answersLogoWhite

0


Best Answer

Yes, it can be named both ways.

User Avatar

Wiki User

14y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: Can triangles be named for both there sides and angels?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

Why can triangles be named for both sides and angles?

because they need to be smart


What shape has both acute and obtuse angels?

Triangles:)


How you can prove that the angles of two triangles are equal?

If the angles of two triangles are equal the triangles are similar. AAA If you have three angles on both triangles these must be equal for the triangles to be similar. SAS If you have an angle between two sides and the length of the sides and the angle are the same on both triangles, then the triangles are similar. And SSS If you know the three sides


Do right triangles and hexagons both have all sides of equal lengths?

Only when they are equilateral triangles and regular hexagons that both will have sides of equal lengths.


What is One way obtuse triangles and acute triangles are different?

One way is they both are triangles and have 3 sides.


How are quadrilaterals the same as triangles?

Quadrilaterals, which have 4 sides, are not the same as triangles which have 3 sides. Some similarity exists in that both are geometrical figures.


Some equilateral triangles are not isoscles?

They are both different types of triangles one has 3 equal sides and the other has 2 equal sides.


Why are scalene triangles and equilateral triangles a like?

they both have 3 sides, 3 angles, and 3 vertexes


Can all isosceles triangles equilateral?

No because although both triangles have 3 sides an isosceles triangle has 2 equal sides whereas an equilateral triangle has 3 equal sides.


How are triangles and pyramid alike?

They both have a point and they have same number of sides


If two triangles are congruent which of the triangles are congruent?

If they both have 3 sides the same and 3 angles the same then they are said to be congruent.


Will the lengths of two corresponding altitudes of similar triangles will have the same ratio as any pair of corresponding sides?

It is given that two triangles are similar. So that the ratio of their corresponding sides are equal. If you draw altitudes from the same vertex to both triangles, then they would divide the original triangles into two triangles which are similar to the originals and to each other. So the altitudes, as sides of the similar triangles, will have the same ratio as any pair of corresponding sides of the original triangles.