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What information would verify that LMNO is an isosceles trapezoid . . . ∠L ≅ ∠N: This suggests that the angles corresponding to the non-parallel sides are equal, which is true in an isosceles trapezoid ∠L ≅ ∠M : In some definitions, especially in a trapezoid context, this is only valid if the trapezoid is isosceles, implying base angles are equal as well, contributing towards proving the trapezoid as
What information would verify that LMNO is an isosceles trapezoid . . . ∠ L = ∠ N - This condition states that the angles adjacent to the base are equal, which confirms that the trapezoid is isosceles ∠ L EM = ∠ NEM - This condition states that the angles formed with a line drawn from a point on one base to the other base are equal, which can also indicate the trapezoid is isosceles, depending on the
Trapezoid LMNO is shown with sides LM and ON being parallel. - Brainly. com LN ≅ MO; ∠L ≅ ∠N (optional but confirming) ∠L ≅ ∠M (optional but confirming) In summary, the most important condition is that the legs are equal in length (LN ≅ MO) and at least one pair of base angles is equal (∠L ≅ ∠N or ∠L ≅ ∠M)
Given: Isosceles trapezoid EFGH Prove: ΔFHE ≅ ΔGEH . . . - Reddit We know that FE ≅ GH by the definition of congruentisosceles trapezoidcongruent triangles The base angle theorem of isosceles trapezoids verifies that angle FEHFEGFHE is congruent to angle HEGHEHEG
Which statements are true regarding the symmetry of the isosceles . . . An isosceles trapezoid is a special type of trapezoid with two sides of equal length, known as legs, and the bases are parallel Understanding its symmetry involves analyzing both reflectional and rotational symmetry Reflectional Symmetry: An isosceles trapezoid has one line of reflectional symmetry This line divides the trapezoid vertically