Solve each inequality for x. (Enter your answers using interval notation.)(a)1 < e9x − 1 < 6
Question
Solve each inequality for x. (Enter your answers using interval notation.)
(a) 1 < e<sup>9x - 1</sup> < 6
Solution
To solve the inequality 1 < e^(9x − 1) < 6, we can break it down into two separate inequalities and solve them individually:
- 1 < e^(9x − 1)
- e^(9x − 1) < 6
Let's solve each inequality:
-
For 1 < e^(9x − 1), we can start by taking the natural logarithm (ln) of both sides to get rid of the e on the right side:
ln(1) < ln(e^(9x − 1))
Since ln(1) = 0, we have:
0 < 9x - 1
Solving for x gives us:
x > 1/9
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For e^(9x − 1) < 6, we again take the natural logarithm of both sides:
ln(e^(9x − 1)) < ln(6)
This simplifies to:
9x - 1 < ln(6)
Solving for x gives us:
x < (ln(6) + 1) / 9
Therefore, the solution to the inequality 1 < e^(9x − 1) < 6 in interval notation is (1/9, (ln(6) + 1) / 9).
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