Prove that the angle inscribed in a semi-circle is a right angle using Vector Methods. (1 Viewer)

A1La5

Active Member
Joined
Jan 11, 2021
Messages
94
Gender
Male
HSC
2021
Thats the other way I thought of. I prefer the conventional way though but this is neat anyways. Not sure if there's any other way other than those 2 really. I assume the first method that tickboom showed was the "vector" approach OP was looking for but its well known so maybe this is.
The derivation shown in the video uses Euclidean geometry instead of vectors. I also prefer his approach, but given how OP wanted a vector based approach the question I posted should be content.
 

RohitShubesh21

New Member
Joined
Oct 21, 2021
Messages
18
Gender
Male
HSC
2024

Drongoski

Well-Known Member
Joined
Feb 22, 2009
Messages
4,255
Gender
Male
HSC
N/A
Just consider that the point D would be cos(theta), sin(theta) since its on the circle then just use the gradient formula for each lines and then multiply both gradients... the rest is self-explanatory.

View attachment 33592
Using ExtremeBoredUser's diagram above, this is a vector method:

CD = AD - AC

BD
= AD - AB

AB
= -AC

.: CD.BD = (AD - AC).(AD - AB) = (AD - AC).(AD + AC) = AD.AD + AD.AC - AC.AD - AC.AC = AD.AD - AC.AC

= r^2 - r^2 = 0 (r being the radius)


.:, since the dot product CD.BD = 0, CD and BD are perpendicular to each other.


Sorry for not using proper vector notation.
 
Last edited:

CM_Tutor

Moderator
Moderator
Joined
Mar 11, 2004
Messages
2,642
Gender
Male
HSC
N/A
The converse of this theorem, that if is a right angle then is the diameter of the circle on which also lies can also be done by vector methods. The question has often been put as:

Let be right-angled at . Use vectors to show that the midpoint of is equidistant from all three vertices of the triangle.
 

RohitShubesh21

New Member
Joined
Oct 21, 2021
Messages
18
Gender
Male
HSC
2024
Using ExtremeBoredUser's diagram above, this is a vector method:

CD = AD - AC

BD
= AD - AB

AB
= -AC

.: CD.BD = (AD - AC).(AD - AB) = (AD - AC).(AD + AC) = AD.AD + AD.AC - AC.AD - AC.AC = AD.AD - AC.AC

= r^2 - r^2 = 0 (r being the radius)


.:, since the dot product CD.BD = 0, CD and BD are perpendicular to each other.


Sorry for not using proper vector notation.
yes this one sir thank you
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top