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AB is parallel to CD. CD is rotated 180°. Which statement describes the relationship between C'D' and the transformed AB? How can you prove it?

A) C'D' intersects AB; Graph the points to find the point of intersection.

B) C'D' || AB; Use the slope formula to prove that the segments have the same slope.

C) C'D'≠AB; Use the distance formula to prove that the segments are not the same length.

D) C'D' ⊥ AB; Use the slope formula to prove that the segments have opposite reciprocated slopes.

Respuesta :

Answer :- Statement (B) ,C'D' ll AB

Given AB is parallel to CD.  CD rotated[tex]180^{\circ}[/tex].

Consider a transversal line l intersecting AB and CD at angle x.

therefore By slope formula,

slope of AB and CD = m =tanx

Now after rotation of  [tex]180^{\circ}[/tex] CD become C'D'

therefore, slope of C'D' = [tex]tan(x+180^{\circ})[/tex]=tanx=m

Hence C'D' ll AB.




Ver imagen Pitymys

Answer: B C’D’ || AB ; Use the slope formula to prove that the segments have the same slope.

Step-by-step explanation: