Can the sides 30, 40, 50 be a right triangle?

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Can the sides 30, 40, 50 be a right triangle?

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Answer 1 · 2015-06-10T22:24:39

If a right angled triangle has legs of length $30$ $30$ and $40$ $40$ then its hypotenuse will be of length $\sqrt{30^{2} + 40^{2}} = 50$ $sqrt(30^2+40^2) = 50$ .

Explanation:

Pythagoras's Theorem states that the square of the length of the hypotenuse of a right-angled triangle is equal to the sum of the squares of the lengths of the other two sides.

$30^{2} + 40^{2} = 900 + 1600 = 2500 = 50^{2}$ $30^2+40^2 = 900+1600 = 2500 = 50^2$

Actually a $30$ $30$ , $40$ $40$ , $50$ $50$ triangle is just a scaled up $3$ $3$ , $4$ $4$ , $5$ $5$ triangle, which is a well known right angled triangle.

Answer 2 · 2015-06-10T22:25:43

Yes it can.

Explanation:

To find out whether the triangle with sides 30, 40, 50, you would need to use the Pythagoras theorem $a^{2} + b^{2} = c^{2}$ $a^2+b^2=c^2$ (equation for calculating unknown side of a triangle).
Substituting the variables we get the equation $30^{2} + 40^{2} = c^{2}$ $30^2+40^2=c^2$ we won't substitute 50. because we are trying to find whether this equals 50
$30^{2} + 40^{2} = c^{2}$ $30^2+40^2=c^2$
$2500 = c^{2}$ $2500=c^2$
$\sqrt{2500} = c$ $sqrt2500=c$
$50 = c$ $50=c$
Therefore because 'c' equals 50 we know that this triangle is a right triangle.

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Can the sides 30, 40, 50 be a right triangle?

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