Log1\2(6x-x^2)>=log1\2x^2

Предыдущий
вопрос Следующий
вопрос

To solve this inequality, we need to rewrite it in exponential form.

First, we simplify the left side of the inequality:

log1/2(6x - x^2) = log1/2(6x) - log1/2(x^2
= log1/2(6) + log1/2(x) - 2log1/2(x
= log1/2(6) - log1/2(x)

Now, we rewrite the inequality in exponential form:

1/2^log1/2(6) - 1/2^log1/2(x) >= x^2

Solving this inequality will give us the solution to the original inequality.