Creating Yin and Yang Loaders On the Web

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I came across a couple such animations a while ago and this gave me the idea of creating my own versions with as little code as possible, no external libraries, using various methods, some of which take advantage of more recent features we can use these days, such as CSS variables. This article is going to guide you through the process of building these demos.

Before anything else, this is the animation we’re trying to achieve here:

Animated gif. The yin and yang symbol is rotating while its two lobes alternate increasing and decreasing in size - whenever one is increasing, it squishes the other one down.
The desired result: a rotating ☯ symbol, with its two lobes increasing and decreasing in size.

No matter what method we choose to use to recreate the above animation, we always start from the static yin and yang shape which looks as illustrated below:

The static yin and yang symbol.
The static yin and yang symbol (live demo).

The structure of this starting shape is described by the following illustration:

The structure of the yin and yang symbol. The two lobes are circular arcs (half circles) whose radii are half the radius of the big circle enclosing the symbol. The two small circles are in the middle of the two lobes and their diameters are half of those of the half circle lobes.
The structure of the static symbol (live demo).

First off, we have a big circle of diameter d. Inside this circle, we tightly fit two smaller circles, each one of them having a diameter that’s half the diameter of our initial big circle. This means that the diameter for each of these two smaller circles is equal to the big circle’s radius r (or .5*d). Inside each of these circles of diameter r we have an even smaller concentric circle. If we are to draw a diameter for the big circle that passes through all the central points of all these circles – the line segment AB in the illustration above, the intersections between it and the inner circles split it into 6 equal smaller segments. This means that the diameter of one of the smallest circles is r/3 (or d/6) and its radius is r/6.

Knowing all of this, let’s get started with the first method!

Plain old HTML + CSS

In this case, we can do it with one element and its two pseudo-elements. The how behind building the symbol is illustrated by the following animation (since the whole thing is going to rotate, it doesn’t matter if we switch axes):

See the Pen by thebabydino (@thebabydino) on CodePen.

The actual element is the big circle and it has a top to bottom gradient with a sharp transition right in the middle. The pseudo-elements are the smaller circles we place over it. The diameter of one of the smaller circles is half the diameter of the big circle. Both smaller circles are vertically middle-aligned with the big circle.

So let’s start writing the code that can achieve this!

First of all, we decide upon a diameter $d for the big circle. We use viewport units so that everything scales nicely on resize. We set this diameter value as its width and height, we make the element round with border-radius and we give it a top to bottom gradient background with a sharp transition from black to white in the middle.

$d: 80vmin;

.☯ {
  width: $d; height: $d;
  border-radius: 50%;
  background: linear-gradient(black 50%, white 0);
}

So far, so good:

See the Pen by thebabydino (@thebabydino) on CodePen.

Now let’s move on to the smaller circles which we create with pseudo-elements. We give our element display: flex and make its children (or pseudo-elements in our case) middle aligned with it vertically by setting align-items: center. We make these pseudo-elements have half the height (50%) of their parent element and make sure that, horizontally, they each cover half of the big circle. Finally, we make them round with border-radius, give them a dummy background and set the content property just so that we can see them:

.☯ {
  display: flex;
  align-items: center;
  /* same styles as before */
	
  &:before, &:after {
    flex: 1;
    height: 50%;
    border-radius: 50%;
    background: #f90;
    content: '';
  }
}

See the Pen by thebabydino (@thebabydino) on CodePen.

Next, we need to give them different backgrounds:

.☯ {
  /* same styles as before */
	
  &:before, &:after {
    /* same styles as before */
    background: black;
  }
	
  &:after { background: white }
}

Now we’re getting somewhere!

See the Pen by thebabydino (@thebabydino) on CodePen.

All that’s left to do before we get the static symbol is to give these two pseudo-elements borders. The black one should get a white border, while the white one should get a black border. These borders should be a third of the pseudo-element’s diameter, which is a third of half the diameter of the big circle – that gives us $d/6.

.☯ {
  /* same styles as before */
	
  &:before, &:after {
    /* same styles as before */
    border: solid $d/6 white;
  }
	
  &:after {
    /* same styles as before */
    border-color: black;
  }
}

However, the result doesn’t look quite right:

See the Pen by thebabydino (@thebabydino) on CodePen.

This is because, vertically, the border adds up to the height instead of being subtracted out of it. Horizontally, we haven’t set a width, so it gets subracted from the available space. We have two fixes possible here. One would be to set box-sizing: border-box on the pseudo-elements. The second one would be to change the height of the pseudo-elements to $d/6 – we’ll go with this one:

See the Pen by thebabydino (@thebabydino) on CodePen.

