In Figure, $ \mathrm{ABC}$ is a triangle in which $ \angle \mathrm{ABC}>90°$ and $ \mathrm{AD}\perp \mathrm{CB}$ produced. Prove that $ {\mathrm{AC}}^{2}={\mathrm{AB}}^{2}+ {\mathrm{BC}}^{2}+ 2\mathrm{BC}.\mathrm{BD}.$

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Solution

Prove that in the given figure ${AC}^{2} = {AB}^{2} + {BC}^{2} + 2 BC . BD .$
Given: $AD ⊥ CB$
We know that Pythagoras theorem states that square of hypotenuse is equal to sum of the squares of other two sides in right triangle.
In $△ ADB$ , ${AB}^{2} = {AD}^{2} + {DB}^{2} (By Pythagora s theorem)$
In triangle $△ ADC$ ,
${AC}^{2} = {AD}^{2} + {DC}^{2} (By Pythagoras theorem) \Rightarrow {AC}^{2} = {AD}^{2} + {(DB + DC)}^{2} (∵ DC = DB + DC) \Rightarrow {AC}^{2} = {AD}^{2} + {DB}^{2} + {DC}^{2} + 2 \cdot DB \cdot DC ({(a + b)}^{2} = a^{2} + b^{2} + 2 ab) \Rightarrow {AC}^{2} = {AB}^{2} + {DC}^{2} + 2 \cdot DB \cdot DC (∵ {AB}^{2} = {AD}^{2} + {DB}^{2})$
Hence proved ${AC}^{2} = {AB}^{2} + {BC}^{2} + 2 BC . BD .$

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