If the lengths of two sides of a triangle are 19 and 33, the the length of the third side is between?

6 ANSWERS

1. 
   

   14 and 52
   
   There's no reason to think it's a right triangle, but the two shortest sides put together must be longer than the other side (or it wouldn't be a triangle).

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2. 
   

   don't use the pythagorean theorem unless it's a right triangle.

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3. 
   

   well first of you have to figure out what kind of triangle it is. by the measurements i would figure you could figure it out using the pythagreom thyreom which is....A square + B square = C squared
   
   so use 33 squared plus 19 squared and then find the square root of the number you come up with. i think this is how you figure it out. hope this helps!

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4. 
   

   38 and 39. Use the Pythagorean Formula that says, a^2 + b^2 = c^2, where a, b and c are sides of a triangle. therefore if you know 2 of the sides of a triangle the third is solving for c.
   
   c = square root of ( a^2 + b^2)
   
   c = square root of (19^2 + 33^2)
   
   c = square root of (1450)
   
   c = 38.08

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5. 
   

   To find the lengths of the legs of a triangle you should use the Pythagorean theorem which is:  a^2 + b^2 = c^2.  A and B represent the length and height of the triangle, while C represents the diagonal.    

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6. 
   

   The choice is e.  The minimum length of the third side must be 33 - 19 which is 14, and the maximum length would be 33 + 19 which is 52.
   
   These are very flat triangles with two angles approaching zero degrees, and one angle approaching 180 degrees. Try to draw them and you'll understand it better.

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