We now have the basic shape, so let’s move on to the animation! This animation involves going from the state where the first pseudo-element has shrunk to let’s say half its original size (which would mean a scaling factor $f of .5) while the second pseudo-element has expanded to take up all available space left – meaning to the diameter of the big circle (which is twice its original size) minus the diameter of the first circle (which is $f of its original size) to the state where the second pseudo-element has shrunk to $f of its original size and the first pseudo-element has expanded to 2 - $f of its original size. The first pseudo-element circle scales relative to its leftmost point (so we need to set a transform-origin of 0 50%), while the second one scales relative to its rightmost point (100% 50%).

$f: .5;
$t: 1s;

.☯ {
  /* same styles as before */
	
  &:before, &:after {
    /* same styles as before */
    transform-origin: 0 50%;
    transform: scale($f);
    animation: s $t ease-in-out infinite alternate;
  }
	
  &:after {
    /* same styles as before */
    transform-origin: 100% 50%;
    animation-delay: -$t;
  }
}

@keyframes s { to { transform: scale(2 - $f) } }

We now have the shape changing animation we’ve been after:

See the Pen by thebabydino (@thebabydino) on CodePen.

The last step is to make the whole symbol rotate:

$t: 1s;

.☯ {
  /* same styles as before */
  animation: r 2*$t linear infinite;
}

@keyframes r { to { transform: rotate(1turn) } }

And we got the final result!

However, there’s still one more thing we can do to make the compiled CSS more efficient: eliminate redundancy with CSS variables!

white can be written in HSL format as hsl(0, 0%, 100%). The hue and the saturation don’t matter, any value that has the lightness 100% is white, so we just set them both to 0 to make our life easier. Similarly, black can be written as hsl(0, 0%, 0%). Again, the hue and saturation don’t matter, any value that has the lightness 0% is black. Given this, our code becomes:

.☯ {
  /* same styles as before */
	
  &:before, &:after {
    /* same styles as before */
    border: solid $d/6 hsl(0, 0%, 100% /* = 1*100% = (1 - 0)*100% */);
    transform-origin: 0 /* = 0*100% */ 50%;
    background: hsl(0, 0%, 0% /* 0*100% */);
    animation: s $t ease-in-out infinite alternate;
    animation-delay: 0 /* = 0*-$t */;
  }
	
  &:after {
    /* same styles as before */
    border-color: hsl(0, 0%, 0% /* = 0*100% = (1 - 1)*100% */);
    transform-origin: 100% /* = 1*100% */ 50%;
    background: hsl(0, 0%, 100% /* = 1*100% */);
    animation-delay: -$t /* = 1*-$t */;
  }
}

From the above, it results that:

  • the x component of our transform-origin is calc(0*100%) for the first pseudo-element and calc(1*100%) for the second one
  • our border-color is hsl(0, 0%, calc((1 - 0)*100%)) for the first pseudo-element and hsl(0, 0%, calc((1 - 1)*100%)) for the second one
  • our background is hsl(0, 0%, calc(0*100%)) for the first pseudo-element and hsl(0, 0%, calc(1*100%)) for the second one
  • our animation-delay is calc(0*#{-$t}) for the first pseudo-element and calc(1*#{-$t}) for the second one

This means we can use a custom property that acts as a switch and is 0 for the first pseudo-element and 1 for the second:

.☯ {
  /* same styles as before */
	
  &:before, &:after {
    /* same styles as before */
    --i: 0;
    border: solid $d/6 hsl(0, 0%, calc((1 - var(--i))*100%));
    transform-origin: calc(var(--i)*100%) 50%;
    background: hsl(0, 0%, calc(var(--i)*100%));
    animation: s $t ease-in-out calc(var(--i)*#{-$t}) infinite alternate;
  }
	
  &:after { --i: 1 }
}

This eliminates the need for witing all these rules twice: all we need to do now is flip the switch! Sadly, this only works in WebKit browsers for now because Firefox and Edge don’t support using calc() as an animation-delay value and Firefox doesn’t support using it inside hsl() either.

Update: Firefox 57+ supports calc() as an animation-delay value and Firefox 59+ also supports using it inside hsl().

Canvas + JavaScript

While some people might think this method is overkill, I really like it because it requires about the same amount of code as the CSS one, it has good support and good performance.

We start with a canvas element and some basic styles just to put it in the middle of its container (which is the body element in our case) and make it visible. We also make it circular with border-radius so that we simplify our job when drawing on the canvas.

