Which construction can you use to prove the pythagorean theorem based on similarity of triangles? triangle abc with bc as length, ab as height on left, and ac as hypotenuse on right. abc is marked right angle at point b. a. triangle abc with bc as length, ab as height on left, and ac as hypotenuse on right. median is drawn from point b to point d on ac. angles on left and right of point b are marked with single tick mark. b. triangle abc with bc as length, ab as height on left, and ac as hypotenuse on right. dashed median is drawn from point b to point d on ac. abc is marked right angle at point b. bdc is marked right angle at point d. c. triangle abc with bc as length, ab as height on left, and ac as hypotenuse on right. abc is marked right angle at point b. de is drawn from point d on ac to point e on bc. single downward arrow symbol is marked on ab and de. d. triangle abc with bc as length, ab as height on left, and ac as hypotenuse on right. abc is marked right angle at point b. dashed median drawn from point b to point d on ac divides ac into ad and dc. ad and dc are marked with single tick mark. e. triangle abc with length bc, height ab on left, and hypotenuse ac on right. abc marked right angle at point b. he is drawn from point h on ab to point e on ac. single right arrow symbol marked on bc and he. ahe marked right angle at b.