$△ ABC$ is a triangle in which altitudes $B E$ and $C F$ to sides $A C$ and $A B$ are equal (see Fig.) . Show that $ΔABE ≅ ΔACF$

Open in App

Solution

Showing that $ΔABE ≅ ΔACF$ :
Given:
Altitudes $BE$ and $CF$ to sides $A C$ and $A B$ are equal
To Prove:
$ΔABE ≅ ΔACF$
Proof:
In $∆ ABF$ and $∆ ACF$ ,
$∠ E = ∠ F$ [Each $90 °$ angle]
$∠ A = ∠ A$ [common angle]
$AB = AC$ [given]
$∴ ∆ AEB ≅ ∆ AFC$ [ by $A S A$ criteria]
Hence Proved.

Suggest Corrections

Similar questions

$A B C$ is a triangle in which altitudes $B E$ and $C F$ to sides $A C$ and $A B$ are equal (see Fig.). Show that
(i) $△ A B E ≅ △ A C F$
(ii) $A B = A C$ , i.e., $A B C$ is an isosceles triangle.

ABC is an isosceles triangle in which altitudes $B E$ and $C F$ are drawn to equal sides $A C$ and $A B$ respectively. Show that $Δ A B E ≅ Δ A C F$

ABC is an isosceles triangle in which altitudes BE and CF are drawn to equal sides AC and AB respectively (see the given figure). Show that these altitudes are equal.

Q. ABC is a triangle in which altitudes BE and CF to sides AC and AB are equal. Show that triangle ABE equal and congruent to triangle ACF

Q. Question 4 (i)
ABC is a triangle in which altitudes BE and CF to sides AC and AB are equal (see the given figure). Show that
(i)

Δ A B E ≅ Δ A C F

Join BYJU'S Learning Program

△ABCis a triangle in which altitudes BE andCF to sides ACand AB are equal (see Fig.) . Show that ΔABE≅ΔACF

Showing that ΔABE≅ΔACF:Given:Altitudes BE and CF to sides AC and AB are equalTo Prove:ΔABE≅ΔACFProof:In ∆ABF and ∆ACF,∠E=∠F [Each 90° angle] ∠A=∠A [common angle] AB=AC [given] ∴∆AEB≅∆AFC [ byASA criteria]Hence Proved.

$△ ABC$ is a triangle in which altitudes $B E$ and $C F$ to sides $A C$ and $A B$ are equal (see Fig.) . Show that $ΔABE ≅ ΔACF$