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If I could only remember my algebra! So, I have a right triangle and I know the hypotenuse (28) and I know that the legs are the same length, so I have:

$A^2 + B^2 = C^2$

Where: $A=B$ and $C=28$

Pedestrian, I know, but how do I solve for $A$?

Many thanks!

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    @AndréNicolas With our pseudo-Riemannian ruler and pseudo-Riemannian compass?2012-10-11

3 Answers 3

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I know the question already received good answers, but I want just to comment something: try working first with letters and only in the end substitute the numbers. This means that you would do:

$A^2 + A^2 = C^2 \Longrightarrow 2A^2=C^2$

Hence $A=\pm \dfrac{\strut C}{\strut \sqrt{2}}=\pm \dfrac{\strut C\sqrt{2}}{2}$

Doing so you just need to put the value for $C$ and you get $A=\pm 14\sqrt{2}$ which is the answer. I just wanted to comment that because doing things this way you get practice to work with more general equations and on the other side you reduce the number of numerical calculations needed.

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Put the numbers in the formula: $2A^2=28^2=784$

Now you have that $A^2=392$. You should know it from here.

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    Correct, thank you for sharing! And thank you for catching the missed square in the comment above!2012-10-11
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Try this:

$A^2 + B^2 = C^2$

Since A = B and C = 28, then:

$A^2 + A^2 = 28^2$

$2A^2 = 28^2$

$A^2 = \frac{784}{2}$

$A = \sqrt{\frac{784}{2}}$

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    @Campbeln Not a problem! If you found my answer helpful, could you accept the answer, please?2012-10-11