• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

Circle Geometry. (1 Viewer)

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Here's a pretty cool circle geometry problem.

From a point A, a tangent is constructed to meet a circle at B. From the point B, a horizontal chord is drawn to meet the circle again at a point G. From an arbitrary point the circle another horizontal chord FE is constructed and extends to meet AB produced at C.

From the point C, another tangent is constructed to meet the circle again at D.

Prove that the the line DG bisects the interval FE.

 

Sindivyn

Member
Joined
Mar 4, 2012
Messages
194
Gender
Male
HSC
2012
This question makes me sad, does it involve multiple congruent triangle proofs?
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Just one actually, but quite tricky.

But there are a couple of ways to do it, as with any other circle geometry problem.
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Last problem in the Fort Street Trials.

I had a simplified version (after a bit of working out you can drastically reduce the problem) but decided to post the whole thing.
 

nightweaver066

Well-Known Member
Joined
Jul 7, 2010
Messages
1,585
Gender
Male
HSC
2012
Last problem in the Fort Street Trials.

I had a simplified version (after a bit of working out you can drastically reduce the problem) but decided to post the whole thing.
funnily enough, i think this is the exact same question i did at tutor two weeks ago.
 

jeffwu95

Dumbass
Joined
Sep 2, 2011
Messages
168
Gender
Male
HSC
2012
Proved that angle GDB= angle FCB, they proved cyclic quads twice and used perpendicular bisector theorem
 
Last edited:

nightweaver066

Well-Known Member
Joined
Jul 7, 2010
Messages
1,585
Gender
Male
HSC
2012


So messy..

Basically let < G be θ

Then < DOB = 2θ

We know triangles DOC & BOC are congruent so < DOC is θ

< DFC = θ as FC || GB so corresponding angles

Since < DXC = < DOC, D, X, O and C are concylic points since angles in the same segment are equal

then < OXC = < ODC as angles in the same segment

Since the line from the centre of the circle to the chord is perpendicular, it must bisect it
 
Last edited:

math man

Member
Joined
Sep 19, 2009
Messages
503
Location
Sydney
Gender
Male
HSC
N/A
i had a similar q i gave to my kids using this diagram, where you had to prove XG= XB
 

math man

Member
Joined
Sep 19, 2009
Messages
503
Location
Sydney
Gender
Male
HSC
N/A
circle2.png

as an exercise fill in missing reasons, i numbered order i proved each angle
 

johnpap

New Member
Joined
Aug 7, 2011
Messages
16
Gender
Male
HSC
2012
This is actually a pretty neat consequence of the fact that FDEB is a harmonic quadrilateral
I.e. Since DE/DF = CE/CD = CB/CD = BE/BF, FDEB is a harmonic quadrilateral -
then consider taking a perspective from G of FDEB onto the line FE, F and E stay where they are, D goes to X and B goes to the point S at infinity on the line FE, then since the cross ratio of FDEB is preserved XF/XE = SE/SF = 1, (Because S is at infinity), so XF = XE.
 

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
This is actually a pretty neat consequence of the fact that FDEB is a harmonic quadrilateral
I.e. Since DE/DF = CE/CD = CB/CD = BE/BF, FDEB is a harmonic quadrilateral -
then consider taking a perspective from G of FDEB onto the line FE, F and E stay where they are, D goes to X and B goes to the point S at infinity on the line FE, then since the cross ratio of FDEB is preserved XF/XE = SE/SF = 1, (Because S is at infinity), so XF = XE.
Very clever.
 

math man

Member
Joined
Sep 19, 2009
Messages
503
Location
Sydney
Gender
Male
HSC
N/A
Last problem in the Fort Street Trials.

I had a simplified version (after a bit of working out you can drastically reduce the problem) but decided to post the whole thing.
i found out that no one from the fort street krew could get this question out lol, and it took du over 20 mins to solve it...i guess there cohort isnt that strong.
 

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

Top