7) $\triangle pqr \sim \triangle cba$

8) $\triangle srq \sim \triangle bcd$

9) $\triangle cba \sim \triangle ced$

10) $\triangle jkl \sim \triangle jef$

Question

7) $\triangle pqr \sim \triangle cba$

8) $\triangle srq \sim \triangle bcd$

9) $\triangle cba \sim \triangle ced$

10) $\triangle jkl \sim \triangle jef$

Accepted Answer

### Problem 7: $	riangle PQR \sim 	riangle CBA$
# Explanation:
## Step1: Identify corresponding sides
Since $	riangle PQR \sim 	riangle CBA$, the corresponding sides are proportional. So, $\frac{PQ}{CA}=\frac{QR}{AB}$.
$PQ = 60$, $CA = 12$, $QR = 55$, $AB = x + 5$.
## Step2: Set up the proportion
$\frac{60}{12}=\frac{55}{x + 5}$
Simplify $\frac{60}{12}=5$, so $5=\frac{55}{x + 5}$
## Step3: Solve for $x$
Cross - multiply: $5(x + 5)=55$
$5x+25 = 55$
Subtract 25 from both sides: $5x=55 - 25=30$
Divide by 5: $x = \frac{30}{5}=6$

### Problem 8: $	riangle SRQ \sim 	riangle BCD$
# Explanation:
## Step1: Identify corresponding sides
Since $	riangle SRQ \sim 	riangle BCD$, $\frac{SQ}{BD}=\frac{SR}{BC}$.
$SQ = 60$, $BD = 12$, $SR = 3x + 1$, $BC = 8$.
## Step2: Set up the proportion
$\frac{60}{12}=\frac{3x + 1}{8}$
Simplify $\frac{60}{12}=5$, so $5=\frac{3x + 1}{8}$
## Step3: Solve for $x$
Cross - multiply: $5	imes8=3x + 1$
$40=3x + 1$
Subtract 1: $3x=40 - 1 = 39$
Divide by 3: $x=\frac{39}{3}=13$

### Problem 9: $	riangle CBA \sim 	riangle CED$
# Explanation:
## Step1: Identify corresponding sides
Since $	riangle CBA \sim 	riangle CED$, $\frac{CA}{CD}=\frac{CB}{CE}$.
$CA = 63$, $CD = 27$, $CB = 70$, $CE = 4x-6$.
## Step2: Set up the proportion
$\frac{63}{27}=\frac{70}{4x - 6}$
Simplify $\frac{63}{27}=\frac{7}{3}$, so $\frac{7}{3}=\frac{70}{4x - 6}$
## Step3: Solve for $x$
Cross - multiply: $7(4x - 6)=3	imes70$
$28x-42 = 210$
Add 42 to both sides: $28x=210 + 42=252$
Divide by 28: $x=\frac{252}{28}=9$

### Problem 10: $	riangle JKL \sim 	riangle JEF$
# Explanation:
## Step1: Identify corresponding sides
Since $	riangle JKL \sim 	riangle JEF$, $\frac{JK}{JE}=\frac{JL}{JF}$.
$JK = 84$, $JE = 11x - 5$, $JL = 91$, $JF = 78$.
## Step2: Set up the proportion
$\frac{84}{11x - 5}=\frac{91}{78}$
Simplify $\frac{91}{78}=\frac{13}{12}$, so $\frac{84}{11x - 5}=\frac{13}{12}$ (Wait, actually $\frac{91}{78}=\frac{7}{6}$ (dividing numerator and denominator by 13). Let's correct that. $\frac{91\div13}{78\div13}=\frac{7}{6}$
So $\frac{84}{11x - 5}=\frac{7}{6}$
## Step3: Solve for $x$
Cross - multiply: $84	imes6=7(11x - 5)$
$504 = 77x-35$
Add 35 to both sides: $77x=504 + 35=539$
Divide by 77: $x=\frac{539}{77}=7$

# Answers:
- Problem 7: $x = 6$
- Problem 8: $x = 13$
- Problem 9: $x = 9$
- Problem 10: $x = 7$

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QUESTION IMAGE

Question

Explanation:

Problem 7: $\triangle PQR \sim \triangle CBA$

Step1: Identify corresponding sides

Step2: Set up the proportion

Step3: Solve for $x$

Problem 8: $\triangle SRQ \sim \triangle BCD$

Step1: Identify corresponding sides

Step2: Set up the proportion

Step3: Solve for $x$

Problem 9: $\triangle CBA \sim \triangle CED$

Step1: Identify corresponding sides

Step2: Set up the proportion

Step3: Solve for $x$

Problem 10: $\triangle JKL \sim \triangle JEF$

Answer: