In the rhombus, mAn angle symbol is shown.1 = 18x, mAn angle symbol is shown.2 = x + y, and mAn angle symbol is shown.3 = 30z. Find the value of x + y + z. The diagram is not drawn to scale.

To solve this problem, we need to set up a system of equations using the given information.

Since the rhombus has 4 congruent sides, the measures of angles 1, 2, and 3 must add up to 360 degrees (since the sum of the angles in a quadrilateral is 360 degrees).

So we have: 18x + x + y + 30z = 360.

Since angles 1 and 2 are adjacent angles in a rhombus, they are supplementary. Therefore, we have: 18x + x + y = 180.

Simplifying this equation gives us: 19x + y = 180.

We do not have enough information to solve for x and y, so we need to use the third equation.

Since angles 2 and 3 are also adjacent angles in a rhombus, they are supplementary. Therefore, we have: x + y + 30z = 180.

Simplifying this equation gives us: x + y + 30z = 180.

Now we have a system of two equations:
19x + y = 180
x + y + 30z = 180

We can solve this system by substitution or elimination.

First, let's solve for y in the first equation:
y = 180 - 19x

Now we can substitute this expression for y in the second equation:
x + (180 - 19x) + 30z = 180

Simplifying this equation gives us:
180 - 18x + 30z = 180

Subtracting 180 from both sides gives us:
-18x + 30z = 0

Dividing both sides by 6 gives us:
-3x + 5z = 0

Now we need to rewrite the equation in terms of x + y + z.

From the first equation, we know that:
y = 180 - 19x

Substituting this expression for y in x + y + 30z = 180 gives us:
x + (180 - 19x) + 30z = 180

Simplifying this equation gives us:
180 - 18x + 30z = 180

Subtracting 180 from both sides gives us:
-18x + 30z = 0

Dividing both sides by 3 gives us:
-3x + 5z = 0

So x + y + z = x + (180 - 19x) + z = 180 + z.

Since we do not have enough information to solve for x, y, and z, we cannot determine the value of x + y + z.