If two lines intersect, they form four angles. Let's call the angle that measures 135° as angle A. The other three angles are B, C, and D.
Since the two lines intersect, the sum of all four angles is 360°.
Therefore, we can write an equation: A + B + C + D = 360°.
Since angle A measures 135°, we can substitute that value into the equation:
135° + B + C + D = 360°.
Now we can solve for the other three angles by subtracting 135° from both sides of the equation:
B + C + D = 360° - 135°.
Simplifying further:
B + C + D = 225°.
Since the sum of angles B, C, and D is 225°, we cannot determine the exact measures of each individual angle unless additional information is provided.
Two lines intersect One of the angles formed measures 135° what are the measures of the other three angles
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