Question 8 The area of an isosceles triangle having base 2cm and the length of one of the equal sides 4cm, is
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Solution
Let ABC be an isosceles triangle in which AB = AC = 4cm and BC = 2cm.
In right angled ΔADB, AB2=AD2+BD2 [by Pythagoras theorem] ⇒(4)2=AD2+1 ⇒AD2=16−1 ⇒AD2=15 ∴AD=√15cm [taking positive square root because length is always positive] ∴AreaofΔABC=12×BC×AD[∵areaoftriangle=12(base×height)] =12×2×√15=√15cm2
Alternate Method We know that, Area of an isosceles triangle =a4√4b2−a2 Where b is the length of equal sides and a is the length of the base. Here, the length of side be b = 4cm and a = 2cm ∴ Area of an isosceles triangle =2√4(4)2−44=√64−42 =√602=2√152=√15cm2