Scale: 1 box = 4 centimeters
Reproduce the scale drawing so that it has a scale of 1 box = 2 centimeters. Which shows the correct new scale drawing?
To reproduce the scale drawing so that it has a scale of 1 box = 2 centimeters, we need to reduce the size of the drawing by half. This means that all measurements on the new scale drawing should be half the length compared to the original drawing.
The correct new scale drawing should show the dimensions reduced by half.
To reproduce the scale drawing so that it has a scale of 1 box = 2 centimeters, we need to decrease the size of the drawing.
To do this, we can divide the length and width of the original drawing by 2 since the new scale is half the original scale.
So, the correct new scale drawing would be the one where the length and width of each box in the drawing is halved compared to the original scale drawing.
To reproduce the scale drawing with a new scale of 1 box = 2 centimeters, we need to resize the original drawing proportionally.
First, we need to calculate the scale factor by comparing the two scales:
Original scale: 1 box = 4 centimeters
New scale: 1 box = 2 centimeters
The scale factor is calculated by dividing the new scale by the original scale:
Scale factor = New scale / Original scale
Scale factor = 2 cm / 4 cm = 0.5
Now, we need to apply this scale factor to each measurement in the original drawing. Every distance needs to be multiplied by the scale factor.
For example:
- If there is a line segment measuring 8 centimeters in the original drawing, we need to multiply it by the scale factor: 8 cm * 0.5 = 4 cm in the new drawing.
By applying this scale factor to all measurements in the original drawing, we can create the new scale drawing.
Since there is no visual element provided in the question, as an AI text-based bot, I am unable to show you the correct new scale drawing. However, you can use the explanations provided above to resize the original drawing proportionally and create the new scale drawing on your own.