find the measures of angles 1 through 5 in the figure shown.
$m\angle1=\square^{\circ}$

Question

Accepted Answer

# Explanation:
## Step1: Calculate $\angle 1$ via triangle sum
The right triangle has angles $90^\circ$, $39^\circ$, and $\angle 1$. The sum of angles in a triangle is $180^\circ$.
$\angle 1 = 180^\circ - 90^\circ - 39^\circ$
## Step2: Compute $\angle 1$ value
$\angle 1 = 51^\circ$
## Step3: Find $\angle 2$ via linear pair
$\angle 1$ and $\angle 2$ form a straight line ($180^\circ$).
$\angle 2 = 180^\circ - 51^\circ = 129^\circ$
## Step4: Find $\angle 3$ via vertical angles
$\angle 1$ and $\angle 3$ are vertical angles (congruent).
$\angle 3 = 51^\circ$
## Step5: Find $\angle 4$ via vertical angles
$\angle 2$ and $\angle 4$ are vertical angles (congruent).
$\angle 4 = 129^\circ$
## Step6: Calculate $\angle 5$ via triangle sum
The top triangle has angles $81^\circ$, $\angle 3$, and $\angle 5$.
$\angle 5 = 180^\circ - 81^\circ - 51^\circ = 48^\circ$

# Answer:
$\angle 1 = 51^\circ$, $\angle 2 = 129^\circ$, $\angle 3 = 51^\circ$, $\angle 4 = 129^\circ$, $\angle 5 = 48^\circ$

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QUESTION IMAGE

Question

Explanation:

Step1: Calculate $\angle 1$ via triangle sum

Step2: Compute $\angle 1$ value

Step3: Find $\angle 2$ via linear pair

Step4: Find $\angle 3$ via vertical angles

Step5: Find $\angle 4$ via vertical angles

Step6: Calculate $\angle 5$ via triangle sum

Answer: