prove that more than see circle can have the same radical point (not axis) iff their centers are on one circle,also prove that the radical point is on the center of the mentioned circle.
P.S.this assumption may be wrong,if it is,then disprove it.
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- Mon Dec 20, 2010 3:33 pm
- Forum: Geometry
- Topic: a strange assumption (i'm not so sure about it)
- Replies: 2
- Views: 3423
geometry
three circles which do not overlap each other,how many possible points or radical axis are there where the power of points are same?(my grammar may be wrong )
Re: algebra
sorry,the function says f:r-r(meaning r to r)
for the first prob i just wanted to know the value of x
soory for my incompetence, i'm new at latex using
for the first prob i just wanted to know the value of x
soory for my incompetence, i'm new at latex using
Re: algebra
for which function f(x),if f(x) is divisible by (x-r),then it is divisible by (rx-1) where x and r are real numbers.
btw thanx for the reply
btw thanx for the reply
algebra
can anyone give me the soln to this prob
a_1x$$n+a_2X$$(n-1)+a_3x$$(n-2)+...........+a_(n-1)X=0
a_1x$$n+a_2X$$(n-1)+a_3x$$(n-2)+...........+a_(n-1)X=0