Since parallelogram ABCD is a rhombus, the diagonals in a rhombus bisect a pair of opposite angles.

In other words, m\angle ACD = m\angle ACB and m\angle ACD+ m\angle ACB = m\angle BCD

We want to use this information to write an equation relating the two given angles.

\left(5x+8\right) + \left(5x+8\right)=\left(12x+2\right)

We want to use the above equation to solve for x.

\angle BCD and \angle ABC are consecutive angles.

Since ABCD is a rhombus and a rhombus is a parallelogram, we know that consecutive angles are supplementary.

So m\angle BCD + m\angle ABC = 180\degree.

Use the given information and the value for x we solved for in part (a) to find m\angle BCD. Then use that information and the above equation to solve for m\angle ABC.

Substituting 7 for x, we get m\angle BCD=(12(7)+2)\degree.

So m\angle BCD = 86 \degree. Now we want to use this angle measure and the fact that consecutive angles are supplementary to solve for m\angle ABC.

We can use other theorems for special parallelograms to solve for missing side lengths, angles, and diagonals.

We can identify which properties are noted on the diagram and use the list of properties for each type of special parallelogram to classify it.

We can see that the diagonals are perpendicular to one another and bisect one another. More than just bisecting one another though, BE=ED=AE=EC, so \overline{BD} \cong \overline{AC} using the segment addition postulate. This means that the diagonals are congruent and perpendicular, so ABCD is a rhombus.

This diagram is not drawn to scale, so we need to use the actual given information and not try to determine by what it looks like.

ABCD is a rhombus, so we can use the other properties of rhombus.

Another property of rhombus is that all sides are congruent. This means that \overline{AB} \cong \overline{BC}, and since AB=6 \text{ ft}, BC=6 \text{ ft}.