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Triangle $ABC$ has a right angle at $B$. Legs $\overline{AB}$ and $\overline{CB}$ are extended past point $B$ to points $D$ and $E$, respectively, such that $\angle EAC = \angle ACD = 90^\circ$. Prove that $EB \cdot BD = AB \cdot BC$.

Respuesta :

Answer:

Given :

ABC is a right triangle in which ∠ABC = 90°,

Also, Legs AB and CB are extended past point B to points D and E,

Such that,

[tex]\angle EAC = \angle ACD = 90^{\circ}[/tex]

To prove :

[tex]EB\times BD=AB\times BC[/tex]

Proof :

In triangles AEC and EBA,

∠EAC= ∠ABE ( right angles )

∠CEA = ∠AEB ( common angles )

By AA similarity postulate,

[tex]\triangle AEC \sim \triangle EBA[/tex],

Similarly,

[tex]\triangle AEC \sim \triangle ABC[/tex]

[tex]\implies\triangle EBA\sim \triangle ABC-----(1)[/tex]

Now, In triangles ADC and CBD,

∠ACD = ∠CBD ( right angles )

∠ADC= ∠BDC ( common angles )

By AA similarity postulate,

[tex]\triangle ADC \sim \triangle CBD[/tex],

Similarly,

[tex]\triangle ADC \sim \triangle ABC[/tex]

[tex]\implies \triangle CBD\sim \triangle ABC-----(2)[/tex]

From equations (1) and (2),

[tex]\triangle EBA\sim \triangle CBD[/tex]

The corresponding sides of similar triangles are in same proportion,

[tex]\frac{EB}{BC}=\frac{AB}{BD}[/tex]

[tex]\implies EB\times BD=AB\times BC[/tex]

Hence, proved....

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leeelijah707

Answer:a,d,e

Step-by-step explanation:

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