money earned to build a pool for his family. Unfortunately for the farmer, he does not consider the fact that the maintenance costs of a pool for one year alone could likely pay for his children to visit any pool or water theme park for years to come.Even more unfortunately for the farmer, his 7-year-old daughter who has recently traveled to Egypt vicariously through Dora the Explorer, has fallen in love with triangles, and insists that the pool not only be triangular in shape, but also that the measurements must only include the number 7, to represent her age and immortalize this point of her life in the form of a triangular pool. Being a doting father, the farmer acquiesces to his daughter’s request and proceeds to plan the construction of his triangular pool.The farmer must now determine whether he has sufficient area in his backyard to house a pool. While the farmer has begun to learn more about SI units, he is as yet uncomfortable with their use and decides that his only viable option is to construct a pool in the form of an equilateral triangle with sides 77 ft in length, since any other variation would either be too large or small. Given these dimensions, the farmer determines the necessary area as follows: 90003 90103 90129 90003 90002 Since the longest distance between any two points of an equilateral triangle is the length of the edge of the triangle, the farmer reserves the edges of the pool for swimming «laps» in his triangular pool with a maximum length approximately half that of an Olympic pool, but with double the area — all under the watchful eyes of the presiding queen of the pool, his daughter, and the disapproving glare of his wife.90003 90099 Trapezoid 90100 90002 A trapezoid is a simple convex quadrilateral that has at least one pair of parallel sides. The property of being convex means that a trapezoid’s angle does not exceed 180 ° (in contrast, a concave quadrilateral would), while being simple reflects that trapezoids are not self-intersecting, meaning two non-adjacent sides do not cross. In a trapezoid, the parallel sides are referred to as the bases of the trapezoid, and the other two sides are called the legs.There exist more distinctions and classifications for different types of trapezoids, but their areas are still calculated in the same manner using the following equation: 90003 90002 where 90094 b 90139 1 90140 90097 and 90094 b 90139 2 90140 90097 are the bases. 90094 h 90097 is the height, or perpendicular distance between the bases 90003 90002 90094 The Farmer and his Daughter — Ramping Endeavors 90097 90003 90002 Two years have passed since the farmer’s pool was completed, and his daughter has grown and matured.While her love for triangles still persists, she eventually came to the realization that no matter how well- «triangled» she was, triangles alone can not make the world go round, and that Santa’s workshop could not plausibly balance on the North Pole, were the world a pyramid rather than a sphere. Slowly, she has begun to accept other shapes into her life and pursues her myriad different interests — currently freestyle BMX. As such, she requires a ramp, but unfortunately for the farmer, not just any ramp.The ramp must be comprised of only shapes that can be formed using multiple triangles, since like her rap idol B.o.B, the farmer’s daughter still has difficulty accepting the reality of curved surfaces. It must of course, also only use the number 9 in its measurements to reflect her age. The farmer decides that his best option is to build a ramp comprised of multiple rectangles, with the side face of the ramp being in the shape of a trapezoid. As the farmer has now become more comfortable with SI, he is able to be more creative with his use of units, and can build a more reasonably sized ramp while adhering to his daughter’s demands.He decides to build a ramp with a trapezoidal face with height of 9 ft, a bottom base of length 29.528 ft (9 m), and a top base of 9 ft. The area of ​​the trapezoid is calculated as follows: 90003 90155 90008 90157 area = 90010 90159 90157 × 9 = 173.376 sq ft 90010 90014 90015 90099 Circle 90100 90002 A circle is a simple closed shape formed by the set of all points in a plane that are a given distance from a given center point. This distance from the center to any point on the circle is called the radius.More detail can be found regarding circles on the Circle Calculator page, but to calculate the area it is only necessary to know the radius, and understand that values ​​in a circle are related through the mathematical constant 90094 π 90097. The equation for calculating the area of ​​a circle is as follows: 90003 90103 area = πr 90095 2 90096 90003 90002 90094 The Farmer and his Daughter — Circle