Is An Altitude In Triangle Abc. Which Statements Are True? Select Two Options. Δabc Δbxc Δaxc ~ Δcxb Δbcx Δacx Δacb ~ Δaxc Δcxa Δcba

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Is An Altitude In Triangle Abc. Which Statements Are True? Select Two Options. Δabc Δbxc Δaxc ~ Δcxb Δbcx Δacx Δacb ~ Δaxc Δcxa Δcba. Cx is an altitude in triangle abc. This line segment represents the shortest.

Altitude of a triangle Examples with Figures Teachoo
Altitude of a triangle Examples with Figures Teachoo from www.teachoo.com

From the given δabc, cx is the altitude of δabc; The true statements regarding triangle abc with altitude cx are: An altitude of a triangle is a line segment drawn from a vertex of the triangle to the opposite side and is perpendicular to that side.

Both Of These Statements Are Supported By The Properties Of Congruent Triangles.


In a right triangle, the altitude from the right angle to the hypotenuse divides the hypotenuse into two segments. Identify that $$\overline{ah}$$ a h is an altitude because it is a line segment from a vertex to. A (δabc ~ δbxc) and e (δcxa ~ δcba).

Review The Given Statements To Determine Which Ones Are True For $$\Triangle Abc$$ A Bc.


From the given δabc, cx is the altitude of δabc; An altitude of a triangle is a line segment drawn from a vertex of the triangle to the opposite side and is perpendicular to that side. Δabx ≅ δcbx and e.

The True Statements Regarding Triangle Abc With Altitude Cx Are:


And also an angle bisector of <acb. The lengths of the altitude is the geometric mean of the lengths of the two. The two true statements based on the given altitude in triangle abc are:

Cx Is An Altitude In Triangle Abc.


This line segment represents the shortest.

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