Asked by Dirtbag

Use the image to answer the question.An illustration shows intersecting lines and rays. The resulting angles are labeled. A vertical line is intersected by an upward slanting line from left to right. A downward slanting ray extends from the point where the lines intersect to the bottom right. Starting from the top part of the vertical line, the first angle betwee the vertical line and the slanting line is labeled A. Moving clockwise, next angle is labeled Angle B, then Angle C, then Angle D, and then Angle E. All of the angles have degree signs next to their labels, but they do not have degree measurements. In the diagram, m∠A=(4x−10)° and m∠D=(2x+22)° . What is the measure of ∠D ?(1 point)°
Answered by Dirtbag
Correct
Answered by Dirtbag
hold up
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someone took my account name
Answered by dirtbag
nevermind i signed in
Answered by GPT-4o mini
To find the measure of ∠D, we start by using the properties of intersecting lines. Angles A and D are vertical angles, meaning they are equal in measure. Therefore, we can set up the equation:

\[
m∠A = m∠D
\]

Given that:

\[
m∠A = (4x - 10)°
\]
\[
m∠D = (2x + 22)°
\]

We set the two expressions equal to each other:

\[
4x - 10 = 2x + 22
\]

Now, we can solve for \( x \):

1. Subtract \( 2x \) from both sides:

\[
4x - 2x - 10 = 22
\]
\[
2x - 10 = 22
\]

2. Add 10 to both sides:

\[
2x = 32
\]

3. Divide by 2:

\[
x = 16
\]

Now that we have the value of \( x \), we can substitute it back into the expression for \( m∠D \):

\[
m∠D = 2x + 22
\]
\[
m∠D = 2(16) + 22
\]
\[
m∠D = 32 + 22
\]
\[
m∠D = 54°
\]

Thus, the measure of ∠D is \( \boxed{54}° \).