of Li (f) es 90097 90003 90002 Another six years have passed, and his daughter has grown into a strong, beautiful, powerful, confident 15-year-old ingrate solely focused on seeking external validation from acquaintances and strangers on social media while wholeheartedly ignoring genuine support from immediate family and friends .Having had an argument with her father about her excessive use of social media, she decides to prey on her father’s fear of the unknown, and belief in the supernatural in order to prank him. Not knowing where to start, she walks around town talking to a variety of strangers all of whom seemingly have endless founts of wisdom and advice, where she learns about crop circles and their association with aliens and unidentified flying objects as well as many other topics that ignore all scientific and logical explanations.Having finally been convinced of the spherical nature of the earth, deleted all her past social media posts relating to BoB, and expanded her love of triangles to an acceptance of other shapes, she decides to make a basic crop circle consisting of a number of concentric circles, and wants to determine the area necessary to create a crop circle with an outer radius of 15 ft. She does so using the following equation: 90003 90103 area = π × 15 90095 2 90096 = 706.858 sq ft 90003 90002 Unfortunately for the farmer, not only is he terrified of the crop circle that appeared overnight on the night that his daughter told him she was at a slumber party with her friends, that for some odd reason did not result in superfluous Instagram posts (he was of course his daughter’s first follower), but the number of «circle investigators» and «cereologists» showing up on his farm to examine, and subsequently confirm the authenticity of the crop circle as an alien construction, cost him significant damages to his crops .90003 90099 Sector 90100 90002 A sector of a circle is essentially a proportion of the circle that is enclosed by two radii and an arc. Given a radius and an angle, the area of ​​a sector can be calculated by multiplying the area of ​​the entire circle by a ratio of the known angle to 360 ° or 2π radians, as shown in the following equation: 90003 90155 90008 90157 area = 90010 90159 90157 × πr 90095 2 90096 90010 90157 if θ is in degrees 90010 90014 90015 90103 or 90003 90155 90008 90157 area = 90010 90159 90157 × πr 90095 2 90096 90010 90157 if θ is in radians 90010 90014 90015 90002 90094 The Farmer and his Daughter — Sectioning Family 90097 90003 90002 The farmer and his family are facing their most significant dilemma to date.One year has passed, and the farmer’s daughter is now 16 years old and as part of her birthday celebration, her mother baked her favorite dessert, blackberry pie. Unfortunately for the farmer’s daughter, blackberry pie also happens to be a favorite food of their pet raccoon, Platypus, as evidenced by 180 ° worth of the pie being missing with telltale signs of the culprit in the form of crumbs leading towards the overindulgent raccoon. Initially, the pie would easily have been split between three people and one raccoon, but now, half the pie has to be divided between three people as a chagrined, but satiated Platypus watches from a distance.Given that each person will receive 60 ° worth of the pie with a radius of 16 inches, the area of ​​pie that each person receives can be calculated as follows: 90003 90103 area = 60 ° / 360 ° × π × 16 90095 2 90096 = 134.041 in 90095 2 90096 90003 90002 As a result of Platypus ‘inconsideration, each person gets one-third less pie, and the daughter contemplatively recalls American history class, where she learned about the Battle of the Alamo and the portrayal of the folk hero Davy Crockett and his coonskin hat.90003 90099 Ellipse 90100 90002 An ellipse is the generalized form of a circle, and is a curve in a plane where the sum of the distances from any point on the curve to each of its two focal points is constant, as shown in the figure below, where P is any point on the ellipse, and F 90139 1 90140 and F 90139 2 90140 are the two foci. 90003 90103 90241 90003 90002 When F 90139 1 90140 = F 90139 2 90140, the resulting ellipse is a circle. The semi-major axis of an ellipse, as shown in the figure that is part of the calculator, is the longest radius of the ellipse, while the semi-minor axis is the shortest.The major and minor axes refer to the diameters rather than radii of the ellipse. The equation for calculating the area of ​​an ellipse is similar to that for calculating the area of ​​a circle, with the only difference being the use of two radii, rather than one (since the foci are in the same location for a circle): 90003 90103 area = πab 90016 where a and b are the