Rewriite problem by either distributings or factoring and then solve. Question 3, 4, and 5 have no numbers in them, therefore, they can't be solved with a calculator.
Q. `abc-xyz`=____.

To solve the problem \( abc - xyz \), we will follow these steps: ### Step 1: Identify Common Factors We need to look for common factors in the expression \( abc - xyz \). Here, we notice that there are no common factors between \( abc \) and \( xyz \) directly. However, we can rewrite the expression in a different form. ### Step 2: Rewrite the Expression We can rewrite the expression as: \[ abc - xyz = c(ab - \frac{xyz}{c}) \] This shows that \( c \) is a common factor in the first term, but we need to express \( xyz \) in terms of \( c \) to factor it out properly. ### Step 3: Factor the Expression Since we cannot factor out a common term directly, we can express the equation in a factored form: \[ abc - xyz = c(ab - \frac{xyz}{c}) \] However, since \( xyz \) does not have a common factor with \( abc \), we can leave it as is. ### Final Expression Thus, the expression can be rewritten as: \[ abc - xyz = c(ab - \frac{xyz}{c}) \] But since there are no numbers, we cannot simplify it further to a numerical solution. ### Conclusion The final rewritten form of the expression is: \[ abc - xyz = c(ab - \frac{xyz}{c}) \] ---