If the m<2 = 40, what is the m<5? 140 110 80 40
Since angles 2 and 5 are vertical angles, they are equal in measure. Therefore, if m<2 = 40, then m<5 must also be equal to 40.
To find the measure of angle 5 (m<5), we need to use the relationship between angles formed by parallel lines and a transversal. According to the interior angle property, when parallel lines are intersected by a transversal, the corresponding angles are congruent.
In this case, angles 2 (m<2) and 5 (m<5) are corresponding angles. Since we already know that m<2 = 40, we can conclude that m<5 is also 40 degrees, making the correct answer 40.
To find the measure of angle 5, we need to determine the relationship between angles 2 and 5.
If angle 2 is given as 40 degrees, we need additional information to determine the measure of angle 5.