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If the bisectors of angles of a quadrilateral enclose a rectangle, then show that it is a parallelogram.
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Quadrilateral PQRS has angle bisectors PT,QA,RA,SC.ΔPQB,ΔQBT,ΔSDC are right angled triangle.Let angle P=2xso, ∠PQB=90−x=∠BQT∴∠QTB=(90−(90−x))=x∠CTR=180−xIn triangle SDR,∠RDS=90∘, in parallelogram DCTR∠DCT & ∠CDR=90∘∴∠DRT=x & ∠DRS=x∴∠DSR=90−xsum of adjacent angles, ∠P+∠Q=180∘Opposite angles ∠P=∠R,∠Q=∠C∴ PQRS is parallelogram
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Q2
In the following diagram, the bisectors of interior angles of the parallelogram PQRS en-close a quadrilateral ABCD.
Show that: (i) ∠PSB+∠SPB=90∘(ii) ∠PBS=90∘ (iii) ∠ABC=90∘(iv) ∠ADC=90∘ (v) ∠A=90∘(vi) ABCD is a rectangleThus, the bisectors of the angles of a parallelogram enclose a rectangle.
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Q3
The angle-bisectors of a parallelogram forms a quadrilateral as shown in the figure. Show that ABCD is a rectangle.
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Q4
Prove that the quadrilateral formed by the bisectors of the angles of a parallelogram is a rectangle.
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Q5
Prove that quadrilateral formed by the intersection of angle bisectors of all angles of a parallelogram is a rectangle.
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