$d: 80vmin;

body {
  display: flex;
  justify-content: center;
  align-items: center;
  height: 100vh;
  background: lightslategray;
}

canvas {
  width: $d; height: $d;
  border-radius: 50%;
  background: white;
}

So far, so good – we have a white disc:

See the Pen by thebabydino (@thebabydino) on CodePen.

Alright, now let’s move on to the JavaScript part! Before anything else, we need to get the canvas element, the 2D context and set the canvas element’s width and height attributes (things we draw on the canvas would appear stretched otherwise). Then, we’re going to need to have a radius for our big circle. We get this radius to be half the computed size of the canvas element and, after we do that, we translate our context such that we bring the 0,0 point of our canvas dead in the middle (it’s originally in the top left corner). We make sure we recompute the radius and the width and height attributes on each resize because, in the CSS, we made the canvas dimensions depend on the viewport.

const _C = document.querySelector('canvas'), 
      CT = _C.getContext('2d');

let r;

function size() {
  _C.width = _C.height = Math.round(_C.getBoundingClientRect().width);
	
  r = .5*_C.width;
	
  CT.translate(r, r);
};

size();

addEventListener('resize', size, false);

After we’ve done this, we can move on to drawing on the canvas. Draw what? Well, a shape made out of three arcs, as shown in the illustration below:

Illustration showing how half of the main shape of the symbol is made up of three half circle arcs. The first arc is half a circle following the contour of the symbol's outer circle shape, clockwise from -180° to 0°. The second one is another half a circle of half the radius of the first, going clockwise from the point where the previous arc started, 0° on its smaller support circle to 180° on the same circle. The third one is another half circle, going anticlockwise from the point where the previous arc ended, 0° on its support circle, to -180° on its support circle.
The structure of the three arc shape (live demo).

In order to draw an arc on a 2D canvas, we need to know a few things. First off, it’s the coordinates of the central point of the circle this arc belongs to. Then we need to know the radius of this circle and the angles (relative to the x axis of the local coordinate system of the circle) at which the start and end points of the arc are located. Finally, we need to know if we go from the start point to the end point clockwise or not (if we don’t specify this, the default is clockwise).

The first arc is on the big circle whose diameter is equal to the canvas dimensions and, since we’ve placed the 0,0 point of the canvas right in the middle of this circle, this means we know both the first set of coordinates (it’s 0,0) and the circle radius (it’s r). The start point of this arc is the leftmost point of this circle – this point is at -180° (or ). The end point is the rightmost point of the circle, which is at (also 0 in radians). If you need a refresher of angles on a circle, check out this helper demo.

This means we can create a path and add this arc to it and, in order to see what we have so far, we can close this path (which in this case means connecting the end point of our arc to the start point with a straight line) and fill it (using the default fill, which is black):

CT.beginPath();
CT.arc(0, 0, r, -Math.PI, 0);

CT.closePath();
CT.fill();

The result can be seen in the following Pen:

See the Pen by thebabydino (@thebabydino) on CodePen.

Now let’s move on to the second arc. The coordinates of the central point of the circle it’s on are .5*r,0 and its radius is .5*r (half the radius of the big circle). It goes from 0 to π, moving clockwise in doing so. So the arc we add to out path before closing it is:

CT.arc(.5*r, 0, .5*r, 0, Math.PI);

After adding this arc, our shape becomes:

See the Pen by thebabydino (@thebabydino) on CodePen.

Now we have one more arc left to add. The radius is the same as for the previous one (.5*r) and the first set of coordinates is -.5*r,0. This arc goes from 0 to and it’s the first arc not to go clockwise, so we need to change that flag:

CT.arc(-.5*r, 0, .5*r, 0, -Math.PI, true);

We now have the shape we wanted:

See the Pen by thebabydino (@thebabydino) on CodePen.

Next, we’re going to add the black circle to this path. We’re not going to create another path because the aim is to group all shapes with the same fill into the same path for better performance. Calling fill() is expensive, so we don’t want to do it more often than we really need to.

A circle is just an arc from to 360° (or from 0 to 2*π). The central point of this circle coincides to that for the last arc we’ve drawn (-.5*r, 0) and its radius is a third of that of the previous two arcs.

CT.arc(-.5*r, 0, .5*r/3, 0, 2*Math.PI);

Now we’re getting really close to having the full symbol:

See the Pen by thebabydino (@thebabydino) on CodePen.

All that’s left to do is create a white circle, symmetrical to the black one with respect to the y axis. This means need to switch to a white fill, start a new path and then add an arc to it using almost the same command we used to add the black circle shape – the only difference is that we reverse the sign of the x coordinate (this time, it’s +, not -). After that, we close that path and fill it.

