In the figure, lines a, b, and c are parallel and mZ4 = 48°.
Drag and drop the correct angle measure for each angle.

(Refer to photo for more info)
Please and thank you!

[tex]m \angle \: 1 = m \angle \: 4 \\ (exterior \: alternate \: \angle s) \\ \therefore m \angle \: 1 = \boxed{48 \degree} \\ \\ m \angle \: 2 = 180 \degree - m \angle \: 1 \\ (liner \: pair \: \angle s) \\ \therefore m \angle \: 2 = \boxed{132 \degree} \\ \\ m \angle \: 3 = m \angle \: 2 \\ (interior \: alternate \: \angle s) \\ \therefore m \angle \: 3 = \boxed{132 \degree} \\ \\ m \angle \: 5 = m \angle \: 4 \\ (corresponding \: \angle s) \\ \therefore m \angle \: 5 = \boxed{48 \degree}[/tex]

In the figure, lines a, b, and c are parallel and mZ4 = 48°. Drag and drop the correct angle measure for each angle. (Refer to photo for more info) Please and thank you!

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In the figure, lines a, b, and c are parallel and mZ4 = 48°.
Drag and drop the correct angle measure for each angle.

(Refer to photo for more info)
Please and thank you!