[img]data:image/png;base64,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[/img]

A true bank shot will create two similar right triangles. Determine the measures of the triangles you drew. Are they similar?[br]

Calculate the unknown height.

[size=150]Brainstorm as many methods other than the mirror method as you can.[/size][br][br]Add to your brainstorm by:[br][list][*]Imagining you have access to any tool you can think of.[/*][*]Imagining you only had a piece of scrap paper and pencil with you. [/*][/list]Pick a method you would like to try, and use it to measure the height of the object your teacher assigns you.