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asked Dec 28, 2019 206k views

1 Answer

Kitanga Nday · Answer 1 · 2020-01-04T12:26:10+0000

Answer:

$\boxed{\boxed{w^(\circ)+x^(\circ)+y^(\circ)+z^(\circ)=180^(\circ)}}$

Explanation:

Given that PQST is a parallelogram, so

$\Rightarrow QS\ ||\ PT$

As a parallelogram is a quadrilateral with both pairs of opposite sides parallel.

PR and RT are the transversal to the parallel lines QS and PT, so

$\Rightarrow m\angle QRP=m\angle RPT\ and\ m\angle SRT=m\angle RTP$

As they are alternate interior angles.

Hence,

$\Rightarrow m\angle RPT=x^(\circ)\ and\ m\angle RTP=y^(\circ)$

When the two lines being crossed are parallel lines the consecutive interior angles add up to 180°.

So,
$m\angle QPT+m\angle STP=180^(\circ)$

$\Rightarrow m\angle QPR+m\angle RPT+m\angle RTP+m\angle RTS=180^(\circ)$

$\Rightarrow w^(\circ)+x^(\circ)+y^(\circ)+z^(\circ)=180^(\circ)$