semi-major and semi-minor axes 90003 90002 90094 The Farmer and his Daughter — Falling out of Orbit 90097 90003 90002 Two years have passed since the mysterious disappearance of the family pet, Platypus, and the farmer’s daughter’s fortuitous winning of a furry accessory through the school lottery that helped fill the void of the loss of their beloved pet.The farmer’s daughter is now 18 and is ready to escape rural Montana for a college life replete with freedom and debauchery, and of course some learning on the side. Unfortunately for the farmer’s daughter, she grew up in an environment brimming with positive reinforcement, and subsequently, the mentality that one should «shoot for the moon [since] even if you miss, you’ll land among the stars,» as well as the assertion from everyone around her that she could do absolutely anything she put her mind to! As such, with her suboptimal grades, lack of any extracurricular activities due to her myriad different interests consuming all of her free time, zero planning, and her insistence on only applying to the very best of the best universities, the shock that resulted when she was not accepted to any of the top-tier universities she applied to could be reasonably compared to her metaphorically landing in deep space, inflating, freezing, and quickly suffocating when she missed the moon and landed among the stars.Along with her lungs, her dream of becoming an astrophysicist was summarily ruptured, at least for the time being, and she was relegated to calculating the elliptical area necessary in her room to build a human sized model of Earth’s near elliptical orbit around the sun, so she could gaze longingly at the sun in the center of her room and its personification of her heart, burning with passion, but surrounded by the cold vastness of space, with the Earth’s distant rotation mockingly representing the distance between her dreams, and solid ground .90003 90103 area = π × 18 ft × 20 ft = 1130.97 sq ft 90003 90099 Parallelogram 90100 90002 A parallelogram is a simple quadrilateral which has two pairs of parallel sides, where the opposite sides and angles of the quadrilateral have equal lengths and angles. Rectangles, rhombuses, and squares are all special cases of parallelograms. Remember that the classification of a «simple» shape means that the shape is not self-intersecting. A parallelogram can be divided into a right triangle and a trapezoid, which can further be rearranged to form a rectangle, making the equation for calculating the area of ​​a parallelogram essentially the same as that for calculating a rectangle.Instead of length and width however, a parallelogram uses base and height, where the height is the length of the perpendicular between a pair of bases. Based on the figure below, the equation for calculating the area of ​​a parallelogram is as follows: 90003 90103 90265 90003 90103 area = b × h 90003 90002 90094 The Farmer and his Daughter — Diamond in the Sky 90097 90003 90002 Another two years have passed in the life of the farmer and his family, and though his daughter had been a cause for intense worry, she has finally bridged the distance between the blazing sun that is her heart, and the Earth upon which society insists she must remain grounded.Through the struggles that ensued from her self-imposed isolation, surrounded by imagined, judgmental eyes presuming her failure from all directions, the farmer’s daughter emerged from the pressures of the earth like a diamond, shining brightly and firm in her resolve. Despite all its drawbacks, she decides that there is little choice but to persist through the asteroid field of life in hopes that a Disney fairy tale ending exists. At long last, fortunately for the farmer’s daughter and her family, hope does appear, but not in the form of a Prince Charming, but rather as a sign from the supposed heavens.Through all of her metaphorical musings and tribulations involving space, it almost becomes believable that the farmer’s daughter somehow influenced the massive octahedral diamond asteroid falling squarely, but safely upon their farmland, which she interprets as representing her journey, formation, and eventual homecoming. The farmer’s daughter proceeds to measure the area of ​​one of the rhomboidal faces of her newly found symbol of life: 90003 90103 area = 20 ft × 18 ft = 360 sq ft 90003 90002 Unfortunately for the farmer’s daughter, the appearance of the enormous diamond drew attention from all over the world, and after sufficient pressure, she succumbs to the human within her, and sells the diamond, the very representation of her life and soul, to a wealthy collector, and proceeds to live the rest of her life in lavish indulgence, abandoning her convictions, and