Draw a larger " \( U \) " with a zoom factor of \( \frac{3}{2}= \) 1.5. What is the height of the new " \( U \) "?

To create a larger " \( U \) " with a zoom factor of \( 1.5 \), you'll multiply the original height of the " \( U \) " by this factor. So, if the original height is " \( h \) \)", the new height will be: New Height = Original Height \( h \times 1.5 \). For example, if the original " \( U \) " had a height of 10 units, the new height would be 10 units \( \times 1.5 = 15 \) units. Getting that perfect proportionality means you can take those artistic skills to the next level! Speaking of shapes, did you know that the concept of scaling shapes dates back to ancient civilizations? The early mathematicians from Babylon and Egypt experimented with the properties of geometric shapes for everything from architecture to astronomy, laying the groundwork for the rules we follow today. Isn’t it cool how these principles echo through time, influencing everything from art to engineering?