Question
∆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
∆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
Answers
GPT 3.5
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.
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.