QUESTION IMAGE
Question
in δcde, de = 15, ec = 9, and cd = 13. what is the order of the angles smallest to largest. smallest choose choose largest choose
Step1: Recall the triangle angle - side relationship
In a triangle, the larger the side opposite an angle, the larger the angle. So we need to first identify the sides and their opposite angles in \(\triangle CDE\).
Let's label the triangle: In \(\triangle CDE\), side \(DE = 15\), side \(EC=9\), side \(CD = 13\).
- The angle opposite \(DE\) is \(\angle C\) (because in \(\triangle CDE\), side \(DE\) is opposite vertex \(C\)).
- The angle opposite \(EC\) is \(\angle D\) (side \(EC\) is opposite vertex \(D\)).
- The angle opposite \(CD\) is \(\angle E\) (side \(CD\) is opposite vertex \(E\)).
Step2: Order the sides from smallest to largest
First, order the lengths of the sides: \(EC = 9\), \(CD=13\), \(DE = 15\). So \(9<13<15\), which means \(EC < CD Since the angle opposite a smaller side is smaller, we have: So the order of the angles from smallest to largest is \(\angle D\), \(\angle E\), \(\angle C\).Step3: Order the angles based on the side - angle relationship
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Smallest: \(\angle D\)
Middle: \(\angle E\)
Largest: \(\angle C\)