The similarity ratio of STUV to CBED is 0.5
<h3>How to determine the
similarity ratio of STUV to CBED?</h3>
For the shapes to have a similarity ratio, it means that:
The shapes are similar (not necessarily congruent)
From the diagram, the following sides are corresponding sides
ST and CB
Where
ST = 2
CB = 1
The similarity ratio of STUV to CBED is calculated as:
Ratio = CB/ST
Substitute the known values in the above equation
Ratio =1/2
Evaluate
Ratio = 0.5
Hence, the similarity ratio of STUV to CBED is 0.5
Read more about similar shapes at:
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Answer:
i believe the answer is 9.1
Step-by-step explanation:
6.5 x 40% or in other words .4 is 2.6.
then you add 2.6 to 6.5 and that gives you 9.1
Answer: D
Step-by-step explanation:
Answer:
The two column proof is presented as follows;
Statement Reason
ΔSCW ≅ ΔTUW Given
≅ <em><u>CPCTC</u></em>
≅ CPCTC
≅ <u><em>CPCTC</em></u>
∠SVW ≅ ∠TUW CPCTC
SU = SW + UV Additive property of Length
TU = TW + VW Additive property of Length
SU = TW + VW Substitution
SU = TV Transitive property
ΔSTV ≅ ΔTSU SAS
∠TSV ≅ ∠STU CPCTC
Step-by-step explanation:
The two column proof is presented as follows;
Statement Reason
ΔSCW ≅ ΔTUW Given
≅ <u><em>Congruent Parts of Congruent Triangles are Congruent</em></u>
≅ Congruent Parts of Congruent Triangles are Congruent
≅ <u><em>Congruent Parts of Congruent Triangles are Congruent</em></u>
∠SVW ≅ ∠TUW <em>Congruent Parts of Congruent Triangles are Congruent</em>
SU = SW + UV Additive property of Length
TU = TW + VW Additive property of Length
SU = TW + VW Substitution
SU = TV Transitive property
ΔSTV ≅ ΔTSU Side-Angle-Side rule of congruency
∠TSV ≅ ∠STU Congruent Parts of Congruent Triangles are Congruent