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Question 1207468: Suppose that f(x) and g(x) are functions such that the range of f is [-5,3], and the range of g is [-2,1]. The range of f(x) * g(x) is [a,b]. What is the largest possible value of b?
Answer by ikleyn(52794)   (Show Source):
You can put this solution on YOUR website! .
Suppose that f(x) and g(x) are functions such that the range of f is [-5,3], and the range of g is [-2,1].
The range of f(x) * g(x) is [a,b]. What is the largest possible value of b?
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From one side, we have this inequality
f(x) * g(x) <= |f(x)| * |g(x)|.
It tells us that b <= max(|f(x)| * |g(x)|) <= max|f(x)| * max|g(x)| = 5*2 = 10. (1)
From the other side,  in some point x, f(x) = -5, g(x) = -2  ,  f(x)*g(x) = (-5)*(-2) = 10.
Therefore, then b >= 10. (2)
From these two inequalities, (1) and (2), we conclude that the maximum possible value of b is (-5)*(-2) = 10.
It does not mean necessary that max (f(x)*g(x)) is always 10,
for any given functions f(x) and g(x), satisfying the condition.
What it means precisely in this problem, are two facts:
(a) b can not be greater than 10;
and
(b) for some functions f(x) and g(x) under given conditions, "b" can be 10.
Solved and explained.
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