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There are two sorts of TV: Traditional ones that have an aspect ratio of 4:3 and wide screen ones that are 16:9. I am trying to write a function that given the diagonal of a 16:9 TV gives the diagonal of a 4:3 TV with the equivalent height. I know that you can use Pythagoras' theorem to work this out if I know two of the sides, but I only know the diagonal and the ratio.

I have written a function that works by guessing, but I was wondering if there is a better way.

My attempt so far:

    // C#
    public static void Main()    
    {
        /*
         * h = height
         * w = width
         * d = diagonal
         */

        const double maxGuess = 40.0;
        const double accuracy = 0.0001;
        const double target = 21.5;
        double ratio4by3 = 4.0 / 3.0;
        double ratio16by9 = 16.0 / 9.0;

        for (double h = 1; h < maxGuess; h += accuracy)
        {
            double w = h * ratio16by9;
            double d = Math.Sqrt(Math.Pow(h, 2.0) + Math.Pow(w, 2.0));

            if (d >= target)
            {
                double h1 = h;
                double w1 = h1 * ratio4by3;
                double d1 = Math.Sqrt(Math.Pow(h1, 2.0) + Math.Pow(w1, 2.0));

                Console.WriteLine(" 4:3 Width: {0:0.00} Height: {1:00} Diag: {2:0.00}", w, h, d);
                Console.WriteLine("16:9 Width: {0:0.00} Height: {1:00} Diag: {2:0.00}", w1, h1, d1);

                return;
            }
        }
    }
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closed as off topic by Will Sep 8 '11 at 19:49

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Just for the record, there are also 21:9 TV screens from Philips, so it's actually three sorts of TV ;) – OregonGhost Jun 25 '09 at 10:53
    
There is always one that has be different. Is anyone broadcasting in 21:9 yet? – Martin Brown Jun 25 '09 at 11:26
up vote 10 down vote accepted

Having diagonal and ratio is enough :-).

Let d be the diagonal, r the ratio: r=w/h.

Then d²=w²+h².

It follows r²h²+h²=d². That gives you

h²= d² /( r²+1) which you can solve :-).

share|improve this answer
    
fixed a typo there. c != d. – Jonathan Fingland Jun 25 '09 at 10:53
    
Thanks for fixing :-). – sleske Jun 25 '09 at 11:46

d' = d \sqrt{\frac{(\frac{a'}{b'})^2 + 1}{(\frac{a}{b})^2 + 1}}

where d' is the new (4/3) diagonal and d is the 16/9 diagonal, a/b = 16/9 and a'/b' = 4/3

it works for other ratios as well

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I think you need to square the ds – Patrick McDonald Jun 25 '09 at 11:31
    
Corrected it. Thanks. – cube Jun 25 '09 at 11:50
    
Looks like something went wrong whith the formular rendering. – Martin Brown Dec 21 '09 at 16:05

Solving the equations already calculated in the other answers gives that for a fixed height the diagonals are in a simple ratio:

diagonal(4:3) = diagonal(16:9) * 15 / sqrt(337)
share|improve this answer
    
Shame I can't accept two answers. – Martin Brown Jun 25 '09 at 11:27
    
Well I think you accepted the best answer as it 'does the math', I just took it a step further – Patrick McDonald Jun 25 '09 at 11:32
    
diagonal(4:3) = diagonal(16:9) * 0.817102066054265 – Martin Brown Jun 25 '09 at 11:34
    
diagonal(4:3) = diagonal(16:9) * 0.81710206605426495393880057204928 – Patrick McDonald Jun 25 '09 at 13:02

You can use trig if you want. The diagonal is one of the sides, after all.

If you know the ratio, you know the angles.

If you know the angles and the hypotenuse you can calculate the height.

Now you know the height - and so the width - of the other aspect ratio TV. You could stay with trig, or use pythagoras to calculate the new diagonal.

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double h = d * Math.Sin(Math.Atan(9.0 / 16)); – Martin Brown Jun 25 '09 at 13:13

If n = height/width then: width = diagonal /(sqrt(1 + n^2))

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Simple algebra gives d^2 = (R^2 + 1) h^2

so dividing the (R^2 + 1) terms will give you the ratio of diagonals between two tvs of the same height.

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I'm not a mathematician, but it goes something like this:

h^2 = x^2 + y^2

and

x/y = 4/3 => x = 4/3*y

Therefore

h^2 = (4/3y)^2 + y^2

And since you know h you can solve y and therefore also x.

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