Let's take origin B,x-axis: BC the coordinates of O and I are: O(a/2;RcosA),I((p-b);r) d²=(a/2-(p-b))²+(RcosA-r)² =R²sin²A-a(p-b)+(p-b)²+R²cos²A-2rRcosA+r² we know: cos²A+sin²A=1;cosA=1-2sin²(A/2) d²=R²-2rR+4rRsin²(A/2)+r²-a(p-b)+(p-b)² but abc=4RS;S=pr;sin²(A/2)=(p-b)(p-c)/(bc) then 4rRsin²(A/2)=a(p-b)(p-c)/p because r²=(p-a)(p-b)(p-c)/p r²-a(p-b)+(p-b)²=-a(p-b)(p-c)/p then d²=R²-2Rr .-.
a more geometric proof E touching point on AC in right triangle AEI , AI=r/sin(A/2) bisector AI meets the circumcircle at D, draw diameter BF ang(BFD)=ang(BAD)=A/2(inscribed angles) in right triangle BFD ,BD=2Rsin(A/2) in triangle IBD ang(ACB)=ang(ADB)=C;(inscribed angles) hence ang(BID)=ang(IBD)=(A+B)/2 IBD is isoscele,BD=ID the circle power of point I with respect to the circumcercle is: P(I)=-IA.ID= -IA.BD= -2Rr P(I)= d²-R²=-2Rr d²=R²-2Rr .-.
Solution to Problem 155. The extension of OI meets the circumcircle at P (from I to O) and Q (from O to I). Taking the circle power of point I with respect to the circumcircle we have BI.ID = PI.IQ. But BI.ID = 2Rr (as proved in problem 154), and PI = R+d and IQ = R-d. So 2Rr = (R+d)(R-d) then d2 = R2 – 2Rr.
Let's take origin B,x-axis: BC
ReplyDeletethe coordinates of O and I are:
O(a/2;RcosA),I((p-b);r)
d²=(a/2-(p-b))²+(RcosA-r)²
=R²sin²A-a(p-b)+(p-b)²+R²cos²A-2rRcosA+r²
we know:
cos²A+sin²A=1;cosA=1-2sin²(A/2)
d²=R²-2rR+4rRsin²(A/2)+r²-a(p-b)+(p-b)²
but abc=4RS;S=pr;sin²(A/2)=(p-b)(p-c)/(bc)
then 4rRsin²(A/2)=a(p-b)(p-c)/p
because r²=(p-a)(p-b)(p-c)/p
r²-a(p-b)+(p-b)²=-a(p-b)(p-c)/p
then
d²=R²-2Rr
.-.
a more geometric proof
ReplyDeleteE touching point on AC
in right triangle AEI , AI=r/sin(A/2)
bisector AI meets the circumcircle at D,
draw diameter BF
ang(BFD)=ang(BAD)=A/2(inscribed angles)
in right triangle BFD ,BD=2Rsin(A/2)
in triangle IBD
ang(ACB)=ang(ADB)=C;(inscribed angles)
hence ang(BID)=ang(IBD)=(A+B)/2
IBD is isoscele,BD=ID
the circle power of point I with respect to the circumcercle is:
P(I)=-IA.ID= -IA.BD= -2Rr
P(I)= d²-R²=-2Rr
d²=R²-2Rr
.-.
http://ahmetelmas.wordpress.com/2010/05/15/geo-geo/
ReplyDeleteSolution to Problem 155.
ReplyDeleteThe extension of OI meets the circumcircle at P (from I to O) and Q (from O to I).
Taking the circle power of point I with respect to the circumcircle we have BI.ID = PI.IQ. But BI.ID = 2Rr (as proved in problem 154), and PI = R+d and IQ = R-d. So 2Rr = (R+d)(R-d) then d2 = R2 – 2Rr.
Extend the the line OI to intersect the circle of I in points P and Q ,and the circle of O in the points X and Y.
ReplyDeleteWe can use problem 160 which says:
r^2 =(PX)(QY)......(1.)
with
PX=R-(r-d)=R-r+d
QY=R-(r+d)=R-r-d
Substituting in equation 1 gives:
r^2=(R-r+d)(R-r-d)
r^2=(R-r)^2-d^2
r^2=R^2-2rR+r^2-d^2
From this the result follows :
d^2=R^2-2rR