QUESTION IMAGE
Question
given that abcd is a parallelogram. prove ∠b≅∠d
move the options to the spaces to complete the proof.
statements reasons
abcd is a parallelogram given
definition of a parallelogram
m∠a + m∠b = 180° and m∠a + m∠d = 180°
m∠a + m∠b = m∠a + m∠d
m∠b = m∠d
∠b≅∠d angles with the same measure are congruent
ab≅dc and bc≅ad
ab || dc and bc || ad
alternate interior angles theorem
corresponding angles theorem
same - side interior angles theorem
substitution
multiplicative property of equality
subtraction property of equality
Step1: Recall parallelogram property
$\overline{AB}\parallel\overline{DC}$ and $\overline{BC}\parallel\overline{AD}$ (Definition of a parallelogram)
Step2: Use same - side interior angles
$m\angle A + m\angle B=180^{\circ}$ and $m\angle A + m\angle D = 180^{\circ}$ (Same - Side Interior Angles Theorem)
Step3: Set up equality
$m\angle A + m\angle B=m\angle A + m\angle D$ (Substitution)
Step4: Solve for angle measures
$m\angle B=m\angle D$ (Subtraction Property of Equality)
Step5: Prove angle congruence
$\angle B\cong\angle D$ (Angles with the same measure are congruent)
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| Statements | Reasons |
|---|---|
| $\overline{AB}\parallel\overline{DC}$ and $\overline{BC}\parallel\overline{AD}$ | Definition of a parallelogram |
| $m\angle A + m\angle B = 180^{\circ}$ and $m\angle A + m\angle D = 180^{\circ}$ | Same - Side Interior Angles Theorem |
| $m\angle A + m\angle B=m\angle A + m\angle D$ | Substitution |
| $m\angle B=m\angle D$ | Subtraction Property of Equality |
| $\angle B\cong\angle D$ | Angles with the same measure are congruent |