CT.fillStyle = 'white';
CT.beginPath();
CT.arc(.5*r, 0, .5*r/3, 0, 2*Math.PI);
CT.closePath();
CT.fill();

We now have the static symbol!

See the Pen by thebabydino (@thebabydino) on CodePen.

For the animation, we want to go from the state where the first of the smaller arcs has shrunk to half is original radius (so we use a scaling factor F of .5) and the other one has expanded accordingly to the state where these initial radii are reversed.

In the initial state, given that the radius of the smaller arcs is initially .5*r, then the radius of the first of them after being scaled down by a factor F is r1 = F*.5*r. Since the radii of the smaller circles need to add up to the radius of the big circle r, we have that the radius of the second one of the smaller circles is r2 = r - r1 = r - F*.5*r.

In order to get the x coordinate of the origin of the first smaller arc for the initial state, we need to subtract its radius from the x coordinate of the point it starts at. This way, we get that this coordinate is r - r1 = r2. Similarly, in order to get the x coordinate of the origin of the second smaller arc, we need to add up its radius to the coordinate of the point it ends at. This way, we get that this coordinate is -r + r2 = -(r - r2) = -r1.

Initial vs. final state of the animation. The initial state shows the first lobe (second arc of the three arc shape) shrunken to the minimum possible (its radius being F*.5*r, where F is a value between 0 and 1), while the other lobe has expanded to fill the remaining state. In the final state, things are reversed: the first lobe has expanded, while the second one has shrunk.
The initial vs. the final state of the animation (live demo).

For the final state, the values of the two radii are reversed. The second one is F*.5*r, while the first one is r - F*.5*r.

With every frame of our animation, we increase the current radius of the first smaller arc from the minimum value (F*.5*r) to the maximum value (r - F*.5*r) and then we start decreasing it to the minimum value and then the cycle repeats while also scaling the radius of the other smaller arc accordingly.

In order to do this, we first set the minimum and maximum radius in the size() function:

const F = .5;

let rmin, rmax;

function size() {
  /* same as before */
  rmin = F*.5*r;
  rmax = r - rmin;
};

At any moment in time, the current radius of the first of the smaller arcs is k*rmin + (1 - k)*rmax, where this k factor keeps going from 1 to 0 and then back up to 1. This sounds similar to the cosine function on the [0, 360°] interval. At , the value of the cosine is 1. Then it starts decreasing and it keeps doing so until it gets to 180°, when it reaches its minimum value of -1, after which the value of the function starts increasing again until it gets to 360°, where it’s again 1:

See the Pen by thebabydino (@thebabydino) on CodePen.

Alright, but the values of the cosine function are in the [-1, 1] interval and we need a function that gives us values in the [0, 1] interval. Well, if we add 1 to the cosine, then we shift the whole graph up and the values are now in the [0, 2] interval:

See the Pen by thebabydino (@thebabydino) on CodePen.

[0, 2] isn’t [0, 1], so what we still need to do here is divide the whole thing by 2 (or multiply it with .5, same thing). This squishes our graph to the desired interval.

See the Pen by thebabydino (@thebabydino) on CodePen.

Good, but what’s up with that angle? We don’t have an angle going from to 360°. If we’re going to use requestAnimationFrame, we just have the number of the current frame, which starts at 0 and then keeps going up. Well, at the beginning, we set a total number of frames T for one animation cycle (the first arc going from the minimum radius value to the maximum radius value and then back again).

For every frame, we compute the ratio between the number of the current frame (t) and the total numeber of frames. For one cycle, this ratio goes from 0 to 1. If we multiply this ratio with 2*Math.PI (which is the same as 360°), then the result goes from 0 to 2*Math.PI over the course of a cycle. So this is going to be our angle.

const T = 120;

(function ani(t = 0) {
  let k = .5*(1 + Math.cos(t/T*2*Math.PI)), 
      cr1 = k*rmin + (1 - k)*rmax, cr2 = r - cr1;
	
})();

The next step is to put inside this function the code that actually draws our symbol. The code for beginning, closing, filling paths, changing fills stays the same, as does the code needed for creating the big arc. The things that change are:

  • the radii of the smaller arcs – they’re cr1 and cr2 respectively
  • the x coordinates of the central points for the smaller arcs – they’re at cr2 and -cr1 respectively
  • the radii of the black and white circles – they’re cr2/3 and cr1/3 respectively
  • the x coordinates of the central points of these circles – they’re at -cr1 and cr2 respectively

So our animation function becomes:

const T = 120;

