Question

Draw line l and M intersected by a transversal t . Construct angle bisector of the interior angle on same side of the transversal .​

Answer 1

construction

Step-by-step explanation:

We follow these steps to construct our diagram , As :

Step 1 : Draw a line l  .

Step 2 :  Draw a line AB that  intersect our line l at " A " . and take any point  "  P " on line AB .

Step 3 :  Take any  radius and center "  A "  draw an arc that intersect our line l at  " C "  and line AB at "  D "

Step 4 : With same radius and center "  P "  draw  semicircle  that intersect  line AB at "  E " and " G  " .

Step 5 :  Now take radius as length of CD and center " E "  draw an arc that intersect our previous arc at "  F " .

Step 6 :  Now Join PF and extend it that line is our required line " m "

Step 7 : Now take radius as PG and take center " F " and " G " and draw arcs these arcs intersect at " H " .

Step 8 : Now take radius as AD and take center " C " and " D " and draw arcs these arcs intersect at " I " .

Join angle bisecting rays PH and AI these rays intersect at  "  X " .

Now we measure $\angle AXP = 90$°

#Learn more:

If 2 parallel lines are intersected by a transversal, prove that the bisector of the interior angles on the same side of the interior angles on the same side of the transversal line interact each other at right angle

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