Complete the following statements to prove that ikl and jld are supplementary angles. . By the (substitution property of equality reflexive property of equality, or division property of equality) , m∠IKL + m∠JLD = 180°. Therefore, ∠IKL and ∠JLD are supplementary angles by definition. Also, ∠ EIJ≌ ∠ IKL and ∠ GJI≌ ∠ JLK, as they are corresponding angles for parallel lines cut by a transversal. Also, ∠ EIJ≌ ∠ IKL and ∠ GJI≌ ∠ JLK , as they are corresponding angles for parallel lines cut by a transversal. Question Complete the following statements to prove that ∠ IKL and ∠ JLD are supplementary angles. Complete the following statements to prove that ∠IKL and ∠JLD are supplementary angles. Also, ∠EIJ ≅ ∠IKL and ∠GJI ≅ ∠JLK, as they are corresponding angles for parallel lines cut by a transversal. Given: ∠A∠A and ∠B∠B are supplementary angles. 2 beginning proofs about angles Use the given information to complete the proof. Prove: ∠A≅∠C∠A≅∠C Match the reason with the provided statements to complete the proof. It is given that angle E I J cong angle G J I . ∠B∠B and ∠C∠C are supplementary angles. Complete the following statements to prove that angle I K L and angle J L D are supplementary angles. It is given that ∠ EIJ≌ ∠ GJI. Transitive Property of Equality workbook 5. It is given that ∠EIJ ≅ ∠GJI. By the definition of congruent angles, m∠EIJ = m∠GJI, m∠EIJ = m∠IKL, and m∠GJI = m∠JLK. Nov 28, 2023 · To prove that ∠IKL and ∠JLD are supplementary, we rely on the given information from the Congruent Supplements Theorem and the definition of supplementary angles, which are two angles that add up to 180 degrees. lokntw znatmb mmjgyue phlvalf ugd llh cet vtgbxcosj jcour ltxe