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john has 48 square centimeter tiles he wants to use to create a mosaic. he wants the mosaic to be rectangular with a length that is 2 centimeters longer than the width. which equation could john solve to find w, the greatest width in centimeters he can use for the mosaic? w(w – 2) = 48 w(w 2) = 48 2w(w – 2) = 48 2w(w 2) = 48

Respuesta :

meerkat18
The area (A) of a rectangular figure may be solved by the formula,
                                    A = l x w
where l is length and w is width. 
Given that length is 2 cm longer than the width, it may be expressed as l = w + 2. Then, the area becomes,
                                     (w + 2) x w = 48
Hence, the answer is the second choice. 

The equation tht could be used to determine the greatest width he can use for the mosaic is 48 = w(2 + w) .

What equation represents the greatest width?

A rectangle is a 2-dimensional quadrilateral with four right angles. The sum of angles in a rectangle is 360 degrees.

The area of a rectangle = length x width

  • Length = 2 + w
  • Width = w

48 = w(2 + w)

To learn more about how to calculate the area of a rectangle, please check: https://brainly.com/question/16595449

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