Isaiah draws a quadrilateral WXYZ. If side WX = x - 20, side XY = 6y + 4, side YZ = 4 - 3x, and WZ = 4y + 22, for what values of x and y can Isaiah be sure his quadrilateral is a parallelogram?(1 point)

In a parallelogram, opposite sides must be equal. So, we have the following equations based on the sides of the quadrilateral WXYZ:

1. WX = YZ
2. XY = WZ

Based on the given expressions for the sides, we can set up the following equations:

1. \( x - 20 = 4 - 3x \)
2. \( 6y + 4 = 4y + 22 \)

Let's solve these equations one by one.

For the first equation:

\[ x - 20 = 4 - 3x \]

Add \( 3x \) to both sides:

\[ x + 3x - 20 = 4 \]

Combine like terms:

\[ 4x - 20 = 4 \]

Add \( 20 \) to both sides:

\[ 4x = 24 \]

Now, divide by \( 4 \):

\[ x = 6 \]

For the second equation:

\[ 6y + 4 = 4y + 22 \]

Subtract \( 4y \) from both sides:

\[ 2y + 4 = 22 \]

Subtract \( 4 \) from both sides:

\[ 2y = 18 \]

Now divide by \( 2 \):

\[ y = 9 \]

So, \( x = 6 \) and \( y = 9 \).

Thus, the values of \( x \) and \( y \) that ensure the quadrilateral WXYZ is a parallelogram are:

x = 6 and y = 9.