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... Given ΔABC is isosceles, with base AC . BD is the altitude to base AC . Prove BD is a median of ΔABC. Proof Legs AB and CD of ΔABC are congruent. _ADB_ and _CDB_ are congruent right angles because BD is the _altitude_ to AC . Also, BD BD . Therefore, ΔADB ΔCDB by the _HL Congruence Theorem_. A ...
... Given ΔABC is isosceles, with base AC . BD is the altitude to base AC . Prove BD is a median of ΔABC. Proof Legs AB and CD of ΔABC are congruent. _ADB_ and _CDB_ are congruent right angles because BD is the _altitude_ to AC . Also, BD BD . Therefore, ΔADB ΔCDB by the _HL Congruence Theorem_. A ...
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... 1. Why are the two non-right angles in a right triangle always complementary? 2. What did you learn when you compared the areas of the squares on the three sides of the right triangle? 3. How does the length of the hypotenuse relate to the lengths of the other two sides of a right triangle? ...
... 1. Why are the two non-right angles in a right triangle always complementary? 2. What did you learn when you compared the areas of the squares on the three sides of the right triangle? 3. How does the length of the hypotenuse relate to the lengths of the other two sides of a right triangle? ...
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... Question: Can a triangle have two obtuse angles? Why or Why not? When describing triangles, we can refer to the sides and angles as "opposite" each other. For example, we might say, "The side opposite the right angle is the longest side of the right triangle." The side opposite an ̅̅̅̅ is the side o ...
... Question: Can a triangle have two obtuse angles? Why or Why not? When describing triangles, we can refer to the sides and angles as "opposite" each other. For example, we might say, "The side opposite the right angle is the longest side of the right triangle." The side opposite an ̅̅̅̅ is the side o ...