(function ani(t = 0) {
  let k = .5*(1 + Math.cos(t/T*2*Math.PI)), 
      cr1 = k*rmin + (1 - k)*rmax, cr2 = r - cr1;
	
  CT.beginPath();
  CT.arc(0, 0, r, -Math.PI, 0);
  CT.arc(cr2, 0, cr1, 0, Math.PI);
  CT.arc(-cr1, 0, cr2, 0, -Math.PI, true);
  CT.arc(-cr1, 0, cr2/3, 0, 2*Math.PI);
  CT.closePath();
  CT.fill();

  CT.fillStyle = 'white';
  CT.beginPath();
  CT.arc(cr2, 0, cr1/3, 0, 2*Math.PI);
  CT.closePath();
  CT.fill();
})();

This gives us the initial state of the animation:

See the Pen by thebabydino (@thebabydino) on CodePen.

Before we actually start animating the radii of the arcs, we still need to take care of a couple more things. First of all, if we start the animation right now, we’re just going to be drawing how the shape looks for each frame over what we’ve drawn for the previous frames, which is going to create one big mess. In order to avoid this, we need to clear the canvas for each frame, before drawing anything on it. What we clear is the visible part, which is inside the rectangle of canvas dimensions whose top left corner is at -r,-r:

CT.clearRect(-r, -r, _C.width, _C.width);

The second little problem we need to fix is that we’re switching to a white fill, but at the start of the next frame, we need a black one. So we need to make this switch for each frame before the beginning of the first path:

CT.fillStyle = 'black';

Now we can actually start the animation:

requestAnimationFrame(ani.bind(this, ++t));

This gives us the morphing animation, but we still need to rotate the whole thing. Before tackling that, let’s look at the formula for k once more:

let k = .5*(1 + Math.cos(t/T*2*Math.PI))

T and 2*Math.PI are constant throughout the animation, so we can just take that part out and store it as a constant angle A:

const T = 120, A = 2*Math.PI/T;

(function ani(t = 0) {
  let k = .5*(1 + Math.cos(t*A));

  /* same as before */
})();

Now for every frame, we can also rotate the context by A after clearing the canvas.

CT.rotate(A);

This rotation keeps adding up with every frame and we now have the rotating and morphing animation we’ve been after.

SVG + JavaScript

We start with an SVG element and pretty much the same CSS as in the canvas case:

$d: 80vmin;

body {
  display: flex;
  justify-content: center;
  align-items: center;
  height: 100vh;
  background: lightslategray;
}

svg {
  width: $d; height: $d;
  border-radius: 50%;
  background: white;
}

This gives us a white disc:

See the Pen by thebabydino (@thebabydino) on CodePen.

Not too exciting, so let’s move on to drawing something on the SVG canvas. Just like in the canvas case, we’ll be drawing a path made up of the same three arcs (the big one with a radius that’s half the size of the SVG viewBox and the two smaller ones with a radius that’s half of that of the big arc in the static case) and two small circles (with a radius that’s a third of that of the smaller arc they share their central point with).

So we start by picking a radius r value and using it to set the viewBox on the svg element:

- var r = 1500;

svg(viewBox=[-r, -r, 2*r, 2*r].join(' '))

The next step is to add the path made up of the three arcs. Creating a path in SVG is a bit different from canvas. Here, the shape is described by the path data d attribute, which, in our case, is made up of:

  • a “move to” (M) command after which we specify the coordinates of the start point of our path (also the start point of the big arc in this case)
  • an “arc to” (A) command for each of our arcs after which we describe our arcs; each of these arcs starts from the end point of the previous arc or, in the case of the first arc, from the start point of our path

Let’s take a closer look at the components of an “arc to” (A) command:

  • the radius of our arc along the x axis of its system of coordinates – this is equal to r in the case of the big arc and to .5*r in the case of the two smaller ones
  • the radius of our arc along the y axis of its system of coordinates – this is equal to the one along the x axis in the case of circular arcs as we have here (it’s only different for elliptical arcs, but that’s beyond the scope of this article)
  • the rotation of our arc’s system of coordinates – this only influences the arc’s shape in the case of elliptical arcs, so we can safely always take it 0 to simplify things for circular arcs
  • the large arc flag – this is 1 if our arc is greater than half a circle and 0 otherwise; since our arcs are exactly half a circle, they’re not greater than haf a circle, so this is always 0 in our case
  • the sweep flag – this is 1 if the arc goes clockwise between its start and its end point and 0 otherwise; in our case, the first two arcs go clockwise, while the third doesn’t, so the values we use for the three arcs are 1, 1 and 0
  • the x coordinate of the arc’s end point – this is something we need to determine for each arc
  • the y coordinate of the arc’s end point – also something we need to determine for each arc

