What is the GCF of -26x5 + 4x3 + 2x2?
how do i figure this out step by step please:)
You just found out what they have in common. All of the terms have at least an x^2, so you can take that out. All of the numbers can be divided by 2, as well, so your GCF is 2x^2.
Find gcf of 8x^2 -4x and -20
To find the greatest common factor (GCF) of -26x^5 + 4x^3 + 2x^2, we need to identify the highest power of x that is common to all the terms.
Step 1: Identify the common factors
First, we need to look for factors that are common to all the terms. In this case, the constants (-26, 4, and 2) do not have any common factors, so we only need to consider the x-term coefficients.
Step 2: Identify the lowest power of x
Next, we look at the powers of x in each term and identify the lowest power. In this case, the lowest power of x is 2.
Step 3: Build the GCF
Now we can build the GCF by multiplying x raised to the lowest power by the common factor of the x-terms. In this case, it is 2.
GCF = 2x^2
Therefore, the GCF of -26x^5 + 4x^3 + 2x^2 is 2x^2.