So, to remove the absolute value bars all we need to do then is break the integral up at \(x = 5\).

\[\int_{3}^{6}{{\left| {2x - 10} \right|\,dx}} = \int_{3}^{5}{{\left| {2x - 10} \right|\,dx}} + \int_{5}^{6}{{\left| {2x - 10} \right|\,dx}}\]

So, in the first integral we have \(3 \le x \le 5\) and so we have \(\left| {2x - 10} \right| = - \left( {2x - 10} \right)\) in the first integral. Likewise, in the second integral we have \(5 \le x \le 6\) and so we have \(\left| {2x - 10} \right| = 2x - 10\) in the second integral. Or,

\[\int_{3}^{6}{{\left| {2x - 10} \right|\,dx}} = \int_{3}^{5}{{ - \left( {2x - 10} \right)\,dx}} + \int_{5}^{6}{{2x - 10\,dx}}\] Show Step 3

All we need to do at this point is evaluate each integral. Here is that work.

\[\begin{align*}\int_{3}^{6}{{\left| {2x - 10} \right|\,dx}} & = \int_{3}^{5}{{ - 2x + 10\,dx}} + \int_{5}^{6}{{2x - 10\,dx}} = \left. {\left( { - {x^2} + 10x} \right)} \right|_3^5 + \left. {\left( {{x^2} - 10x} \right)} \right|_5^6\\ & = \left[ {25 - 21} \right] + \left[ { - 24 - \left( { - 25} \right)} \right] = \require{bbox} \bbox[2pt,border:1px solid black]{5}\end{align*}\]