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30 September, 23:41

Proving the Parallelogram Diagonal Theorem

Given ABCD is a parralelogam, Diagnals AC and BD intersect at E

Prove AE is conruent to CE and BE is congruent to DE

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Answers (2)
  1. 30 September, 23:42
    0
    The proof is given below.

    Step-by-step explanation:

    Given a parallelogram ABCD. Diagonals AC and BD intersect at E. We have to prove that AE is congruent to CE and BE is congruent to DE i. e diagonals of parallelogram bisect each other.

    In ΔACD and ΔBEC

    AD=BC (∵Opposite sides of parallelogram are equal)

    ∠DAC=∠BCE (∵Alternate angles)

    ∠ADC=∠CBE (∵Alternate angles)

    By ASA rule, ΔACD≅ΔBEC

    By CPCT (Corresponding Parts of Congruent triangles)

    AE=EC and DE=EB

    Hence, AE is conruent to CE and BE is congruent to DE
  2. 1 October, 00:09
    0
    Step-by-step explanation:

    1. ABCD is a parallelogram - -Given

    2. AB≌CD--parallelogram side theorem

    3. AB∥CD--def. of parellelogram

    4. ∠ABE and ∠CDE are alt. interior angles- - def. of alt. interior angles

    5.∠BAE and ∠DCE are alt. interior angles- - def. of alt. interior angles

    6. ∠BAE≌∠DCE--alt. interior angles theorem

    7. ∠ABE≌CDE--alt. interior angle theorm

    8. ⊿BAE≌⊿DCE- - ASA

    9. AE≌CE- - CPCTC

    10. BE≌DE- - CPCTC
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