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Throughout most of human history, data visualization was limited because data was limited. Then, thanks to various sciences, scads of information -- about demographics, economics, geography and weather patterns -- emerged. And people needed a way to more easily analyze all this information. By the end of the 18th century, most charts used today -- histograms, pie charts, bar and line graphs -- were already in use, introduced to the world in William Playfair's breakthrough 1786 publication, "Commercial and Political Atlas."

Playfair decided to use his draftsman’s skills to illustrate economic data. At the time, such information was commonly represented in tables, but Playfair transformed the data into infographics. In one famous line graph, he charted the price of wheat against the cost of labor, countering the popular opinion that wages were driving up grain costs and demonstrating that wages were, in fact, rising much more slowly than the product's cost.

From their humble beginnings, charts and graphs have helped audiences make educated decisions based on data, as well as identify previously unknown trends. Over the years, statisticians from all walks of life developed and designed additional tools for visually plotting data until modern technology allowed an explosion of new data visualizations that illustrate quantitative values in ways never before imagined.

To help our readers choose the best graph design to illustrate any data set, we’ve compiled a list of 44 types of graphs and the industries that they can serve. Of course, our list is far from all inclusive. Fact is, the ways in which most graphs can be used are only limited by one’s own imagination. But for starters, here are 44 of our favorite uses:

The simplest and and most straightforward way to compare various categories is often the classic column-based bar graph. The universally-recognized graph features a series of bars of varying lengths.

One axis of a bar graph features the categories being compared, while the other axis represents the value of each. The length of each bar is proportionate to the value it represents. For example, $4 could be represented by a rectangular bar four units long, while $5 would equate to a five-unit long bar. With one quick glance, audiences learn exactly how the various items size up against one another.

Bar graphs work great for visually presenting nearly any type of data, but they hold particular power in the marketing industry. The charts are commonly used to present financial forecasts and outcomes, and the graphs are ideal for comparing any sort of numeric value, including group sizes, inventories, ratings and survey responses.

Line charts, or line graphs, are powerful visual tools that illustrate trends in data over a period of time or a particular correlation. For example, one axis of the graph might represent a variable value, while the other axis often displays a timeline.

Each value is plotted on the chart, then the points are connected to display a trend over the compared time span. Multiple trends can be compared by plotting lines of various colors or patterns.

For example, the popularity of various social-media networks over the course of a year can be visually compared with ease through the use of a line graph. Simply plot each company’s user base for each month of the 12-month span, then connect the dots with a line of a designated color.

Audiences will quickly recognize which social networks are the most and least successful, as well as which are experiencing growth or loss.

Pie charts are the simplest and most efficient visual tool for comparing parts of a whole. For example, a pie chart can quickly and effectively compare various budget allocations, population segments or market-research question responses.

Marketing content designers frequently rely on pie charts to compare the size of market segments. For example, a simple pie graph can clearly illustrate how the most popular mobile-phone manufacturers compare based on the sizes of their user-bases.

Audiences can quickly understand that Apple and Samsung hold almost 75-percent of the mobile-communication market, with Apple slightly ahead. That message can be sent without printing a single numerical digit.

Basic line, bar and pie charts are excellent tools for comparing one or two variables in few categories, but what happens when you need to compare multiple variables or multiple categories at the same time? What if all those variables aren’t numeric even? A mosaic -- or Mekko -- chart plot might be the better choice.

Perhaps a market analyst, for example, wants to compare more than the size of various mobile-phone markets. What if, instead, he or she needs to compare the size of the user bases, as well as the age groups within each group? A mosaic chart would allow said marketer to illustrate all the variables in a clear and straightforward manner.

In the above example, one axis of the chart represents the categories being compared -- mobile phone manufacturers -- while the other axis lists various age ranges. The size and color of each cross-section of the chart corresponds with the market segment it represents.

Market segments are often divided based on age and gender, and a population pyramid is an ideal visual representation of the two groups. The graph classically takes on the shape of a pyramid when a population is healthy and growing -- the largest groups are the youngest, and each gender dwindles somewhat equally as the population ages, leaving the smallest groups at the top of the graph.

A population pyramid that veers away from its classic shape might indicate an irregularity in a population during a particular period, such as a famine or an economic boom that led to an increase in deaths or births.

Of course, population pyramids aren’t always used to compare populations by age, and therefore don’t always take on the graph’s namesake shape. A marketer, for example, might use the design to compare a population by income, weight or IQ, in which the smallest groups will often be at both the top and bottom. Regardless, the graph clearly depicts population trends, while it compares the sizes of two related groups.

