Question

A pool company is creating a blueprint for a family pool and a similar dog pool for a new client. Which statement explains how the company can determine whether pool LMNO is similar to pool PQRS?
A. Translate PQRS so that point P of PQRS lies on point L of LMNO, then dilate PQRS by the ratio segment LM over segment PQ.
B. Translate PQRS so that point Q of PQRS lies on point M of LMNO, then dilate PQRS by the ratio segment PQ over segment LM.
C. Translate PQRS so that point P of PQRS lies on point L of LMNO, then translate PQRS so that point Q of PQRS lies on point M of LMNO.
D. Translate PQRS so that point Q of PQRS lies on point M of LMNO, then translate PQRS so that point P of PQRS lies on point L of LMNO.

Answer 1

MT = a = 21 MR = b = 15 WB = c = 2 TVRM is Quadrilateral TV = 6, VR = 12, MR = b, MT = a WBFZ is Quadrilateral WB = c, BF = 4, FZ = 5, ZW = 7 [] TVRM Similar to [] WBFZ i.e [] TVRM ~ [] WBFZ To Find: a = ? ; b = ? and c = ? Solution: If two quadrilateral are similar then there is corresponding sides should be proportion. [] TVRM ~ [] WBFZ { Substituting the given values we can calculate the respective unknown Expected Numericals are MT = a = 21 MR = b = 15 WB = c = 2

Answer 2

I'm Still confused

Answer 3

\(\color{#0cbb34}{\text{Originally Posted by}}\) @lemon1boy1
I'm Still confused
\(\color{#0cbb34}{\text{End of Quote}}\)
try this
https://questioncove.com/updates/5ea9b5a12d07d0403e33aa00