The Precalculus TI-83/TI-84 Tutorial

We now interpret the inequality LOGbase2(x+5)-3+LOGbase2(x-2) < 0

in terms of the function that is graphed. The solution set will be all values of x for which the function Y1 has negative y-values. Let's use TRACE to identify where these values of x are.

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Since the x-intercept has a y-value equal to 0, it is NOT part of the solution set. The x-values to the left of 3 produce negative y-values. The inequality LOGbase2(x+5)-3+LOGbase2(x-2) < 0 means that the graph of Y1 must lie below the x-axis. Looking at the graph, we see this is true if x is to the left of 3. We must also consider the domain of this function, which is x > 2. The inequality is not defined for values of x less than or equal to 2. So, the solution set is {x: 2 < x < 3} , or in interval notation, (2, 3).