1. We have been given that a∥b , and c is neither parallel to a nor b.
Let us see which of our given options are correct.
A. m∠7 can not be equal to m∠11 as line c is not parallel to line a.
B. m∠5 can not be equal to m∠12 as line c is not parallel to line b.
C. By alternate interior angles m∠4=m∠5 as ∠4 is inside line a and ∠5 is inside line b. Both angles are on the opposite sides of transversal.
D. Since we know that corresponding angles are congruent. We can see that ∠5 corresponds to ∠1, therefore, m∠1=m∠5.
Therefore, Option C and D are correct choices.
2. We have been given that AB∥CD and m∠4=85°. We are asked to find measure of ∠5.
Since we know that same side interior angles are supplementary. In our figure we can see that ∠4 and ∠5 are same side interior angles.
[tex]\measuredangle 4+\measuredangle 5=180^{o}[/tex]
[tex]85^{o}+\measuredangle 5=180^{o}[/tex]
[tex]\measuredangle 5=180^{o}-85^{o}[/tex]
[tex]\measuredangle 5=95^{o}[/tex]
Therefore, measure of ∠5 will be 95 degrees.
