The object above is symmetrical through Z. If Y = 11 inches, Z = 12 inches, and H = 7 inches, what is the area of the object?
To find the area of the object, we first need to find the dimensions of the object in the X direction. Since the object is symmetrical through Z, we can see that the distance from Z to H is 5 inches (12 inches - 7 inches).
Therefore, the distance from Z to the center of the object is 12 inches - 5 inches = 7 inches. Since the object is symmetrical through Z, this means that the object's width in the X direction is 2 * 7 = 14 inches.
Now, we can find the area of the object by multiplying its width (14 inches) by its height (11 inches):
Area = 14 inches * 11 inches = 154 square inches
Therefore, the area of the object is 154 square inches.