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# Explanation:
### Problem 11:
## Step1: Set opposite sides equal
In parallelogram $PQRS$, $PQ=SR$ and $PS=QR$:
$10x + 7 = 14x - 9$
$12y + 13 = 10y + 37$

## Step2: Solve for $x$
Rearrange $10x + 7 = 14x - 9$:
$7 + 9 = 14x - 10x$
$16 = 4x$
$x = \frac{16}{4} = 4$

## Step3: Solve for $y$
Rearrange $12y + 13 = 10y + 37$:
$12y - 10y = 37 - 13$
$2y = 24$
$y = \frac{24}{2} = 12$

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### Problem 12:
## Step1: Use consecutive angles property
In parallelogram $ABCD$, consecutive angles are supplementary:
$(8x - 19) + (5x + 38) = 180$

## Step2: Solve for $x$
Simplify the equation:
$13x + 19 = 180$
$13x = 180 - 19 = 161$
$x = \frac{161}{13} = 12.38$ (rounded)

## Step3: Find $m\angle C$
$\angle C = \angle A = 8x - 19$:
$m\angle C = 8(12.38) - 19 = 99.04 - 19 = 80.04^\circ \approx 80^\circ$
*(Or use $\angle C = 5x + 38 = 5(12.38)+38=61.9+38=99.9\approx100^\circ$; correction: consecutive angles: $\angle A + \angle B=180$, $\angle C=\angle A$, so correct calculation:
$8x-19+5x+38=180$
$13x=161$
$x=12.38$
$m\angle C=8(12.38)-19=80^\circ$, or since $\angle B + \angle C=180$, $m\angle C=180-(5(12.38)+38)=180-99.9=80.1\approx80^\circ$)*

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### Problem 13:
## Step1: Calculate all side lengths
Distance formula: $d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}$
- $DE=\sqrt{(-3+8)^2+(6-1)^2}=\sqrt{25+25}=\sqrt{50}=5\sqrt{2}$
- $FG=\sqrt{(2-7)^2+(-1-4)^2}=\sqrt{25+25}=\sqrt{50}=5\sqrt{2}$
- $EF=\sqrt{(7+3)^2+(4-6)^2}=\sqrt{100+4}=\sqrt{104}=2\sqrt{26}$
- $DG=\sqrt{(2+8)^2+(-1-1)^2}=\sqrt{100+4}=\sqrt{104}=2\sqrt{26}$

## Step2: Check opposite sides equality
Opposite sides $DE=FG$ and $EF=DG$, so it is a parallelogram.

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### Problem 14:
## Step1: Calculate all side slopes
Slope formula: $m=\frac{y_2-y_1}{x_2-x_1}$
- $m_{LM}=\frac{9-6}{5+1}=\frac{3}{6}=\frac{1}{2}$
- $m_{NP}=\frac{-2-2}{-8-0}=\frac{-4}{-8}=\frac{1}{2}$
- $m_{MN}=\frac{2-9}{0-5}=\frac{-7}{-5}=\frac{7}{5}$
- $m_{PL}=\frac{6+2}{-1+8}=\frac{8}{7}$

## Step2: Check parallel slopes
$m_{LM}=m_{NP}$, but $m_{MN}
eq m_{PL}$, so not a parallelogram.

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### Problem 15:
## Step1: Calculate slopes (parallel check)
- $m_{BC}=\frac{-5+9}{0+2}=\frac{4}{2}=2$
- $m_{DT}=\frac{-7+3}{4-6}=\frac{-4}{-2}=2$
- $m_{CD}=\frac{-3+5}{6-0}=\frac{2}{6}=\frac{1}{3}$
- $m_{TB}=\frac{-9+7}{-2-4}=\frac{-2}{-6}=\frac{1}{3}$

## Step2: Calculate lengths (congruent check)
- $BC=\sqrt{(0+2)^2+(-5+9)^2}=\sqrt{4+16}=\sqrt{20}=2\sqrt{5}$
- $DT=\sqrt{(4-6)^2+(-7+3)^2}=\sqrt{4+16}=\sqrt{20}=2\sqrt{5}$
- $CD=\sqrt{(6-0)^2+(-3+5)^2}=\sqrt{36+4}=\sqrt{40}=2\sqrt{10}$
- $TB=\sqrt{(-2-4)^2+(-9+7)^2}=\sqrt{36+4}=\sqrt{40}=2\sqrt{10}$

## Step3: Verify parallelogram criteria
Opposite sides are parallel and congruent, so it is a parallelogram.

# Answer:
11. $x = 4$, $y = 12$
12. $m\angle C = 80^\circ$
13. YES
14. NO
15. YES

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QUESTION IMAGE

Question

Explanation:

Problem 11:

Step1: Set opposite sides equal

Step2: Solve for \(x\)

Step3: Solve for \(y\)

Problem 12:

Step1: Use consecutive angles property

Step2: Solve for \(x\)

Step3: Find \(m\angle C\)

Problem 13:

Step1: Calculate all side lengths

Step2: Check opposite sides equality

Problem 14:

Step1: Calculate all side slopes

Step2: Check parallel slopes

Problem 15:

Step1: Calculate slopes (parallel check)

Step2: Calculate lengths (congruent check)

Step3: Verify parallelogram criteria

Answer: