547

In the pyplot document for scatter plot:

matplotlib.pyplot.scatter(x, y, s=20, c='b', marker='o', cmap=None, norm=None,
                          vmin=None, vmax=None, alpha=None, linewidths=None,
                          faceted=True, verts=None, hold=None, **kwargs)

The marker size

s: size in points^2. It is a scalar or an array of the same length as x and y.

What kind of unit is points^2? What does it mean? Does s=100 mean 10 pixel x 10 pixel?

Basically I'm trying to make scatter plots with different marker sizes, and I want to figure out what does the s number mean.

7
  • 2
    pretty sure that points are the same units used for fonts.
    – tacaswell
    Feb 12, 2013 at 15:19
  • 3
    @tcaswell, you mean s=20 means the marker size equals that of a fontsize=20 letter?
    – LWZ
    Feb 12, 2013 at 19:19
  • 50
    matplotlib.pyplot.plot() has ms parameter (markersize) an equivalent for matplotlib.pyplot.scatter() parameter s (size). Just a reminder..
    – niekas
    Nov 6, 2014 at 10:08
  • 1
    @neikas it seems to me they are not, since one is in pixels (markersize) and other is in this weird squared points unit (size). This has always been confusing to me, but I believe it has to do with scatterplot marker size being used to denote amount in a visually proportional way. May 26, 2017 at 18:02
  • 3
    @heltonbiker is right on this one. If you want to match the markersize from the plot function to s from the scatter function, you need to square it, i.e. s = markersize**2.
    – Marses
    Sep 20, 2020 at 9:01

6 Answers 6

586

This can be a somewhat confusing way of defining the size but you are basically specifying the area of the marker. This means, to double the width (or height) of the marker you need to increase s by a factor of 4. [because A = WH => (2W)(2H)=4A]

There is a reason, however, that the size of markers is defined in this way. Because of the scaling of area as the square of width, doubling the width actually appears to increase the size by more than a factor 2 (in fact it increases it by a factor of 4). To see this consider the following two examples and the output they produce.

# doubling the width of markers
x = [0,2,4,6,8,10]
y = [0]*len(x)
s = [20*4**n for n in range(len(x))]
plt.scatter(x,y,s=s)
plt.show()

gives

enter image description here

Notice how the size increases very quickly. If instead we have

# doubling the area of markers
x = [0,2,4,6,8,10]
y = [0]*len(x)
s = [20*2**n for n in range(len(x))]
plt.scatter(x,y,s=s)
plt.show()

gives

enter image description here

Now the apparent size of the markers increases roughly linearly in an intuitive fashion.

As for the exact meaning of what a 'point' is, it is fairly arbitrary for plotting purposes, you can just scale all of your sizes by a constant until they look reasonable.

Hope this helps!

Edit: (In response to comment from @Emma)

It's probably confusing wording on my part. The question asked about doubling the width of a circle so in the first picture for each circle (as we move from left to right) it's width is double the previous one so for the area this is an exponential with base 4. Similarly the second example each circle has area double the last one which gives an exponential with base 2.

However it is the second example (where we are scaling area) that doubling area appears to make the circle twice as big to the eye. Thus if we want a circle to appear a factor of n bigger we would increase the area by a factor n not the radius so the apparent size scales linearly with the area.

Edit to visualize the comment by @TomaszGandor:

This is what it looks like for different functions of the marker size:

