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Question
given: $overline{ps}congoverline{qs},overline{dp}congoverline{lq}$ prove: $\triangle dsl$ is isosceles. 1. given 2. base angles theorem 3. $angle1,angle2$ and $angle3,angle4$ are linear pairs. 4. $angle1,angle2$ and $angle3,angle4$ are supplementary. 4. if two angles are a linear pair, then they
Step1: State given information
$\overline{PS}\cong\overline{QS},\overline{DP}\cong\overline{LQ}$
Step2: Apply Base - Angles Theorem
Since $\overline{PS}\cong\overline{QS}$, then $\angle SPQ=\angle SQP$
Step3: Define linear pairs
$\angle 1,\angle 2$ and $\angle 3,\angle 4$ are linear pairs
Step4: Use property of linear pairs
If two angles are a linear pair, they are supplementary, so $\angle 1 = 180^{\circ}-\angle 2$ and $\angle 4 = 180^{\circ}-\angle 3$
Step5: Substitute equal angles
Since $\angle SPQ=\angle SQP$, substitute to get $180^{\circ}-\angle 1=180^{\circ}-\angle 4$
Step6: Simplify using subtraction property
Subtract 180° from both sides to get $\angle 1=\angle 4$
Step7: Prove triangle is isosceles
Since $\angle 1=\angle 4$ in $\triangle DSL$, $\triangle DSL$ is isosceles
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- $\overline{PS}\cong\overline{QS},\overline{DP}\cong\overline{LQ}$
- $\angle SPQ=\angle SQP$ (Base - Angles Theorem since $\overline{PS}\cong\overline{QS}$)
- Definition of linear - pairs
- Definition of supplementary angles
- $\angle 1 = 180^{\circ}-\angle 2$ and $\angle 4 = 180^{\circ}-\angle 3$
- Since $\angle SPQ=\angle SQP$, then $180^{\circ}-\angle 1=180^{\circ}-\angle 4$ (Substitution)
- $\angle 1=\angle 4$ (Subtraction Property of Equality)
- $\triangle DSL$ is isosceles (If two angles of a triangle are congruent, then the triangle is isosceles)