The minimum value of x satisfying the inequality $4^{- x + 0.5} - 7 \cdot 2^{- x} \leq 4$ is

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Solution

$Given that 4^{- x + 0.5} - 7 \cdot 2^{- x} \leq 4 . . . . [1] Let 2^{- x} = t Now [1] can be written as 2 t^{2} - 7 t \leq 4 \Rightarrow 2 t^{2} - 7 t - 4 \leq 0 \Rightarrow 2 t^{2} - 8 t + t - 4 \leq 0 \Rightarrow 2 t (t - 4) + 1 (t - 4) \leq 0 \Rightarrow (t - 4) (2 t + 1) \leq 0$

$\Rightarrow - \frac{1}{2} \leq t \leq 4 \Rightarrow 0 < t \leq 4 (A s t = 2^{- x} a n d 2^{- x} > 0) \Rightarrow 0 < 2^{- x} \leq 4 \Rightarrow - 2 \leq x < \infty \Rightarrow x \in [- 2, \infty)$
The minimum value of the given expression is -2.

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