Which statement is necessarily true if is an altitude to the hypotenuse of right ?
Which Statement Is Necessarily True If Is An Altitude To The Hypotenuse Of Right ?
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Which Statement Is Necessarily True If Is An Altitude To The Hypotenuse Of Right ?. In the diagram, we have a right triangle abc with right angle at b. B would have to be the right angle though.and bd has to intersect the hypotenuse at a right angle to be an altitude.
"Which statement is necessarily true if BD is an altitude to the from brainly.com
We are given a right triangle \delta abc δabc with an altitude bd bd drawn to the hypotenuse ac ac. Recognize that the altitude $$\overline{bd}$$ b d to the hypotenuse of a right triangle creates two smaller triangles, $$\triangle adb$$ a d b and $$\triangle bdc$$ b d c, which share a. The altitude divides the triangle into two smaller triangles (abd and bcd).
We Are Given A Right Triangle \Delta Abc Δabc With An Altitude Bd Bd Drawn To The Hypotenuse Ac Ac.
B would have to be the right angle though.and bd has to intersect the hypotenuse at a right angle to be an altitude. When the altitude is drawn from the right angle vertex (b) to the hypotenuse (ac), the following statements are true: When bd is an altitude to the.
Recognize That The Altitude $$\Overline{Bd}$$ B D To The Hypotenuse Of A Right Triangle Creates Two Smaller Triangles, $$\Triangle Adb$$ A D B And $$\Triangle Bdc$$ B D C, Which Share A.
1 since \overline {bd} bd is an altitude to the hypotenuse of right \triangle abc abc, \angle adb = \angle cdb =. To determine which statement is necessarily true when $$\overline {bd}$$bd is an altitude to the hypotenuse of right $$\triangle abc$$ abc, we need to consider the properties of right. Our goal here is to determine the option that correctly describes the two triangles.
Maybe Repost With A Link To The Diagram And I Or Someone Else Here.
∠bac ≅ ∠bdc is necessarily true. In the diagram, we have a right triangle abc with right angle at b. The question asks which statement is necessarily true if bd is an altitude to the hypotenuse of right triangle abc.
The Altitude Divides The Triangle Into Two Smaller Triangles (Abd And Bcd).
The correct statement is \triangle adb \sim \triangle bdc adb ∼ bdc.
