Answer:
the height of the model is approximately 5.8667 inches and the width of the model is approximately 4.2667 inches.
Explanation:
We can use the similarity ratio to set up a proportion and solve for the height and width of the model in inches.
Let x be the height of the model in inches and y be the width of the model in inches.
The similarity ratio of the model to the tower is 1:900, which means that the height of the model is 1/900 times the height of the tower, and the width of the model is 1/900 times the width of the tower. We can write this as:
x/460 = 1/900
y/320 = 1/900
To solve for x and y, we can cross-multiply and simplify:
x = 460/900 * 12 inches per foot = 5.8667 inches (rounded to 4 decimal places)
y = 320/900 * 12 inches per foot = 4.2667 inches (rounded to 4 decimal places)
Therefore, the height of the model is approximately 5.8667 inches and the width of the model is approximately 4.2667 inches.