Exponential, Square, or Linear size

x = [0,2,4,6,8,10,12,14,16,18]
s_exp = [20*2**n for n in range(len(x))]
s_square = [20*n**2 for n in range(len(x))]
s_linear = [20*n for n in range(len(x))]
plt.scatter(x,[1]*len(x),s=s_exp, label='$s=2^n$', lw=1)
plt.scatter(x,[0]*len(x),s=s_square, label='$s=n^2$')
plt.scatter(x,[-1]*len(x),s=s_linear, label='$s=n$')
plt.ylim(-1.5,1.5)
plt.legend(loc='center left', bbox_to_anchor=(1.1, 0.5), labelspacing=3)
plt.show()
7
  • 3
    I'm probably misunderstanding your point, but in your second example you are increasing s exponentially (s=[20, 40, 80, 160, 320, 640]) and saying that that gives us a nice linear-looking size increase. Wouldn't it make more sense if increasing the size linearly (ex. s=[20, 40, 60, 80, 100, 120]) gave us the linear-looking result?
    – Emma
    Oct 22, 2013 at 20:20
  • @Emma Your intuition is right, it's poor wording on my part (alternatively poor choice of x axis scaling). I explained some more in an edit because it was too long for a comment.
    – Dan
    Oct 22, 2013 at 22:00
  • 1
    Is it possible to change s value according to the size of figure window? I mean, if we maximize the figure windows, I'd like to have bigger size marks.
    – Sigur
    May 10, 2017 at 17:35
  • 2
    Great example (just the necessary stuff!). This should not be 4 ** n and 2 ** n, but n ** 4 and n ** 2. With 2 ** n the second plot does not scale linearly in terms of circle diameter. It still goes too fast (just not that much over the top). Jun 13, 2019 at 11:35
  • 1
    To put it shorter - the second plot shows square root of exponential - which is another exponential, just a bit less steep. Jun 13, 2019 at 11:39
317

Because other answers here claim that s denotes the area of the marker, I'm adding this answer to clearify that this is not necessarily the case.

Size in points^2

The argument s in plt.scatter denotes the markersize**2. As the documentation says

s : scalar or array_like, shape (n, ), optional
size in points^2. Default is rcParams['lines.markersize'] ** 2.

This can be taken literally. In order to obtain a marker which is x points large, you need to square that number and give it to the s argument.

So the relationship between the markersize of a line plot and the scatter size argument is the square. In order to produce a scatter marker of the same size as a plot marker of size 10 points you would hence call scatter( .., s=100).

enter image description here

import matplotlib.pyplot as plt

fig,ax = plt.subplots()

ax.plot([0],[0], marker="o",  markersize=10)
ax.plot([0.07,0.93],[0,0],    linewidth=10)
ax.scatter([1],[0],           s=100)

ax.plot([0],[1], marker="o",  markersize=22)
ax.plot([0.14,0.86],[1,1],    linewidth=22)
ax.scatter([1],[1],           s=22**2)

plt.show()

Connection to "area"

So why do other answers and even the documentation speak about "area" when it comes to the s parameter?

Of course the units of points**2 are area units.

  • For the special case of a square marker, marker="s", the area of the marker is indeed directly the value of the s parameter.
  • For a circle, the area of the circle is area = pi/4*s.
  • For other markers there may not even be any obvious relation to the area of the marker.

enter image description here

In all cases however the area of the marker is proportional to the s parameter. This is the motivation to call it "area" even though in most cases it isn't really.

Specifying the size of the scatter markers in terms of some quantity which is proportional to the area of the marker makes in thus far sense as it is the area of the marker that is perceived when comparing different patches rather than its side length or diameter. I.e. doubling the underlying quantity should double the area of the marker.

enter image description here

What are points?

So far the answer to what the size of a scatter marker means is given in units of points. Points are often used in typography, where fonts are specified in points. Also linewidths is often specified in points. The standard size of points in matplotlib is 72 points per inch (ppi) - 1 point is hence 1/72 inches.

It might be useful to be able to specify sizes in pixels instead of points. If the figure dpi is 72 as well, one point is one pixel. If the figure dpi is different (matplotlib default is fig.dpi=100),

1 point == fig.dpi/72. pixels

While the scatter marker's size in points would hence look different for different figure dpi, one could produce a 10 by 10 pixels^2 marker, which would always have the same number of pixels covered:

enter image description here enter image description here enter image description here

import matplotlib.pyplot as plt

for dpi in [72,100,144]:

    fig,ax = plt.subplots(figsize=(1.5,2), dpi=dpi)
    ax.set_title("fig.dpi={}".format(dpi))

    ax.set_ylim(-3,3)
    ax.set_xlim(-2,2)

    ax.scatter([0],[1], s=10**2, 
               marker="s", linewidth=0, label="100 points^2")
    ax.scatter([1],[1], s=(10*72./fig.dpi)**2, 
               marker="s", linewidth=0, label="100 pixels^2")

    ax.legend(loc=8,framealpha=1, fontsize=8)

    fig.savefig("fig{}.png".format(dpi), bbox_inches="tight")

plt.show() 

If you are interested in a scatter in data units, check this answer.