At this point, we already know most of what we need. All we still have to figure out are the coordinates of the arcs’ endpoints. So let’s consider the following illustration:

Illustration showing how half of the main shape of the symbol is made up of three half circle arcs. The first arc is half a circle following the contour of the symbol's outer circle shape, clockwise from (-r,0) to (r,0). The second one is another half a circle of half the radius of the first, going clockwise from the point where the previous arc started to (0,0). The third one is another half circle of the same radius as the previous one, going anticlockwise from the point where the previous arc ended to (-r,0).
The structure of the three arc shape with coordinates of arc endpoints (live demo).

From the illustration above we can see that the first arc (the big one) starts at (-r,0) and ends at (r,0), the second one ends at 0,0 and the third one ends at (-r,0) (also the start point of our path). Note that the y coordinates of all these points remain 0 even if the smaller arcs’ radii change, but the x coordinate of the second arc’s endpoint only happens to be 0 in this case when the radii of the smaller arcs are exactly half of the big one. In the general case, it’s r - 2*r1, where r1 is the radius of the second arc (the first of the smaller ones). This means we can now create our path:

- var r1 = .5*r, r2 = r - r1;

path(d=`M${-r} 0
        A${r} ${r} 0 0 1 ${r} 0
        A${r1} ${r1} 0 0 1 ${r - 2*r1} 0
        A${r2} ${r2} 0 0 0 ${-r} 0`)

This gives us the three arc shape we’ve been after:

See the Pen by thebabydino (@thebabydino) on CodePen.

Now let’s move on to the small circles. We already know the coordinates of their central points and their radii from the canvas method.

circle(r=r1/3 cx=r2)
circle(r=r2/3 cx=-r1)

By default, all these shapes have a black fill so we need to explicitly set a white one on the circle at (r2,0):

circle:nth-child(2) { fill: white }

We now have the static shape!

See the Pen by thebabydino (@thebabydino) on CodePen.

Next, we’re going to animate the shape of our path and the size and position of our two small circles using JavaScript. This means that the first thing we do is get these elements, get the radius R of the big circle and set a scaling factor F that gives us the minimum radius (RMIN) down to which the arcs can be scaled. We also set a total number of frames (T) and a unit angle (A).

const _P = document.querySelector('path'), 
      _C = document.querySelectorAll('circle'), 
      _SVG = document.querySelector('svg'), 
      R = -1*_SVG.getAttribute('viewBox').split(' ')[0], 
      F = .25, RMIN = F*R, RMAX = R - RMIN, 
      T = 120, A = 2*Math.PI/T;

The animation function is pretty much the same as in the canvas case. The only thing that’s different is the fact that now, in order to change the path shape, we change its d attribute and, in order to change the small circles’ radii and positions, we change their r and cx attributes. But everything else works exactly the same way:

(function ani(t = 0) {
  let k = .5*(1 + Math.cos(t*A)), 
      cr1 = k*RMIN + (1 - k)*RMAX, cr2 = R - cr1;
	
  _P.setAttribute('d', `M${-R} 0
                        A${R} ${R} 0 0 1 ${R} 0
                        A${cr1} ${cr1} 0 0 1 ${R - 2*cr1} 0
                        A${cr2} ${cr2} 0 0 0 ${-R} 0`);
  _C[0].setAttribute('r', cr1/3);
  _C[0].setAttribute('cx', cr2);
  _C[1].setAttribute('r', cr2/3);
  _C[1].setAttribute('cx', -cr1);
	
  requestAnimationFrame(ani.bind(this, ++t));
})();

This gives us the morphing shape:

See the Pen by thebabydino (@thebabydino) on CodePen.

There’s just one more thing to take care of and that’s the rotation of the whole symbol, which we set on the _SVG element:

let ca = t*A;

_SVG.style.transform = `rotate(${+ca.toFixed(2)}rad)`;

And we now have the desired result with SVG and JavaScript as well!

SVG + CSS

There’s one more method of doing this, although it involves changing things like the path data from CSS, which is something only Blink browsers support at this point (and they’re not even matching the latest spec).

It’s also a bit breakable because we need to have the same radius value both in the SVG viewBox attribute and as a Sass variable.

