1
Question
Question 6
Show that of all line segments drawn from a given point not on it, the perpendicular line segment is the shortest.
Question 6
Show that of all line segments drawn from a given point not on it, the perpendicular line segment is the shortest.
Open in App
Solution
Let us take a line l and from point P (i.e. not on line l) we have drawn two line segments PN and PM. Let PN be perpendicular to line l and PM is drawn at some other angle.
In ΔPNM
∴∠N=90∘
Now, ∠P+∠N+∠M=180∘ (Angle sum property of a triangle)
Then ∠P+∠M=90∘
Clearly, M is an acute angle
∴∠M<∠N
⇒ PN < PM (side opposite to smaller angle is smaller)
Similarly by drawing different line segment from P to l, we can prove that PN is smaller as comparison to them. So, we may observe that of all line segments drawn from a given point not on it, the perpendicular line segment is the shortest.
Let us take a line l and from point P (i.e. not on line l) we have drawn two line segments PN and PM. Let PN be perpendicular to line l and PM is drawn at some other angle.
In ΔPNM
∴∠N=90∘
Now, ∠P+∠N+∠M=180∘ (Angle sum property of a triangle)
Then ∠P+∠M=90∘
Clearly, M is an acute angle
∴∠M<∠N
⇒ PN < PM (side opposite to smaller angle is smaller)
Similarly by drawing different line segment from P to l, we can prove that PN is smaller as comparison to them. So, we may observe that of all line segments drawn from a given point not on it, the perpendicular line segment is the shortest.
Suggest Corrections
1
Similar questions