In the figure,ABD is a triangle right-angled | vedclass

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(N/A) Given: In $	riangle ABD$,$\angle BAD = 90^\circ$ and $AC \perp BD$.To prove: $AB^2 = BC \cdot BD$.Proof: Consider $	riangle BCA$ and $	riangl

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(N/A) Given: In $	riangle ABD$,$\angle BAD = 90^\circ$ and $AC \perp BD$.To prove: $AB^2 = BC \cdot BD$.Proof: Consider $	riangle BCA$ and $	riangle BAD$.In $	riangle BCA$ and $	riangle BAD$:$\angle BCA = \angle BAD = 90^\circ$ (Given $AC \perp BD$ and $\angle BAD = 90^\circ$)$\angle B = \angle B$ (Common angle)Therefore,by $AA$ similarity criterion,$	riangle BCA \sim 	riangle BAD$.Since the triangles are similar,the ratios of their corresponding sides are equal:$\frac{BC}{BA} = \frac{BA}{BD}$Cross-multiplying gives:$BA \cdot BA = BC \cdot BD$$AB^2 = BC \cdot BD$.Hence proved.

In the figure,$ABD$ is a triangle right-angled at $A$ and $AC \perp BD$. Show that $AB^2 = BC \cdot BD$.

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