In an equelateral triangle abc , if ab perpendicular to bc than
Answers
In an equilateral triangle, all angles are congruent, since all 3 of the sides are congruent. This makes sense because the angle measures in any triangle, not only an equilateral triangle, equal 180 degrees.
In a right triangle, however, the 3 angles can NOT be congruent. This is because in a right triangle, one angle equals 90 degrees. Therefore, you can’t have 3 angles equal 90 degrees. As mentioned earlier, the sum of all the interior measures in a triangle is always 180 degrees.
Also it can be proved by
√3/4 a² not equal to ½a²
Hope this helps you
In an equilateral triangle, all angles are congruent, since all 3 of the sides are congruent. This makes sense because the angle measures in any triangle, not only an equilateral triangle, equal 180 degrees.
In a right triangle, however, the 3 angles can NOT be congruent. This is because in a right triangle, one angle equals 90 degrees. Therefore, you can’t have 3 angles equal 90 degrees. As mentioned earlier, the sum of all the interior measures in a triangle is always 180 degrees.
Also it can be proved by
√3/4 a² not equal to ½a²
Hope this helps you
In an equilateral triangle, all angles are congruent, since all 3 of the sides are congruent. This makes sense because the angle measures in any triangle, not only an equilateral triangle, equal 180 degrees.
In a right triangle, however, the 3 angles can NOT be congruent. This is because in a right triangle, one angle equals 90 degrees. Therefore, you can’t have 3 angles equal 90 degrees. As mentioned earlier, the sum of all the interior measures in a triangle is always 180 degrees.
Also it can be proved by
√3/4 a² not equal to ½a²
Hope this helps you