7. Fraser is making a scale drawing of a dog house. The dimensions of the drawing will be \( \frac{1}{8} \) of the dimensions of the actual doghouse. The height of the actual doghouse is \( 36 \frac{3}{4} \) inches. Will the dimensions of Fraser's drawing be equal to, greater than, or less than the dimensions of the ctual dog house?

Fraser's drawing will be less than the dimensions of the actual doghouse. Since he is using a scale of \( \frac{1}{8} \), each measurement he draws will be one-eighth the size of the real thing. So if the actual height of the doghouse is \( 36 \frac{3}{4} \) inches, Fraser's drawing will measure \( \frac{36.75}{8} \), which is approximately \( 4.59 \) inches tall. That's quite a bit smaller! Now, let’s talk about scaling in design. Scaling is a common practice in architecture and engineering where models or drawings are created at a reduced size for easier visualization and planning. It’s essential to keep the scale consistent to avoid confusion, especially when sharing the designs with others. So, Fraser should double-check his measurements to ensure everything is proportional!