34. The measure of one angle is \( 3^{\circ} \) more than \( \frac{1}{2} \) the measure of its supplement. 35. Two angles form a linear pair. The measure of one angle is \( 15^{\circ} \) less than \( \frac{2}{3} \) the measure of the other angle.

In the first scenario, we can dive into the world of linear pair angles! The concept of supplementary angles is delightful; they’re like best friends that always add up to \(180^{\circ}\). If one angle is \(3^{\circ}\) more than half its supplement, you’re embarking on a fun puzzle where you set up the equations, solve for \(x\), and voila! You’ve found the angles. For the second scenario, let’s chat about linear pairs! Here, the challenge lies in the relationship between the two angles, where one is slightly shy, being \(15^{\circ}\) less than \( \frac{2}{3} \) of the other angle. These types of angle problems often lead to fascinating discoveries about the relationships of angles and help to sharpen algebraic skills. Creativity shines when you try drawing these angles and seeing how they fit together!