When a statistician needs to visually compare three or more quantitative variables, he or she might choose to use a radar chart, also known as a spider or star chart. The chart usually consists of a series of radii, each representing a different category, that splay out from a center point like spokes.

The length of each “spoke” is proportionate to the value being compared. For each category, the spokes are then connected with a line of a designated pattern or color, forming a star-like shape with points equal to the number of categories. The result is a graphic representation that can reveal trends and compare categories at the same time.

Also known as a scattergram, the graph consists of two axes, each representing a set of data. For example, one axis might represent the numbers of miles driven by a vehicle, while the second axis displays the total gallons of gas used.

For each vehicle sampled, its miles-per-gallon average is represented by a dot plotted onto the graph. Once multiple dots are plotted, trends can be spotted and samples can be compared, depending on how many colors are featured in the chart.

Sometimes a statistician will need to compare more data sets than can be represented by a single graph. What if, for example, a graph needs to compare not only miles driven and gallons used, but also the number of gears and cylinders contained in each vehicle sample?

A trellis plot, also called a lattice graph or plot, can display and compare all of those variables. While the above example uses a series of scatter charts, trellis plots commonly feature series of bar or line graphs, as well.

Mathematicians, engineers and statisticians often need to determine the value of an equation by graphing its result. The graph of a function is the set of all points whose coordinates satisfy the equation.

Therefore, the function of an equation with variables of *x* and *y *would be drawn on a graph with an *x *and *y* axis. Likewise, an equation that also included a variable of *z* would need to be drawn on a three-dimensional graph with a third axis. Function graphs of common shapes are visually associated with their corresponding algebraic formulas.

A binary decision is a choice between two alternatives, so a binary-decision diagram illustrates the path from one decision to another. In computer science, binary decisions make up the Boolean data type, in which two values are associated with different actions within a process flow.

Outside of computer science, a binary-decision diagram can still be used to illustrate any process by which actions are based on a decision between two values, whether those conditions be yes or no, true or false, 1 or 0 or any other opposing choices. Ultimately, the path taken will diagram how the process flowed, from beginning to end.

Just as its name implies, a circuit diagram is a visual representation of an electrical circuit. Using simple shapes and images, the diagram illustrates the components and interconnections of a circuit, from start to finish. While the pathways and connections are accurate, the diagram does not necessarily represent a proportionate spatial construction of the circuit.

In computer science, circuit diagrams are useful in depicting data related to both hardware and software. The graphics not only pictorialize the pathways of a circuit in the literal sense, but they are also closely related to the aforementioned binary-decision diagram -- both are used to diagram programming process flows.

When studying groups of people, it’s common to compare multiple variables at once. After all, it’s enormously more useful to examine racial backgrounds, ages and gender in addition to total population. A stacked bar graph combines elements of the traditional bar graph and the pie graph to communicate totals, trends and proportions in a single illustration.

For example, rather than simply illustrating changes in global population over time with a traditional column bar graph, a stacked bar graph can also represent the racial makeup of the total population during each year and how those proportions have changed during the same period.

When presenting data with three variables, a designer might try and create a three-dimensional bar graph, but adding an additional axis can sometimes appear cluttered and unclear, especially in printed form. Instead, additional variables can be presented in a trellis -- or lattice -- format.

By combining a series of bar graphs in a modular design, additional sets of data can be easily compared. For example, a single bar graph could illustrate the political breakdown of Poland’s national elections over a period of five years. But a trellis bar graph could depict the same data set for 16 European nations.

Stacked area charts are ideal for comparing values that would normally require multiple line graphs. Each line represents a different category, and the area below each line is generally shaded a designated color so each data set can be easily compared.

For example, an area chart with one axis that represents a numeric value, and another axis that serves as a timeline, data for various categories over time can be tracked and compared with a single graphic.

All too often a designer finds him or herself with more sets of data than can be presented in a single standard graph. Fortunately, in the case of a pie chart, multiple layers of data can be presented without the need for multiple images or a trellis design.

A multi-level pie chart, for example, consists of tiers, each layer representing a separate set of data. So while it would take three traditional pie graphs to illustrate the various sources of recorded words for three different decades, a multi-level pie graph can not only take the place of all three, but it also offers a clearer visual comparison of each year’s results.

