Factor this expression completely. 35x - 40
To factor the expression 35x - 40 completely, we can look for common factors in each term.
We can start by factoring out a common factor of 5 from both terms:
35x - 40 = 5(7x - 8)
Therefore, the expression 35x - 40 can be factored completely as 5(7x - 8).
To factor the expression 35x - 40 completely, we can look for common factors that can be factored out. In this case, notice that both terms have a common factor of 5. We can factor out 5 from both terms to obtain:
5(7x - 8)
So, the expression 35x - 40 can be factored completely as 5(7x - 8).
To factor the expression 35x - 40 completely, we look for the greatest common factor (GCF) of the two terms. The GCF of 35x and 40 is 5.
We can then rewrite the expression:
35x - 40 = 5(7x - 8)
So, the completely factored form of the expression is 5(7x - 8).