∆AB=28
∆BC=Blank
∆CD= Blank
∆DA=16
∆QR=12
∆RS= Blank
∆ST= Blank
∆TQ=21
Rectangle QRST is similar to rectangle ABCD. Identify the ratios for the bases and heights within the similar rectangles
A. 28/21=16/12
B. 21/28=12/16
C. 21/12=18/15
D. 21/12=16/28
To determine the ratios for the bases and heights within the similar rectangles, we need to find the corresponding side lengths in each rectangle.
In rectangle ABCD, we are given that ∆AB = 28 and ∆DA = 16.
In rectangle QRST, we are given that ∆QR = 12 and ∆TQ = 21.
To find the ratios for the bases, we compare the corresponding side lengths of the bases: AB and QR.
The ratio AB/QR is 28/12.
To find the ratios for the heights, we compare the corresponding side lengths of the heights: DA and TQ.
The ratio DA/TQ is 16/21.
Therefore, the correct ratio is AB/QR = 28/12 and DA/TQ = 16/21.
None of the given options match the correct ratios, so the correct answer is not provided.