losing herself within the black hole of society.90003 90016 90099 Common Area Units 90100 90007 90008 90157 Unit 90010 90157 Area in m 90095 2 90096 90010 90014 90008 90157 square meter 90010 90157 SI Unit 90010 90014 90008 90157 hectare 90010 90157 10,000 90010 90014 90008 90157 square kilometre (km 90095 2 90096) 90010 90157 1,000,000 90010 90014 90008 90157 square foot 90010 90157 0.0929 90010 90014 90008 90157 square yard 90010 90157 0.8361 90010 90014 90008 90157 acre 90010 90157 4,046.9 (43,560 square feet) 90010 90014 90008 90157 square mile 90010 90157 2,589,988 (640 acres) 90010 90014 90015 .90000 Area Calculator Using Maps 90001 90002 This planimeter tool can be used to measure the enclosed area of ​​a defined polyline on a map. 90003 90002 [11th July 2018] Unfortunately, due to a large price increase in back-end services, we can no longer offer some features on this page. 90003 90006 Instructions 90007 90002 To use the area calculator tool: 90003 90010 90011 Zoom and pan the map to find the area of ​​interest 90012 90011 Click on the map to place a vertices for the polyline 90012 90011 Click as many time as necessary to define the polyline 90012 90017 90002 The area enclosed will them be output in square meters and square kilometers 90003 90002 You can click the [Delete Last Point] button if you make a mistake or click [Clear All] points to remove all points from the map and start again.90003 90002 You can also reposition the markers after they have been placed on the map by dragging and dropping them. 90003 90002 To draw a new area click the [Start a New Area] button or press Alt + n 90003 90006 Information 90007 90002 The area calculator tool allows you to find out the area that is enclosed inside a closed polyline overlaid on a map. 90003 90006 Benchmarks 90007 90002 90033 90003 90002 A measurement of Lough Neagh in Northern Ireland. Lough Neagh is reported to have a surface area of ​​388 km² [1], so the reading of 380 823 442m² is not far off.90003 90006 Future Uses and Ideas 90007 90010 90011 Allow the user to change the colour of the polylines and area shading (including transparent) 90012 90011 Allow the area to be saved for later use 90012 90011 Export to KML option 90012 90017 90006 Version History 90007 90010 90011 17th June 2015 — Markers now show their lat / lng when you hover over them 90012 90011 18th December 2014 року — Total area is now calculated 90012 90011 23rd March 2014 року — Added Hectares output 90012 90011 6th August 2013 — Issue with perimeter output fixed 90012 90011 21st February 2013 — Added square feet output 90012 90011 8th January 2012 — Upgraded to Google Maps API V3 and some new features 90012 90011 20th July 2010 — Added crosshairs and option to switch on / off crosshairs 90012 90011 17th June 2010 — Added upload KML option (beta) 90012 90011 2nd June 2010 — Moved the scale control to the top of map to stop conflict with Google Search bar 90012 90011 2nd February 2010 — Added perimeter output in meters and kilometers 90012 90011 25th March Рік випуску 2008 — Draggable markers, ability to click inside polygon and output in acres added 90012 90011 26th June 2007 — Basic area calculation added 90012 90011 24th June 2007 — Page created 90012 90017 .90000 Area Calculator — Outline a property on a google map and find its area 90001 90002 Return to this radius map here, just save this link 90003 90002 Enter an address or zoom into the map then click on the starting point of your shape. Continue to click along the outside edge of the shape you want to calculate the area of. As you add points the area will be updated below and converted into acres, square feet, meter, kilometers and miles.It will also show the perimeter of the shape. This tool is useful for finding the approximate acreage or a tract of land, the square footage of a roof, or any other instance where you need a good estimate of the area of ​​something. If you would like this tool on your website use our area calculator embed tool or contact us for details. To return to this area map use the link provided at the bottom of the page. . 