- var r = 1500;

svg(viewBox=[-r, -r, 2*r, 2*r].join(' '))
  path
  circle
  circle
$d: 65vmin;
$r: 1500;
$r1: .5*$r;
$r2: $r - $r1;
$rmin: .25*$r;
$rmax: $r - $rmax;

We could access the value of this radius from the CSS, but only as a custom property, if we were to do something like this:

- var r = 1500;

svg(viewBox=[-r, -r, 2*r, 2*r].join(' '))
  style :root { --r: #{r} }

However, while this may be very helpful in some cases, it is useless here, as we currently have no way of putting CSS variables into the path data string we build with Sass. So we’re stuck with having to set the same value both in the viewBox attribute and in the Sass code.

The basic styles are the same and we can create the path data with Sass in a way that’s similar to the Pug method:

$r: 1500;
$r1: .5*$r;
$r2: $r - $r1;

path {
  $data: 'M#{-$r} 0' + 
         'A#{$r} #{$r} 0 0 1 #{$r} 0' +
         'A#{$r1} #{$r1} 0 0 1 #{$r - 2*$r1} 0' + 
         'A#{$r2} #{$r2} 0 0 0 #{-$r} 0';
  d: path($data);
}

This gives us our three arcs shape:

Screenshot of the three arcs shape
The three arcs shape (live demo, Blink only).

For the two small circles, we set their radii and positions along the x axis. We also need to make sure one of them is white:

circle {
  r: $r1/3;
  cx: $r2;
	
  &:nth-child(2) { fill: white }
	
  &:nth-child(3) {
    r: $r2/3;
    cx: -$r1
  }
}

We now have the static shape:

Screenshot of the static yin and yang shape.
The static yin and yang shape (live demo, Blink only).

In order to get the effect we’re after, we need the following animations:

  • a morphing animation of the path shape, where the radius of the first of the smaller arcs goes from the minimum possible radius ($rmin: .25*$r) to the maximum possible one ($rmax: $r - $rmin) and then back, while the radius of the last arc goes from $rmax to $rmin and back again; this can be done with a keyframe animation from one extreme to the other and then using the alternate value for animation-direction
  • another alternating animation that scales the radius of the first small circle from $rmin/3 up to $rmax/3 and then back down to $rmin/3 again; the second small circle uses the same animation only delayed by the value of a normal animation-duration
  • a third alternating animation that moves the central points of the two small circles back and forth; in the case of the first (white) small circle, it moves from $rmax down to $rmin; in the case of the second (black) circle, it goes from -$rmin down to -$rmax; what we can do here to unify them is use a CSS variable as a switch (it only works in WebKit browsers, but setting the path data or the circle radii or offsets from the CSS doesn’t have better support either)

So let’s first see the morphing @keyframes. These are created by setting pretty much the same path data as before, only replacing $r1 with $rmin and $r2 with $rmax for the 0% keyframe and the other way around for the 100% one:

@keyframes m {
  0% {
    $data: 'M#{-$r} 0' + 
           'A#{$r} #{$r} 0 0 1 #{$r} 0' +
           'A#{$rmin} #{$rmin} 0 0 1 #{$r - 2*$rmin} 0' + 
           'A#{$rmax} #{$rmax} 0 0 0 #{-$r} 0';
    d: path($data);
  }
  100% {
    $data: 'M#{-$r} 0' + 
           'A#{$r} #{$r} 0 0 1 #{$r} 0' +
           'A#{$rmax} #{$rmax} 0 0 1 #{$r - 2*$rmax} 0' + 
           'A#{$rmin} #{$rmin} 0 0 0 #{-$r} 0';
    d: path($data);
  }
}

Now we just need to set this animation on the path element:

$t: 1s;

path { animation: m $t ease-in-out infinite alternate }

And the shape morphing part works!

Animated gif. Shows the three arcs shape morphing from the state where the first lobe is the minimal one to the state where the second one is minimal.
The three arcs shape morphing (live demo, Blink only).

Next step is to move on to scaling and moving the two small circles. The scaling @keyframes follow the same pattern as the morphing ones. The radius value is $rmin/3 at 0% and $rmax/3 at 100%:

@keyframes s {
    0% { r: $rmin/3 }
  100% { r: $rmax/3 }
}

We set this animation on the circle elements:

circle { animation: s $t ease-in-out infinite alternate }

And now the radii of the two small circles are animated:

Animated gif. Here, the radii of the two small circles are also animated from their minimum to their maximum size and back.
The three arcs shape morphing and the small circles scaling (live demo, Blink only).

