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This worksheet covers Angle Transversals, which is part of the Lines, Angles, and Triangle Properties module in the SAT Math course. Practice problems are designed to strengthen key concepts and build confidence.
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Set 4 — Mastery
If two parallel lines are cut by a transversal, and one of the alternate interior angles measures 65 degrees, what is the measure of the other alternate interior angle?
65 degrees
115 degrees
130 degrees
75 degrees
In the figure below, if angle 1 is 40 degrees and angle 2 is the corresponding angle to angle 1, what is the measure of angle 2?
40 degrees
140 degrees
180 degrees
100 degrees
If two parallel lines are cut by a transversal creating angles of 3x + 15 and 2x - 25, what is the value of x?
10
15
5
20
What is the sum of the interior angles of a triangle formed by the intersection of two lines and a transversal?
180 degrees
360 degrees
90 degrees
270 degrees
If two lines intersect and form angles of x and 3x, what is the value of x if the angles are supplementary?
30
60
90
45
A transversal intersects two parallel lines and creates angles of 2x + 10 and 3x - 20. What is the measure of the smaller angle?
40
30
50
60
If two angles are complementary and one angle measures x degrees, what is the measure of the other angle?
90 - x
90 + x
x + 90
180 - x
If a transversal intersects two parallel lines and creates an angle of 50 degrees, what is the measure of the vertically opposite angle?
50 degrees
130 degrees
90 degrees
180 degrees
If angle C is supplementary to angle D, and angle D measures 110 degrees, what is the measure of angle C?
70 degrees
110 degrees
90 degrees
80 degrees
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