In order to prove AC perpendicular to BD, you just have to prove that the triangles inside the parallelogram are right angle triangles.

You have to use the angle property of a parallelogram which says: The interior opposite angles are equal. But more importantly, the sum of adjacent angles in a parallelogram = 180.

Ref

Since AC bisects BCD, let’s call angle ECB as x. So angle ECD is also x

Similarly let’s call the bisected angle of ABC as 2y, therefore EBC = EBA = y

Now we know that 2x+2y=180 (referenced above) Now it’s just simple algebra. Dividing the equation above by 2, you get: x+y=90.

So angle ECB + angle EBC = 90. So in the triangle BEC, you have the sum of 2 angles as 90. Remember the rule of triangles? The sum of all the angles of a triangle result in 180. Therefore the only logical explanation is that the remaining angle BEC should be = 90. Which means that AC has to be perpendicular to BD