Match each statement to the correct angle measure. The longer leg is across from Choose... The shorter leg is across from Choose... The hypotenuse is across fror Choose... the \( 90^{\circ} \) angle. the \( 60^{\circ} \) angle. the \( 30^{\circ} \) angle.

In a 30-60-90 triangle, the longer leg is across from the \( 60^{\circ} \) angle, making it the side that stretches out like a tall tower! The shorter leg, being more humble and just a bit shy, lies across from the \( 30^{\circ} \) angle. Lastly, the hypotenuse, which holds the title of the longest side, bravely stands opposite the \( 90^{\circ} \) angle, anchoring the triangle with a solid foundation. This triangle ratio can be useful for quick calculations! In practical terms, if you're designing a roof or constructing a ramp, remembering the proportions of sides in a 30-60-90 triangle—where the lengths relate as \( 1:\sqrt{3}:2 \)—can lead to easy measurements and stunning results!