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Given: JKLM is an isosceles trapezoid, KL ∥ JM - Brainly. com In isosceles trapezoid JKLM, we prove KM ≅ JL by establishing that the non-parallel sides are equal, the angles at the bases are congruent, and using the SAS theorem to show congruence of triangles JKL and MLK, leading to CPCTC
[FREE] Given: JKLM is an isosceles trapezoid, KL \parallel JM Prove: KM . . . The missing reason in step 4 is the Base Angles Theorem, which states that in an isosceles trapezoid, the angles adjacent to the bases are congruent This property is crucial for proving that the two triangles formed from the trapezoid are congruent, leading to the conclusion that the sides K M and J L are also congruent
Given: JKLM is an isosceles trapezoid, KL - Brainly. com The missing reason in step 4 is the Base Angles Theorem, which states that the base angles of an isosceles trapezoid are congruent By applying this theorem and the SAS congruence theorem, we can conclude KM is congruent to JL
Given: JKLM is an isosceles trapezoid, KL ∥ JM Prove: KM ≅ JL What is . . . The missing reason in step 4 is 'C Base angles theorem' because it establishes the congruence of angles JKL and MLK, leading to the congruence of triangles JKL and MLK This allows for the conclusion that KM ≅ JL due to CPCTC This reasoning relies on the properties of isosceles trapezoids, emphasizing the equality of opposite angles and sides
Given: The coordinates of isosceles trapezoid JKLM are J (-b, c), K (b . . . Select the correct answer given: isosceles trapezoid abcd with diagonals bd and ac prove:ac=bd statement reason isosceles trapezoid with diagonals and given definition of isosceles trapezoid reflexive property of congruence base angles of an isosceles trapezoid are congruent ? cpctc identify the missing reason in the proof
Given: JKLM is an isosceles trapezoid, with KL parallel to JM. To prove that KM is equal to JL in the isosceles trapezoid JKLM, we can use properties of isosceles trapezoids Definition of Isosceles Trapezoid: An isosceles trapezoid has one pair of parallel sides (the bases) and the other pair of sides (the legs) are congruent
[FREE] Using the SAS Congruence Theorem Given: - JK \parallel LM - JK . . . We proved that J K L ≅ LNM by demonstrating that two sides and the included angle of each triangle are congruent We utilized the conditions of parallel lines, congruent segments, and the properties of midpoints Therefore, by the SAS Congruence Theorem, the triangles are congruent