math/algorithm Fit image to screen retain aspect ratio

I need help with math / algorithm to take an image of known size and fit to one of two screen dimensions:

720 x 480 or 1280 x 1024.

The image dimensions are coming from an XML file, however those dimensions are the web dimensions, I also get a selection of images from the XML that may be of higher and lower resolution than the web dimensions.

What I want is to use the aspect ration of the web dimensions to display the higher resolution image, if available, on an HD (1280x720) screen, or, if the user is on an SD screen (720x480) display the image on that screen.

Other things that would be useful for this, but lower priority, would be, if I know the resolution of the image is smaller in both dimensions than an SD screen (in this case, all I know is the web dimension, and the horizontal dimension of the image file), to display it as actual size on that screen.

• Could you post sample data and what would you want the result to be? Commented Jul 3, 2011 at 21:48
• Ok, well, here is some real sample data: web dimension= width="340" height="517" where there is an image available that the x dimension is actually 1280. I want to resize this so that it's height is no higher than 720, and resize the width proportionally so the image does not get distorted, so I can display it on an HD screen, or if the user is on an SD screen, that would be the dimension I would scale to. The output would be targetrect={x,y,xx,yy) Commented Jul 3, 2011 at 22:04
• math.stackexchange.com/a/180809/210893 Commented Jul 26, 2019 at 13:55

Generic as can be:

Image data: (wi, hi) and define ri = wi / hi
Screen resolution: (ws, hs) and define rs = ws / hs

Scaled image dimensions:

``````rs > ri ? (wi * hs/hi, hs) : (ws, hi * ws/wi)
``````

So for example:

``````         20
|------------------|
10
|---------|

--------------------     ---   ---
|         |        |      | 7   |
|         |        |      |     | 10
|----------        |     ---    |
|                  |            |
--------------------           ---

ws = 20
hs = 10
wi = 10
hi = 7

20/10 > 10/7 ==> (wi * hs/hi, hs) = (10 * 10/7, 10) = (100/7, 10) ~ (14.3, 10)
``````

Which as you can see clearly scales to the screen size, because the height is that of the screen but clearly keeps aspect ratio since `14.3/10 ~ 10/7`

UPDATE

Center the image as follows:

call (wnew, hnew) the new dimensions.

``````top = (hs - hnew)/2
left = (ws - wnew)/2
``````
• I'm not totally familiar with the notation you are using, does the subscripted i refer to a member of an array, like x[i] where x is an array of size, so i refers to an image and w[i] means we are operating on an array of images? Sorry if that makes me seem like an idiot. Commented Jul 3, 2011 at 23:37
• @alphablender, no, no array, the `i` was supposed to mean image, and `s` screen. Commented Jul 3, 2011 at 23:42
• Does this look kind of like what you are describing?: imagewidth=x imageheight=y imageratio= imagewidth / imageheight screenwidth=1280 screenheight=720 screenratio=screenwidth / screenheight if screenratio > imageratio then resultwidth=imagewidth * screenheight / imageheight resultheight=screenheight else resultwidth=screenwidth resultheight=imageheight * screenwidth / imagewidth end if Commented Jul 4, 2011 at 0:50
• What would be the way to compute centering the image on a given screen size once I have calculated the dimension? Commented Jul 4, 2011 at 3:42
• This is great, and quite clear. I think it might be more clear to use 9 instead of one of the 10s, but I like the ascii drawings. Commented Sep 20, 2012 at 13:50

I understand the accepted answer and it works, but I've always found the following method to be simpler and succinct for "best fit":

``````// prep
let maxWidth = 190,
maxHeight = 150;
let imgWidth = img.width,
imgHeight = img.height;

// calc
let widthRatio = maxWidth / imgWidth,
heightRatio = maxHeight / imgHeight;
let bestRatio = Math.min(widthRatio, heightRatio);

// output
let newWidth = imgWidth * bestRatio,
newHeight = imgHeight * bestRatio;
``````

... which of course can be distilled down to:

``````const maxWidth = 190, maxHeight = 150;
const bestRatio = Math.min(maxWidth / img.width, maxHeight / img.height);
img.width *= bestRatio;
img.height *= bestRatio;
``````
• Great answer. Makes it easy to understand what the algorithm is actually doing. Commented Sep 1, 2021 at 21:18

Here it is in straightforward C.

You want to scale both coordinates by the returned scale factor.

```/* For a rectangle inside a screen, get the scale factor that permits the rectangle
to be scaled without stretching or squashing. */
float
aspect_correct_scale_for_rect(const float screen[2], const float rect[2])
{
float screenAspect = screen[0] / screen[1];
float rectAspect = rect[0] / rect[1];

float scaleFactor;
if (screenAspect > rectAspect)
scaleFactor = screen[1] / rect[1];
else
scaleFactor = screen[0] / rect[0];

return scaleFactor;
}

```
• the relation between aspect ratio < or > and selecting height and width ratio. Commented Mar 24, 2020 at 7:21

Aspect ratio correction with letterboxing or fit-to-screen

I wrote up a method recently to handle this exact problem in iOS. I'm using the Eigen matrix library to do scaling, but the the principle (scaling factor) is the same without matrices.

``````Eigen::Matrix4x4f aspectRatioCorrection(bool fillScreen, const Eigen::Vector2f &screenSize, const Eigen::Vector2f &imageSize)
{
Eigen::Matrix4x4f scalingMatrix(Eigen::Matrix4x4f::Identity());

float screenWidth = screenSize.x();
float screenHeight = screenSize.y();
float screenAspectRatio = screenWidth / screenHeight;
float imageWidth = imageSize.x();
float imageHeight = imageSize.y();
float imageAspectRatio = imageWidth / imageHeight;

float scalingFactor;
if (fillScreen) {
if (screenAspectRatio > imageAspectRatio) {
scalingFactor = screenWidth / imageWidth;
} else {
scalingFactor = screenHeight / imageHeight;
}
} else {
if (screenAspectRatio > imageAspectRatio) {
scalingFactor =  screenHeight / imageHeight;
} else {
scalingFactor = screenWidth / imageWidth;
}
}

scalingMatrix(0, 0) = scalingFactor;
scalingMatrix(1, 1) = scalingFactor;

return scalingMatrix;
}
``````