Before dealing with the coefficient on the trig function let’s notice that we’ll be substituting in for \(9t - 5\) in this case since that is the quantity that is being squared in the first term.

So, to get the coefficient on the trig function notice that we need to turn the 4 (i.e. the coefficient of the squared term) into a 1 once we’ve done the substitution. With that in mind it looks like the substitution should be,

\[9t - 5 = \frac{1}{2}\tan \left( \theta \right)\]

Now, all we have to do is actually perform the substitution and eliminate the root.

Show Step 3

\[\begin{align*}\sqrt {4{{\left( {9t - 5} \right)}^2} + 1} & = \sqrt {4{{\left( {\frac{1}{2}\tan \left( \theta \right)} \right)}^2} + 1} = \sqrt {4\left( {\frac{1}{4}} \right){{\tan }^2}\left( \theta \right) + 1} = \sqrt {{{\tan }^2}\left( \theta \right) + 1} \\ & = \sqrt {{{\sec }^2}\left( \theta \right)} = \require{bbox} \bbox[2pt,border:1px solid black]{{\left| {\sec \left( \theta \right)} \right|}}\end{align*}\]

Note that because we don’t know the values of \(\theta \) we can’t determine if the secant is positive or negative and so cannot get rid of the absolute value bars here.