Question

6b < 24 or 4b + 12 > 4.

Answer 1

For \(6b < 24\)
All you have to do is divide both sides of the equation by \(6\) (because `6b`)
That would look like this -> \(\frac{6b}{6}<\frac{24}{6}\)
So then \(\frac{6b}{6}\) Cancels, it is no longer there, so all we have left is \(\frac{24}{6}\)
That's not the answer though, you have to simplify it
So \(\frac{24}{6}=\frac{?}{?}=?\)

Answer 2

The second one is a little like the first one, just with an extra step which is to \(-12\) to both sides of the equation
\(4b + 12 > 4 \)
\(4b+12−12>4−12\) \(\bf -12,\ both\ sides\)
\(4b>−8\)

Then we repeat the step from the last one
which is to divide both sides
but this time we do it by 4
because it says 4b

\(\frac{4b}{4}>\frac{-8}{4}\)
So then \(\frac{4b}{4}\) which cancels
so all that is left is \(\frac{-8}{4}\)
So \(b>\frac{-8}{4}=?\)
Simplify \(\frac{-8}{4}\)

Answer 3

\(\color{#0cbb34}{\text{Originally Posted by}}\) @supie
For \(6b < 24\)
All you have to do is divide both sides of the equation by \(6\) (because `6b`)
That would look like this -> \(\frac{6b}{6}<\frac{24}{6}\)
So then \(\frac{6b}{6}\) Cancels, it is no longer there, so all we have left is \(\frac{24}{6}\)
That's not the answer though, you have to simplify it
So \(\frac{24}{6}=\frac{?}{?}=?\)
\(\color{#0cbb34}{\text{End of Quote}}\)
(I forgot to include that you have to do `b<`
Then add the simplified version \(\frac{24}{6}\)
So basically, right now it's \(b<\frac{24}{6}\)
So all you do, is simplify \(\frac{24}{6}\)