3
  • Wondering how would one calculate what s parameter to give to scatter to get a circle which covers diameter of, let's say, 0.1 in real coordinates of the plot (so as to fill the gap between let's say 0.4 and 0.5 on a plot from (0,0) to (1,1)? Dec 26, 2018 at 19:56
  • @AnatolyAlekseev That should be answered by this question. Feb 17, 2019 at 4:28
  • @ImportanceOfBeingErnest could you pls explain how to get the radius of a scatter based on the s param passed? I thought it is np.sqrt(s)/2. stackoverflow.com/q/64399664/9900084
    – steven
    Oct 17, 2020 at 15:46
33

You can use markersize to specify the size of the circle in plot method

import numpy as np
import matplotlib.pyplot as plt

x1 = np.random.randn(20)
x2 = np.random.randn(20)
plt.figure(1)
# you can specify the marker size two ways directly:
plt.plot(x1, 'bo', markersize=20)  # blue circle with size 10 
plt.plot(x2, 'ro', ms=10,)  # ms is just an alias for markersize
plt.show()

From here

enter image description here

3
  • 2
    The question was about scatterplot, and in matplotlib the two plotting functions have different parameters (markersize for plot, and s for scatter). So this answer doesn't apply.
    – Dom
    Apr 28, 2017 at 9:19
  • 3
    @Dom I upvoted, because this question pops up as the first result in google even when I search "pyplot plot marker size", so this answer helps.
    – Przemek D
    Jul 26, 2017 at 8:18
  • I know the plot method and the scatter method are different in plt but they both can realize the 'scatter plot' and adjust markersize, so this answer is just another working around if you use plot method @Dom
    – zhaoqing
    Jul 28, 2017 at 5:42
33

It is the area of the marker. I mean if you have s1 = 1000 and then s2 = 4000, the relation between the radius of each circle is: r_s2 = 2 * r_s1. See the following plot:

plt.scatter(2, 1, s=4000, c='r')
plt.scatter(2, 1, s=1000 ,c='b')
plt.scatter(2, 1, s=10, c='g')

enter image description here

I had the same doubt when I saw the post, so I did this example then I used a ruler on the screen to measure the radii.

2
  • 1
    This is the cleanest and most fat free answer. Thanks
    – Ayan Mitra
    Apr 29, 2020 at 17:13
  • +1, and indeed s is a shortcut for markersize, like c is a shortcut for color. Reference. If matplotlib documentation could be as simple as this answer instead of adding noise at each line...
    – mins
    Nov 6, 2020 at 13:55
8

I also attempted to use 'scatter' initially for this purpose. After quite a bit of wasted time - I settled on the following solution.

import matplotlib.pyplot as plt
input_list = [{'x':100,'y':200,'radius':50, 'color':(0.1,0.2,0.3)}]    
output_list = []   
for point in input_list:
    output_list.append(plt.Circle((point['x'], point['y']), point['radius'], color=point['color'], fill=False))
ax = plt.gca(aspect='equal')
ax.cla()
ax.set_xlim((0, 1000))
ax.set_ylim((0, 1000))
for circle in output_list:    
   ax.add_artist(circle)

enter image description here

This is based on an answer to this question

2
  • 1
    very helpfull. But why use two loops?
    – grabantot
    Apr 16, 2018 at 6:32
  • 1
    @grabantot no reason, just didn't think too much into it.
    – Ike
    Apr 16, 2018 at 12:04
2

If the size of the circles corresponds to the square of the parameter in s=parameter, then assign a square root to each element you append to your size array, like this: s=[1, 1.414, 1.73, 2.0, 2.24] such that when it takes these values and returns them, their relative size increase will be the square root of the squared progression, which returns a linear progression.

If I were to square each one as it gets output to the plot: output=[1, 2, 3, 4, 5]. Try list interpretation: s=[numpy.sqrt(i) for i in s]

2
  • 1
    Should be i in output shouldn't?
    – Sigur
    May 5, 2017 at 1:36
  • Agree with @Sigur May 10, 2021 at 14:30

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