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Could a traingle and a rectangle ever be congruent? Explain.
no... because a triangle has 3 sides and a square has 4 sides
no because it is not the same shape or size.
Knowing that three angles are congruent only proves that two triangles are similar. Consider, for example, two equilateral triangles, one with sides of length 5 and the other of lengths ten. Both have three angles of 60 degrees each, but they are not congruent because their sides are not of the same length.
Yes. Try making an obtuse triangle with equal sides. It doesn't work. All angles are equal to 60 degrees in an equilateral triangle.
one way is to use the corresponding parts. if they are congruent then the two triangles are congruent. i don't know any other ways without seeing the triangles or any given info. sorry i couldn't help more.
Could a triangle and a rectangle ever be congruent? explain
Could a traingle and a rectangle ever be congruent? Explain.
no they cant be congruent - Emily grade 7
no... because a triangle has 3 sides and a square has 4 sides
if it is a scalene triangle yes scalene triangle have no congruent sides and angles
no because it is not the same shape or size.
yes it only apllies to the right triangle and "c" is the hypotnuse of the triangles
Knowing that three angles are congruent only proves that two triangles are similar. Consider, for example, two equilateral triangles, one with sides of length 5 and the other of lengths ten. Both have three angles of 60 degrees each, but they are not congruent because their sides are not of the same length.
Yes. Try making an obtuse triangle with equal sides. It doesn't work. All angles are equal to 60 degrees in an equilateral triangle.
The SSS, ASA and SAA postulates together signify what conditions must be present for two triangles to be congruent. Do all of the conditions this postulates represent together have to be present for two triangles to be congruent ? Explain.
There is no such thing as a "random" triangle. Therefore, there is nothing more to explain. To know more on the classifications of how the names of triangles are classified, please see the following question on this site: Is there such thing as an obtuse right triangle? Thank you.