You use a scale of 1 inch equals 280 feet to build a model of the great pyramid of guys that the width of the base of the pyramid is 756 feet what is the width of your model

To determine the width of the model of the great pyramid, we can use the scale provided, which states that 1 inch is equal to 280 feet.

First, we need to calculate the conversion factor between the actual width and the model width. This can be done by dividing the actual width of the base of the pyramid by the scale factor:

Conversion factor = Actual width / Scale factor
Conversion factor = 756 feet / 280 feet
Conversion factor ≈ 2.7 feet per inch

Now that we have the conversion factor, we can determine the width of the model by multiplying the conversion factor by the number of inches:

Width of the model = Conversion factor × Number of inches

For example, if you want to know the width of the model in inches:

Width of the model (in inches) = 2.7 feet/inch × Number of inches

Please provide the specific number of inches you would like to convert to the width of the model.

To find the width of your model, you can use the concept of proportions. Here's how you can calculate it:

Step 1: Identify the scale ratio stated in the question:
The scale mentioned is 1 inch equals 280 feet.

Step 2: Determine the width of the base of the actual pyramid:
The given width of the base is 756 feet.

Step 3: Set up the proportion to find the width of the model:
Since the scale is given as 1 inch equals 280 feet, we can write the proportion as:
1 inch / 280 feet = x inches / 756 feet

Step 4: Solve the proportion:
To solve the proportion, cross-multiply and then solve for x:
1 inch * 756 feet = 280 feet * x inches
756 = 280x

Step 5: Divide both sides of the equation by 280:
x = 756 / 280

Step 6: Calculate the value of x:
x ≈ 2.7 inches

Therefore, the width of your model of the Great Pyramid would be approximately 2.7 inches.

1" / 280' = x" / 756'

756ft. * 1in/280ft. =