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Question 1
A square is inscribed in an isosceles right triangle have one angle common. Show that the vertex of the square opposite the vertex of the common angle bisects the hypotenuse.
A square is inscribed in an isosceles right triangle have one angle common. Show that the vertex of the square opposite the vertex of the common angle bisects the hypotenuse.
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Solution
Given in isosceles triangle ABC, a square ADEF is inscribed.
To prove CE = BE
Proof in an isosceles ΔABC,∠A=90∘
And AB = AC …(i)
Since, ADEF is a square.
∴AD=EF [All sides of square are equal …(ii)
On Subtracting Eq. (ii) from Eq. (i) we get
AB - AD = AC – AF
⇒BD=CF …(iii)
Now, in ΔCFEandΔBDE,
BD = CF [From eq. (iii)]
DE = EF [ Sides of a square]
And ∠CFE=∠EDB [ each 90∘]
ΔCFE≅ΔBDE [ by SAS congruence rule]
∴CE=BE [ by CPCT]
Hence, vertex E of the square bisects the hypotenuse BC.
Given in isosceles triangle ABC, a square ADEF is inscribed.
To prove CE = BE
Proof in an isosceles ΔABC,∠A=90∘
And AB = AC …(i)
Since, ADEF is a square.
∴AD=EF [All sides of square are equal …(ii)
On Subtracting Eq. (ii) from Eq. (i) we get
AB - AD = AC – AF
⇒BD=CF …(iii)
Now, in ΔCFEandΔBDE,
BD = CF [From eq. (iii)]
DE = EF [ Sides of a square]
And ∠CFE=∠EDB [ each 90∘]
ΔCFE≅ΔBDE [ by SAS congruence rule]
∴CE=BE [ by CPCT]
Hence, vertex E of the square bisects the hypotenuse BC.
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