Use the image to answer the question. Use the Triangle Angle Sum Theorem to find the measure of the angles for the triangle in the diagram. (1 point) Responses 59°, 63°, and 48° 59 degrees , 63 degrees , and 48 degrees 54°, 44°, and 82° 54 degrees , 44 degrees , and 82 degrees 59°, 58°, and 63° 59 degrees , 58 degrees , and 63 degrees 57°, 54°, and 69° 57 degrees , 54 degrees , and 69 degrees Skip to navigation
5 answers
Unfortunately, there is no image provided in your question. Please provide the image or description of the triangle for us to help you determine the measure of the angles.
Use the image to answer the question. Use the Triangle Angle Sum Theorem to find the measure of the angles for the triangle in the diagram. (1 point) Responses 59°, 63°, and 48° 59 degrees , 63 degrees , and 48 degrees 54°, 44°, and 82° 54 degrees , 44 degrees , and 82 degrees 59°, 58°, and 63° 59 degrees , 58 degrees , and 63 degrees 57°, 54°, and 69° 57 degrees , 54 degrees , and 69 degrees Skip to navigation
4x + 14
5x + 4
6x-3
4x + 14
5x + 4
6x-3
I apologize, but without knowing the specific relationships or measurements given in the diagram, I am unable to determine the angles of the triangle. Please provide more information or the image for further assistance.
Use the image to answer the question. Use the Triangle Angle Sum Theorem to find the measure of the angles for the triangle in the diagram. (1 point) Responses 59°, 63°, and 48° 59 degrees , 63 degrees , and 48 degrees 54°, 44°, and 82° 54 degrees , 44 degrees , and 82 degrees 59°, 58°, and 63° 59 degrees , 58 degrees , and 63 degrees 57°, 54°, and 69° 57 degrees , 54 degrees , and 69 degrees Skip to navigation
Angles:
4x + 14
5x + 4
6x-3
Angles:
4x + 14
5x + 4
6x-3
To find the measure of the angles, we can use the Triangle Angle Sum Theorem, which states that the sum of the interior angles of a triangle is always 180 degrees.
Let's denote the measures of the angles as follows:
Angle 1: 4x + 14
Angle 2: 5x + 4
Angle 3: 6x - 3
According to the Triangle Angle Sum Theorem, we have the equation:
Angle 1 + Angle 2 + Angle 3 = 180
Substituting the measures of the angles, we get:
(4x + 14) + (5x + 4) + (6x - 3) = 180
Combining like terms, we have:
15x + 15 = 180
Subtracting 15 from both sides:
15x = 165
Dividing both sides by 15:
x = 11
Now we can find the measures of the angles:
Angle 1 = 4x + 14 = 4(11) + 14 = 44 + 14 = 58 degrees
Angle 2 = 5x + 4 = 5(11) + 4 = 55 + 4 = 59 degrees
Angle 3 = 6x - 3 = 6(11) - 3 = 66 - 3 = 63 degrees
So, the measures of the angles in the triangle are 58 degrees, 59 degrees, and 63 degrees.
Therefore, the correct response is: 59°, 58°, and 63°.
Let's denote the measures of the angles as follows:
Angle 1: 4x + 14
Angle 2: 5x + 4
Angle 3: 6x - 3
According to the Triangle Angle Sum Theorem, we have the equation:
Angle 1 + Angle 2 + Angle 3 = 180
Substituting the measures of the angles, we get:
(4x + 14) + (5x + 4) + (6x - 3) = 180
Combining like terms, we have:
15x + 15 = 180
Subtracting 15 from both sides:
15x = 165
Dividing both sides by 15:
x = 11
Now we can find the measures of the angles:
Angle 1 = 4x + 14 = 4(11) + 14 = 44 + 14 = 58 degrees
Angle 2 = 5x + 4 = 5(11) + 4 = 55 + 4 = 59 degrees
Angle 3 = 6x - 3 = 6(11) - 3 = 66 - 3 = 63 degrees
So, the measures of the angles in the triangle are 58 degrees, 59 degrees, and 63 degrees.
Therefore, the correct response is: 59°, 58°, and 63°.
1 answer