Answer:
The dimensions of rectangle a are 6x4 and dimensions of rectangle b are 6x2.
Step-by-step explanation:
We are given a square with area 36 squared cm. Therefore, dimension of the square will be 6 cm.
The square is cut into two rectangles with areas in the ratio 2:1.
Let the dimensions of the rectangles be 6*a and 6*b. Therefore, we can set up the ratio of areas as:
[tex]\frac{6a}{6b}=\frac{2}{1} \\a=2b[/tex]
Moreover, we can set the combined area of rectangles equal to the area of square to form another equation:
[tex]6a+6b=36\\a+b=6[/tex]
Using substitution method, we can solve for 'a' and 'b' as shown below:
[tex]2b+b=6\\3b=6\\b=2[/tex]
And
[tex]a=2b\\a=2(2)\\a=4[/tex]
Therefore, dimensions of the two rectangles are 6x4 and 6x2, respectively.
