-4ab + 3ax + ba 6xa

It looks like you have a mathematical expression that may need clarification and organization. Based on what you provided, it seems like you're trying to express a polynomial. Here's a possible interpretation:

• The expression could potentially involve some missing operators or context, but let's rearrange and combine the terms as clearly as possible.

Given: \[ -4ab + 3ax + ba + 6xa \]

This can be rewritten by rearranging the terms: \[ -4ab + ba + 3ax + 6xa \]

Now, combine like terms:

• For \(ba\) and \(-4ab\), note that \(ba = ab\) (since multiplication is commutative): \[ -4ab + ab = -3ab \]

• For the terms involving \(ax\): \[ 3ax + 6xa = 3ax + 6ax = 9ax \]

Putting it all together, the simplified expression is: \[ -3ab + 9ax \]

If this is what you intended, then the final expression is \( -3ab + 9ax \). If there was more context or if you meant to provide something different, please clarify!

It looks like you have an expression involving a variable \(c\) multiplied by a binomial \((3b - 7a)\). To simplify or distribute this expression, you can apply the distributive property.

The expression is: \[ -c(3b - 7a) \]

Distributing \(-c\) across the terms in the parentheses gives: \[ -c \cdot 3b + c \cdot 7a \] or \[ -3bc + 7ac \]

So, the expression simplified is: \[ -3bc + 7ac \]

If you need further operations or a specific context for this expression, let me know!