Question

The expression you provided seems to be a bit jumbled, but it looks like you want to identify the dividend in a division expression.

If we were to interpret the expression, it could be viewed as:

\[
\frac{6x^4 - 10y}{6}
\]

In this case, the dividend is the expression that is being divided, which would be:

\[
6x^4 - 10y
\]

So, the dividend in your expression is \( 6x^4 - 10y \).

To express the division of the polynomial \( 6x^4 - 10y \) by \( 6 \) in fraction form, we can write:

\[
\frac{6x^4 - 10y}{6}
\]

Now, we can simplify the fraction by dividing each term in the numerator by \( 6 \):

\[
\frac{6x^4}{6} - \frac{10y}{6}
\]

This simplifies to:

\[
x^4 - \frac{10}{6}y
\]

Now, we can further simplify \(\frac{10}{6}\) to \(\frac{5}{3}\):

\[
x^4 - \frac{5}{3}y
\]

Thus, the final result in fraction form is:

\[
x^4 - \frac{5}{3}y
\]

If you prefer to keep the answer in fractional form, you can also express it as:

\[
\frac{6x^4 - 10y}{6} = \frac{6x^4}{6} - \frac{10y}{6} = x^4 - \frac{5}{3}y
\]

So, the simplified output is:

\[
x^4 - \frac{5}{3}y
\]