A point X moves on the line segment PQ of length 2a where XP=a+x,
XQ=a-x and -a £ x £ a, as in the following diagram:
This text is usually replaced by the Flash movie.
You are interested in finding the minimum value of the function
f(x)=(1 + XP2)(1 + XQ2).
Without writing anything down can you suggest where the location of X that
gives the minimum value(s) of f(x) will be? Do you think that this will
depend on the value of a? Once you have considered the matter, write your
thoughts down as a clear, precise conjecture.
Check your conjecture using calculus to find the minimum
values. Was this as expected?
Given your insights, can you suggest possible locations for the
minimum values of g(x) = (1+ XP4)(1+XQ4)?
NOTES AND BACKGROUND
Conjectures are
speculations which people try to prove or disprove. Some
mathematical conjectures are so difficult to prove that many
mathematicians, over a hundred years or more, have tried and
failed to prove them. There is prize money and worldwide fame
for anyone who can prove one of these famous conjectures such
as The Reimann Conjecture. This is also called the Reimann
Hypothesis which leads to the question "Is a conjecture the
same as a hypothesis?"
The answer is, strictly speaking, no. The word hypothesis is used in pure
mathematics to mean one of the conditions in a theorem, for
example 'If a triangle is right-angled" is ahypothesis in
Pythagoras' Theorem. A very different meaning for the word
hypothesis , which is
used in statistics, is a speculation which is reinforced or
refuted by the acquisition of new information. Such hypotheses
are not proved logically true or false but merely considered,
in the light of evidence, to be more likely or unlikely to be
true.