Given g, of, x, equals, 5, x, plus, 2g(x)=5x+2, find g, of, minus, 4g(−4).

To solve for \( g(-4) \) using the function \( g(x) = 5x + 2 \), we will first substitute \(-4\) into the function.

\[ g(-4) = 5(-4) + 2 \] \[ = -20 + 2 \] \[ = -18 \]

Now, we have found that \( g(-4) = -18 \).

Next, we need to calculate \( g(-4) \) again. Since we already calculated \( g(-4) \) and found it to be \(-18\), we can now check that value.

Thus, \( g(-4) = -18 \).

Finally, to find \( g(-4) \), we note: \[ g(-4) = -18 \]

So \( g(-4) = -18 \). If you meant to add more terms or had an additional inquiry regarding a combination involving \( g(-4) \), please clarify!