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Is the ratio of the surface areas of two similar polyhedra equal to the cube of the ratio between their corresponding edge lengths?
false
The ratio of the lengths of corresponding parts in two similar solids is 51. What is the ratio of their surface areas?
If the ratio of the lengths of corresponding parts in two similar solids is 51, then the ratio of their surface areas is the square of the ratio of their lengths. Therefore, the ratio of their surface areas is ( 51^2 = 2601 ).
The two solids are similar and the ratio between the lengths of their edges is 29. What is the ratio of their surface areas?
If two solids are similar, the ratio of their surface areas is the square of the ratio of their corresponding lengths. Given that the ratio of the lengths of their edges is 29, the ratio of their surface areas is (29^2), which equals 841. Thus, the ratio of their surface areas is 841:1.
If two solids are similar and the ratio between the lengths of their edges is 2 to 9 what is the ratio of their surface areas?
If two solids are similar and the ratio of their edge lengths is ( \frac{2}{9} ), the ratio of their surface areas is the square of the ratio of their corresponding lengths. Therefore, the ratio of their surface areas is ( \left(\frac{2}{9}\right)^2 = \frac{4}{81} ).
The ratio of the lengths of corresponding parts in two similar solids is 41. What is the ratio of their surface areas?
16:1
The ratio of surface areas of two similar polyhedra is equal to the cube of the ratio between their corresponding edge lengths?
False
Is the ratio of the surface areas of two similar polyhedra equal to the cube of the ratio between their corresponding edge lengths?
false
The ratio of the lengths of corresponding parts in two similar solids is 51. What is the ratio of their surface areas?
If the ratio of the lengths of corresponding parts in two similar solids is 51, then the ratio of their surface areas is the square of the ratio of their lengths. Therefore, the ratio of their surface areas is ( 51^2 = 2601 ).
The ratio of surface areas of two similar solids is equal to the square of the ratio between their corresponding edge lengths.?
The statement is true.
The ratio of surface areas of two similar solids is equal to the square root of the ratio between their corresponding edge lengths?
false - APEX
The two solids are similar and the ratio between the lengths of their edges is 29. What is the ratio of their surface areas?
If two solids are similar, the ratio of their surface areas is the square of the ratio of their corresponding lengths. Given that the ratio of the lengths of their edges is 29, the ratio of their surface areas is (29^2), which equals 841. Thus, the ratio of their surface areas is 841:1.
If two solids are similar and the ratio between the lengths of their edges is 2 to 9 what is the ratio of their surface areas?
If two solids are similar and the ratio of their edge lengths is ( \frac{2}{9} ), the ratio of their surface areas is the square of the ratio of their corresponding lengths. Therefore, the ratio of their surface areas is ( \left(\frac{2}{9}\right)^2 = \frac{4}{81} ).
The ratio of the surface areas of two similar solids is 49100. What is the ratio of their corresponding side lengths?
7:10
The ratio of the lengths of corresponding parts in two similar solids is 41. What is the ratio of their surface areas?
16:1
The ratio of the corresponding edge lengths of two similar solids is 4 5 What is the ratio of their surface areas?
16:25
The ratio of the surface areas of two similar solids is 49 100 What is the ratio of their corresponding side lengths?
7:10
The ratio of the corresponding edge lengths of two similar solids is 3 6 What is the ratio of their surface areas?
9 36