The classic Venn diagram, also known as a logic diagram, illustrates all possible logical relationships between a designated collection of sets. For example, the overlap of two circles -- one representing national government and the other state government -- visually represents those powers that are retained by both bodies.

The more circles used, the more logical conclusions that can be represented by their overlap. The combined set of all data in the diagram is known as the union, while the areas that overlap are called intersections. A Venn diagram in which the relative size and area of each shape is proportional to the size of the group it represents is known as an area-proportional or scaled Venn diagram.

Scattergrams, also known as scatter plots, are graphs that show the relationship between two or more variables. The plots use mathematical coordinates to represent two variables of a data set.

Data is displayed in a scattergram as a collection of points, each representing the value variables plotted on a horizontal and vertical axes. If points are color-coded, an additional variable can be represented in a single chart.

By plotting certain data sets, scientists can discover trends of which they might not otherwise be aware. For example, a scattergram might allow a doctor to plot patients’ resting heart rates against their body-mass index figures. The resulting graph reveals that a higher heart rate correlates with a higher BMI.

Trellis graphs allow scientists to examine complex, multi-variable data sets, comparing a greater deal of information at once. While a single line graph can illustrate monthly UFO sightings in Tennessee over an 18-year period, a trellis line graph will display the same data for all 50 states in a single graphic.

A trellis line graph is based on the same principle as its simpler counterpart, plotting trends in a dataset consisting of two variables -- numbers of UFO sightings and dates -- through use of connecting points on two axes. But by combining multiple line graphs in a modular format, an additional variable -- location -- is represented.

Sometimes a basic graph doesn’t display enough information to draw the necessary conclusion. A Pareto chart combines a bar graph with a line graph to illustrate not only categories’ individual values, but also the cumulative total of the entire set.

Pareto charts are designed to highlight the most important of a set of factors. For example, in a Pareto chart that tracks the type and frequency of food defects, the bars illustrate each type of defects’ total occurrences -- as reported on one of the charts’ axes, while the line charts the cumulative frequency of all categories, from most to least prevalent. The result is a graph that clearly reflects the most common food defects and what percentage of the whole each represents.

A radar chart, also commonly referred to as a spider chart or a star chart, displays data sets consisting of three or more variables on a two-dimensional graphic. Each variable’s quantitative value is reflected across an axis that usually starts in the chart’s center point.

As each item’s variables are charted, a line connect the points on each axis, forming an irregular polygon that may or may not resemble a star or spider web. Multiple data sets can be compared on a single radar graph by representing each with a different color, identified by labels or in an accompanying key.

A radar chart can, for example, clearly compare and illustrate the costs and outcomes of various medical procedures as they relate to multiple conditions -- all in a single graphic.

Plotting planetary conditions on a basic two-axis graph can pose a problem. The Earth, after all, is a sphere. Instead, data can be plotted on a three-axis field using variables of *x, y* and *z. *The resulting plot, if completed, will take the form of a sphere.

A spherical plot can, for example, reveal global temperature or rainfall trends by assigning each value range with a particular color, then plotting the data with points of the corresponding hue.

One of the most vital of all financial graphs, stock charts help investors track the markets to determine profits and loss, as well as make buying and selling decisions. While a variety of graphs are used to represent market changes, the most common is likely the basic line graph turned histogram.

The lines simply tracks changes in a particular stock’s or overall market’s value over a period of time. Multiple stocks can be tracked and compared at the same time by transforming the line graph into a stacked area chart or simply using multiple lines of various colors.

Oftentimes in business -- as well as other industries -- a process must be diagrammed. A flow chart allows a process to be sequenced step-by-step, from beginning to end, for the purpose of analyzing, designing, documenting or managing it. The charts can even feature multiple beginnings and ends, with countless pathways in between.

While a simple flow chart can certainly document a basic process from A to B to C, the diagrams are more frequently used to illustrate more complex sequences with multiple decisions or conditions along the way. Each time a condition is met, the chart diagrams the various options, then the path continues following each choice.

Gantt charts are special types of bar graphs used to diagram projects and schedules. The use of colored bars of varying lengths reflect not only a project’s start and end dates, but also important events, tasks, milestones and their timeframes.

Modern Gantt charts can also illustrate activities’ dependency relationships. If Team 3’s completion of task C, for example, is dependent upon the prior completion of task B by Team 2, the chart can not only reflect that relationship, but the scheduled dates and deadlines for each.

Also commonly known as a process-behavior chart, a control chart helps determine if a data set falls within a mean or predetermined control range. Frequently used in quality control processes, a typical control chart consists of points plotted on two axes, representing sample measurements.

