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In so far as this question makes sense, I suspect that the answer is NO.

In so far as this question makes sense, I suspect that the answer is NO.

In so far as this question makes sense, I suspect that the answer is NO.

In so far as this question makes sense, I suspect that the answer is NO.

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12y ago

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Related Questions

Can a right triangle be made from 25144and 169?

No because they do not form a Pythagorean triple.


Can be the sides of a right triangle?

A Pythagorean triple as for example 3, 4 and 5


How does pythagorean triple helps in identifying types of triangle?

That they are right angle triangles


How could you determine if a set of three numbers defines a right triangle?

If they are a Pythagorean triple then they will form a right angle triangle


What is the special name for three integers whose lengths form a right triangle?

Pythagorean triplets.


Which of the following is not a Pythagorean triple?

That will depend on the triples of which none have been given but in order to be a Pythagorean triple they must comply with Pythagoras' theorem for a right angle triangle.


Do these three sides make a sides make a right triangle 6 10 and 8?

Indeed they do, it is a Pythagorean Triple: 6*6 + 8*8 = 10*10. (62 + 82 = 102, 36 + 68 = 100, 100 = 100) The "basic" Pythagorean Triple of a 3, 4, 5 triangle works out like this: 32 + 42 = 52 9 + 16 = 25 25 = 25 Your triangle, the 6, 8, 10, figure, is a "doubling" of the cited "basic" triple, and any multiple of a Pythagorean Triple will also be another Pythagorean Triple, and a right triangle.


How can you determine whether or not the sides of a triangle form a right triangle using Pythagorean triples?

If the lengths of the sides of the triangle can be substituted for 'a', 'b', and 'c'in the equationa2 + b2 = c2and maintain the equality, then the lengths of the sides are a Pythagorean triple, and the triangle is a right one.


What is the name given to three whole numbers that can be the three sides of a right angled triangle?

Pythagorean triple


Can a pythagorean triple have two equal sides?

In any Pythagorean triple, the square of the two shortest sides is equal to the square of the longest side. For example, 32+42=52. Since it is impossible to have a right-angled triangle with a side of 1, it is impossible for two sides of a right-angled triangle to be of the same length.Therefore, a Pythagorean triple will always contain three differently-sized sides.


A right scalene triangle?

Any triangle whose sides form a Pythagorean triple, eg 3-4-5 or 5-12-13


Is 28 45 53 a pythagorean triple?

Yes because the given dimensions comply with Pythagoras' theorem for a right angle triangle