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The following is an incorrect flowchart proving that point L, lying on line LM which is a perpendicular bisector of segment JK, is equidistant from points J and K:
What is the error in this flowchart?

50 POINTS The following is an incorrect flowchart proving that point L lying on line LM which is a perpendicular bisector of segment JK is equidistant from poin class=
50 POINTS The following is an incorrect flowchart proving that point L lying on line LM which is a perpendicular bisector of segment JK is equidistant from poin class=

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msm555

the error in this flowchart is:second one.

Point L is equidistant from endpoints J and K, not J and N.

Answer:

Solution given:

LM which is a perpendicular bisector of segment JK,

it means JN=JK

o JL and KL are equal in length, according to the definition of a midpoint.

True

O Point L is equidistant from endpoints J and K, not J and N.False.

O The arrow between ∆JNL ∆KNL and JL≈ Kl points in the wrong direction.True

O An arrow is missing between the given statement and <LNK ≈<LNJ.True

akposevictor

The error in the flowchart given is: b. Point L is equidistant from endpoint J and endpoint K, rather than J and N.

What is the Perpendicular Bisector Theorem?

The perpendicular bisector theorem states that a point on the perpendicular bisector will be of equal distance from both endpoints of the line segment it is drawn on.

Thus, considering the image and the chart given, since JL = JK, LN is perpendicular bisector of JK, and therefore, point L must be equidistant from endpoints J and K.

  • Thus, the error in the flowchart given is: b. Point L is equidistant from endpoint J and endpoint K, rather than J and N.

Learn more about perpendicular bisector theorem on:

https://brainly.com/question/11006922

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