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The smallest number of tiles Quintin will need in order to tile his floor is 20
The given parameters;
To find:
Among the three different shapes available, total area of one is calculated as;
[tex]A_{one \ square \ type} = 5 \times 2000 \ cm^2 = 10,000 \ cm^2[/tex]
Area of the floor is calculated as;
[tex]A_{floor} = 1000 \ cm \times 600 \ cm = 600,000 \ cm^2[/tex]
The maximum number tiles needed (this will be possible if only one shape type is used)
[tex]maximum \ number= \frac{Area \ of \ floor}{total \ area \ of \ one \ shape \ type} \\\\maximum \ number= \frac{600,000 \ cm^2}{10,000 \ cm^2} \\\\maximum \ number= 60[/tex]
When all the three different shape types are used we can get the smallest number of tiles needed.
The minimum or smallest number of tiles needed (this will be possible if all the 3 different shapes are used)
[tex]3 \times \ smallest \ number = 60\\\\smallest \ number = \frac{60}{3} \\\\smallest \ number = 20[/tex]
Thus, the smallest number of tiles Quintin will need in order to tile his floor is 20
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