It’s a start, but we have a number of problems here. First of all, the second small circle should decrease in size when the first one is growing bigger and the other way around. We fix this by setting an animation-delay that depends on a CSS variable we initially set to 0 and then switch to 1 on the second small circle:

circle {
  --i: 0;
  animation: s $t ease-in-out calc(var(--i)*#{$t}) infinite alternate
	
  &:nth-child(3) { --i: 1 }
}

As mentioned before, using calc() as an animation-delay value only works in WebKit browsers, but setting r from the CSS has even poorer support, so the animation-delay is not the biggest problem we have here. The result can be seen below:

Animated gif. The radii of the two small circles are also animated from their minimum size to their maximum size and back such that, when the first is at its minimum, the second is at its maximum and the other way around.
The three arcs shape morphing and the small circles scaling (live demo, Blink only).

This is much better, but we still nedd to animate the positions of the small circles along the x axis. The way we do this is with a set of @keyframes that make cx go from $rmax to $rmin and back again for the first small circle and from -$rmin to -$rmax and back for the second one. In these two cases, we have both a different order and a different sign, so we need to come up with a keyframe animation that satisfies both.

Getting around the order problem is the easy part – we use the same animation-delay as we did for the scaling radii animation.

But what about the sign? Well, we use our custom property --i again. This is 0 for the first small circle and 1 for the second one, so we need a function that takes in --i and gives us 1 when this variable’s value is 0 and -1 for a value of 1. The simplest one that comes to mind is raising -1 to the power --i. Sadly, that’s not possible with CSS – we can only have arithmetic operations inside calc(). However, calc(1 - 2*var(--i)) is another solution that works and it’s not much more complicated. Using this, our code becomes:

circle {
  --i: 0;
  --j: calc(1 - 2*var(--i));
  animation: s $t ease-in-out calc(var(--i)*#{-$t}) infinite alternate;
  animation-name: s, x;
	
  &:nth-child(3) { --i: 1 }
}

@keyframes x {
    0% { cx: calc(var(--j)*#{$rmax}) }
  100% { cx: calc(var(--j)*#{$rmin}) }
}

The result can be seen below… and it’s not quite as expected:

Animated gif. The position of the two small circles should animate smoothly, instead it seems to flip suddenly from the initial one to the final one.
Result (live demo, Blink only).

What we have looks like a sudden flip at 50% in between the two end values, not a smooth animation. This is not what we wanted, so it looks like we need to abandon this tactic.

We have another option here though: combining cx with transform. The two small circles are always positioned such that the distance between their central points is $r. So what we can do is position the second of the small circles at -$r, then translate them both by a distance that’s between $rmax and $rmin:

circle {
  transform: translate($r2*1px);
  animation: s $t ease-in-out infinite alternate;
  animation-name: s, x;
		
  &:nth-child(3) {
    cx: -$r;
    animation-delay: -$t, 0s
  }
}

@keyframes x {
    0% { transform: translate($rmax*1px) }
  100% { transform: translate($rmin*1px) }
}

This finally behaves as we wanted it to!

Animated gif. The position of the small circles animates smoothly between the initial and the final one for each.
Correct animation (live demo, Blink only)

One more thing we can do here to simplify the code is get rid of the initial $r1 and $r2 values and replace them with those in the 0% keyframe of each animation:

path {
  d: path('M#{-$r} 0A#{$r} #{$r} 0 0 1 #{$r} 0' +
          'A#{$rmin} #{$rmin} 0 0 1 #{$r - 2*$rmin} 0' + 
          'A#{$rmax} #{$rmax} 0 0 0 #{-$r} 0');
  animation: m $t ease-in-out infinite alternate
}

circle {
  r: $rmin/3;
  transform: translate($rmax*1px);
  animation: s $t ease-in-out infinite alternate;
  animation-name: s, x;
	
  &:nth-child(3) {
    cx: -$r;
    animation-delay: -$t, 0s
  }
}

@keyframes m {
  to {
    d: path('M#{-$r} 0A#{$r} #{$r} 0 0 1 #{$r} 0' +
            'A#{$rmax} #{$rmax} 0 0 1 #{$r - 2*$rmax} 0' + 
            'A#{$rmin} #{$rmin} 0 0 0 #{-$r} 0');
  }
}

@keyframes s { to { r: $rmax/3 } }

@keyframes x { to { transform: translate($rmin*1px) } }

The visual result is exactly the same, we just have less code.

The final step is to make the SVG element itself rotate infinitely:

svg { animation: r 2*$t linear infinite }

@keyframes r { to { transform: rotate(1turn) } }

The finished loading animation can be seen in this Pen.

So there you have it – one loading animation, four different methods of recreating it from scratch for the web. Not everything we’ve explored in here is usable in practice today. For example, the support for the last method is really poor and the performance is awful. However, exploring the limits of what’s becoming possible these days was a fun exercise and a great learning opportunity.