The mean of each point is calculated, and a center line across the graph at the mean value. Then, a standard deviation from the mean is calculated using each sample. Finally, upper and lower control limits are determined and diagrammed to reflect the points at which deviation is beyond the expected standard.

Particularly useful in accounting and qualitative analysis, waterfall charts illustrate how an initial value is affected positively and negatively by various factors. For example, a waterfall chart could clearly and efficiently communicate how an opening balance changes month by month over the course of a year.

Because they often appear as though bars are floating throughout the graph, waterfall charts are sometimes referred to as floating bricks or Mario charts.

Similar in appearance to a flow chart, a hierarchical diagram, also known as an organizational chart or an organigram, illustrates the structure of an organization, as well as the relationships within it. A typical company organigram, for example, lists the CEO at the top, followed by presidents, vice presidents, managers and so on.

An organizational chart can illustrate the chain of command from any employee all the way to the top. Hierarchy diagrams are similarly used to represent pedigrees, scientific classifications, demographics and any data set with a similar breakdown.

Just as medical symptoms are rarely isolated, neither is the analysis of biometric data. After all, rarely does one statistic paint the entire medical picture.

Line graphs can reflect multiple data sets with lines of varying patterns or color. For example, a multi-line graph can illustrate changes in life expectancies of not just the population in general, but for each gender and multiple racial backgrounds.

Stacked bar graphs aren’t useful only in illustrating parts of of a whole. They can also be used to display additional variables. While a basic bar graph could represent what portion of a population is classified as overweight over a designated time period, a stacked bar graph can also track how much of the total is obese.

Following the proper process is probably more important in medicine than in any other field. After all, if the surgeon forgets a step, you might very well bleed to death while you sleep. Flow charts are frequently used by hospitals, clinics and other medical facilities to ensure proper procedures are uniformly followed.

In a pictograph, or pictogram, images and symbols are used to illustrate data. For example, a basic pictograph might use an image of the sun to signify each fair-weather day in a month and a rain cloud to symbolize each stormy day.

Because images are known to hold more emotional power than raw data, pictograms are often used to present medical data. An illustration that shades five of 20 person symbols to represent a 20-percent death rate carries a more powerful message, for example, than a bar, line or pie that illustrates the same data.

Medical diagrams are often used to illustrate anatomy, treatments or disease pathology in order to explain treatments for patients and others without an extensive biomedical background. It’s much easier to diagram how various nerves affect different bodily systems than to try and verbally explain the pathways.

While medical diagrams are considered a combination of science and art, they can be just as technical as any other quantitative graph. And no matter how detailed the drawing, anatomical diagrams are designed to clearly and efficiently present data. And just as with a complex contour diagram, the diagrams focus on key information, even if it was selected from voluminous amounts of medical or scientific data.

Just as in the cases of multi-level pie graphs, stacked bar graphs and trellis plots, multi-pie graphs paint a more detailed portrait of the data set it illustrates. While a single pie chart can display what portion of the total population has a particular condition, a multi-pie graph can break those statistics down to illustrate not only the portion of men and the portion of women, but also how the two groups compare to one another.

It can be difficult to graphically represent medical data sets that consist of hundreds -- or more -- patients, as is the case in most medical studies. But a scatter plot allows for the representation of each subject, plotted on the graph according to the variables on the chart’s two axes.

The pattern formed by the plotted dots can clearly determine trends in the data. By analyzing a scatter plot, for example, a researcher could easily identify a correlation between longer life expectancy and higher household income.

Contour plots allow for the analysis of three variables in a two-dimensional format. Instead of plotting data along two main axes, the graph presents a third value designated shading or color. Just as a topographical map plots longitude, latitude and elevation in a two-dimensional design, a contour graph illustrates values of *x, y* and *z.*

With a contour graph, for example, a climatologist can not only plot ocean’s salinity on different dates, but its salinity at various depths on those dates.

A type of contour graph, a heat map specifically charts varying temperatures at different geographical points. While the graph’s two axes are a map’s latitude and longitude, the third variable -- temperature -- is represented by a spectrum of color.

While most commonly used to illustrate weather, heat maps also can represent web traffic, financial indicators and almost any other three-dimensional data.

By combining a line graph with a scatter plot, meteorologists and other statisticians can illustrate the relationship between two data sets. For example, the high and low temperatures of each day in a month can be displayed in a scatter plot, then a line graph can be added to plot the historic average high and low temperatures over the same period.

