1995 AHSME Problems/Problem 4
Problem
If is
of
,
is
of
, and
is
of
, then
Solution
We are given: ,
,
. We want M in terms of N, so we substitute N into everything:
If is
of
,
is
of
, and
is
of
, then
We are given: ,
,
. We want M in terms of N, so we substitute N into everything:
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