. A triangle ABC in which AB = AC = 6 cm and < A = 90° , has an area of
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Step-by-step explanation:
Let O be the centre of the circle and let P be the mid-point of BC. Then, OP⊥BC.
Since △ABC is isosceles and P is the mid-point of BC. Therefore, AP⊥BC as median from the vertex in an isosceles triangle is perpendicular to the base.
Let AP=x and PB=CP=y.
Applying Pythagoras theorem in △s APB and OPB, we have
AB
2
=BP
2
+AP
2
and OB
2
=OP
2
+BP
2
⇒36=y
2
+x
2
. . . (i) and, 81=(9−x)
2
+y
2
. . . (ii)
⇒81−36=(9−x)
2
+y
2
−y
2
+x
2
[Subtracting (i) from (ii)]
⇒45=81−18x
⇒x=2 cm
Putting x=2 in (i), we get
36=y
2
+4⇒y
2
=32⇒y=4
2
cm
∴BC=2BP=2y=8
2
cm
Hence, Area of △ABC=
2
1
(BC×AP)
=
2
1
×8
2
×2 cm
2
=8
2
cm
2
solution
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