The resulting combination graph clearly displays how the temperature range each day compares to the historic average, and it even indicates how those measurements trend over the examined time period.

Technology now allows statisticians to display multi-dimensional data sets in true form. Three-dimensional graphs created with specialized software reflect the relationship between three variables plotted across three axes. A meteorologist can, for example, graph the wind field of a hurricane.

By definition, a histogram is a special type of graph that presents numeric data and its distribution. As its name suggests, the distribution is often illustrated across time, but the data could also be plotted based on any chronological scale, such temperature, elevation or monetary value. While histograms are commonly a form of bar graph, the concept can also be applied to line graphs and other designs relying on plotting two axes.

Possibly the most self-explanatory of data visualizations, a timeline tracks data over a time period. Significant dates and events are highlighted at the point at which they appear on a chronological scale. Timelines can be used alone or in conjunction with other visualizations.

A form of hierarchical diagram, a genealogical tree illustrates the structure of a family. It can either begin with an ancestor, then diagram his or her descendants, their siblings, marriages and children, and so on. A pedigree chart, on the other hand, begins with an individual and charts their ancestry, from parents to grandparents and so on.

A type of multi-level pie chart, a sunburst chart is used to illustrate hierarchical data using concentric circles. Each ring of the “sunburst” represents a level in the hierarchy, with the root node represented by the center circle, and the hierarchy moving outward. While a sunburst chart can be used to illustrate a familiar or company hierarchy, it can also break data down by time periods, creating a historical hierarchy.

Various branches of an organization can be represented by designated hues, with different levels often taking on varying shades of the same color family. Rings can also be divided further to represent multiple divisions within the same organizational level. In fact, a traditional, complex color wheel, such as that used by paint stores, is a form of sunburst chart.

If a timeline is a form of graph, then it only makes sense that historians often employ it in displaying other data. By plotting immigration levels against a timeline, the resulting histogram illustrates population trends over a century or longer with a basic line graph.

Stacked area charts are frequently used to diagram changes of multiple variables across time. Multiple lines can be drawn, for example, to track the population changes of various states across time.

The area below each line can be colored a different hue to represent the state it signifies, resulting in a graph that clearly represents population trends, while at the same time displaying each state’s data in order from least to most populous.

*Did we miss one of your favorite graph types? Which is your favorite to create using Visme? Let us know in the comments below!*

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Some of the charts in this post are not made with Visme.

How do you make some of the charts with Visme such as the Sunburst Chart or the Timeline?

Thanks! Glad you enjoyed it. We don’t have a designated Sunburst or Timeline chart maker yet (down the road we’ll be rolling out more chart widgets), but you can create it within Visme from scratch using our pie chart tool (use several pie charts to create Sunburst) and basic lines and icons to create timeline. Here is a tutorial on how to use our new Content Blocks feature to quickly create vertical timelines: https://blog.visme.co/quick-infographic-maker/

Hi!

Great overview! I love the Gantt chart – can you please give some instructions how to do it?

Many thanks!

Thanks! Glad you enjoyed it. We don’t have a designated Gantt chart maker yet (down the road we’ll be rolling out more chart options), but you can create it within Visme from scratch using our table tool and basic shapes and icons. Here us a tutorial on how to use the table tool: https://blog.visme.co/how-to-create-tables-in-visme/

Thank you so much. This helped with my science fair project. The mekko chart helped the most. Thank you.

Hi – great page. What about a ‘wheel’ that expresses characteristics similarly to a spider chart except I want a smooth, segmented circle and each segment is ‘filled’ to different degrees depending on the quantity of certain characteristics a thing possesses. Sorry if that’s not explained well.

the information from the pyramid has greatly helped me .thank you!!!

Thanks, Victor. Glad you found it useful 🙂

Great overview of all the different chart types. How would I go about making a Waterfall chart in Visme?

Indeed very useful simple to use tools for decision making

Thanks for making these available on the internet

best wishes for your mission to share knowledge

Can You leave me your email please my name is sally davidson and i’m trying to put information into a graph and i don’t know how . I would like to email you my information so you can help me

– Sally Davidson

Hi Sally, please contact our Support section. You can detail your request here at the bottom of this page: https://support.visme.co/

Hai,

thanks I enjoy the material

Nice work. Is something wrong with the Scatter-Line Combo graph showing New Brunswick temperatures? The averages on the far right seem to be above the data being used to generate those averages.