90003 90006 Acreage Calculator — Measure the area of ​​a plot of land 90007 90002 The easiest way to measure the acreage of a plot of land is to start by entering an address that is associated with the plot of land you need the area of.In rural areas where an address may not be available, you can enter the cross street or even the GPS coordinate of a point on the land. For GPS coordinates be sure to enter the latitude followed a comma then the longitude ex. (41.87811, -87.629798). In any case this will place a marker that you can use as a reference point to draw the area on the map. Once you are finished drawing the area calculator will display the area of ​​the shape above the map. 90003 90006 How to use the google maps area calculator tool to measure a roof 90007 Special precautions must be taken when measuring the area of ​​a roof.The images that appear on google maps are often at a slight angle, which combined with the angle of a roof can cause errors. For this reason it is best to outline the roof at points which are all at the same elevation. On a simple house for instance you would only click on the corners of the roof and not on any points along the peak as that would cause an error. After measuring the area of ​​the footprint you can estimate the actual roof area based on the angle of the roof. Similarly if you using the area calculator tool to measure a roof with multiple levels, you should do the individual section separately.The google maps area calculator is not 100% accurate. Do not rely on this tool as your only resource in making important decisions. 90006 Measure perimeter 90007 We now also include the perimeter of the shape that you draw along with the area. This can help you to measure the the edge of a lawn, or the length of a fence 90014 .90000 Long Division Calculator with Remainders 90001 90002 Calculator Use 90003 90004 Divide two numbers, a dividend and a divisor, and find the answer as a quotient with a remainder. Learn how to solve long division with remainders, or practice your own long division problems and use this calculator to check your answers. 90005 90004 Long division with remainders is one of two methods of doing long division by hand.It is somewhat easier than solving a division problem by finding a quotient answer with a decimal. If you need to do long division with decimals use our Long Division with Decimals Calculator. 90005 90008 What Are the Parts of Division 90003 90004 For the division sentence 487 ÷ 32 = 15 R 7 90005 90012 90013 487 is the dividend 90014 90013 32 is the divisor 90014 90013 15 is the quotient part of the answer 90014 90013 7 is the remainder part of the answer 90014 90021 90004 90023 90005 90008 How to do Long Division With Remainders 90003 90004 From the example above let’s divide 487 by 32 showing the work.90005 90029 Set up the division problem with the long division symbol or the long division bracket. 90004 Put 487, the dividend, on the inside of the bracket. The dividend is the number you’re dividing. 90031 Put 32, the divisor, on the outside of the bracket. The divisor is the number you’re dividing by.90005 90033 Divide the first number of the dividend, 4 by the divisor, 32. 90004 4 divided by 32 is 0, with a remainder of 4. You can ignore the remainder for now. 90005 90036 Put the 0 on top of the division bracket.90031 This is the beginning of the quotient answer. 90004 Next, multiply 0 by the divisor 32 and insert the result 0 below the first number of the dividend inside the bracket. 90005 90004 0 * 32 = 0 90005 90042 Draw a line under the 0 and subtract 0 from 4.90004 4 — 0 = 4 90005 90045 90004 Bring down the next number of the dividend and insert it after the 4 so you have 48. 90005 90048 Divide 48 by the divisor, 32.The answer is 1. You can ignore the remainder for now. 90004 48 ÷ 32 = 1 90005 90004 Note that you could skip all of the previous steps with zeros and jump straight to this step. You just need to realize how many digits in the dividend you need to skip over to get your first non-zero value in the quotient answer. In this case you could divide 32 into 48 straight away. 90005 90053 Put the 1 on top of the division bar, to the right of the 0.Next, multiply 1 by 32 and write the answer under 48. 90004 1 * 32 = 32 90005 90056 Draw a line and subtract 32 from 48. 90004 48 — 32 = 16 90005 90059 90004 Bring down the next number from the dividend and insert it after the 16 so you have 167.90005 90062 Divide 167 by the 32. See a pattern emerging? 90004 167 ÷ 32 is 5 with a remainder of 7 90005 90065 Put the 5 on top of the division bar, to the right of the 1.Multiply 5 by 32 and write the answer under 167. 90004 5 * 32 = 160 90005 90068 Draw a line and subtract 160 from 167. 90004 167 — 160 = 7 90005 90068 Since 7 is less than 32 your long division is done.You have your answer: The quotient is 15 and the remainder is 7. 90004 So, 487 ÷ 32 = 15 with a remainder of 7 90005 90004 For longer dividends, you would continue repeating the division and multiplication steps until you bring down every digit from the divdend and solve the problem. 90005 90008 Further Reading 90003 90004 At 90079 Ask Dr.Math 90080 you can find Instructions for Long Division for simple and more advanced long division problems. 90005 90004 90079 Math is Fun 90080 also provides a step-by-step process for long division with Long Division with Remainders. 90005 .