Question
Angles of Triangles Quick Check
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Question
Use the image to answer the question.
An illustration shows triangle uppercase H uppercase I uppercase J. Uppercase H is the left vertex, uppercase I is the top vertex, and uppercase J is the right vertex. A line extending outward from uppercase H forms an exterior angle of 38 degrees.
What is the sum of the measures of the interior angles at vertex I and vertex J ?
(1 point)
Responses
128°
128 degrees
38°
38 degrees
142°
142 degrees
52°
52 degrees
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5 of 55 of 5 Items
Question
Use the image to answer the question.
An illustration shows triangle uppercase H uppercase I uppercase J. Uppercase H is the left vertex, uppercase I is the top vertex, and uppercase J is the right vertex. A line extending outward from uppercase H forms an exterior angle of 38 degrees.
What is the sum of the measures of the interior angles at vertex I and vertex J ?
(1 point)
Responses
128°
128 degrees
38°
38 degrees
142°
142 degrees
52°
52 degrees
Skip to navigation
Answers
GPT-4o mini
In a triangle, the sum of the interior angles is always 180 degrees. The exterior angle at vertex H measures 38 degrees, and it is equal to the sum of the interior angles at the opposite vertices I and J.
Using the exterior angle theorem:
\[
\text{Exterior angle} = \text{Interior angle at I} + \text{Interior angle at J}
\]
Given that the exterior angle is 38 degrees:
\[
38° = \text{Interior angle at I} + \text{Interior angle at J}
\]
Thus, the sum of the measures of the interior angles at vertex I and vertex J is:
\[
\text{Interior angle at I} + \text{Interior angle at J} = 38°
\]
Since the total sum of the angles in triangle HIJ is 180°, we can find the sum of the interior angles at vertices I and J:
\[
\text{Interior angle at H} + \text{Interior angle at I} + \text{Interior angle at J} = 180°
\]
Now let's denote the sum of the angles at I and J as x:
\[
\text{Interior angle at H} + x = 180°
\]
From the exterior angle theorem:
\[
x + 38° = 180°
\]
So:
\[
x = 180° - 38° = 142°
\]
Therefore, the sum of the measures of the interior angles at vertex I and vertex J is **142°**.
Using the exterior angle theorem:
\[
\text{Exterior angle} = \text{Interior angle at I} + \text{Interior angle at J}
\]
Given that the exterior angle is 38 degrees:
\[
38° = \text{Interior angle at I} + \text{Interior angle at J}
\]
Thus, the sum of the measures of the interior angles at vertex I and vertex J is:
\[
\text{Interior angle at I} + \text{Interior angle at J} = 38°
\]
Since the total sum of the angles in triangle HIJ is 180°, we can find the sum of the interior angles at vertices I and J:
\[
\text{Interior angle at H} + \text{Interior angle at I} + \text{Interior angle at J} = 180°
\]
Now let's denote the sum of the angles at I and J as x:
\[
\text{Interior angle at H} + x = 180°
\]
From the exterior angle theorem:
\[
x + 38° = 180°
\]
So:
\[
x = 180° - 38° = 142°
\]
Therefore, the sum of the measures of the interior angles at vertex I and vertex J is **142°**.