For each polynomial function, find all zeros and their multiplici...

Question

For each polynomial function, find all zeros and their multiplicities. ƒ(x)=5x^2(x^2-16)(x+5)

Accepted Answer

Hello, everyone. We've been asked to identify the zeros and their multiplicities for the following function. The function is F of X equals seven X cubed multiplied by the factor X squared minus 36 multiplied by the factor X plus four. We have four answer choices of varying zeros and multiplicities. I'm gonna start by rewriting this function. So F of X equals seven X cubed and then the parentheses X squared minus 36 and then multiplied by the parentheses X plus four. To find the zeros of this function, we are going to set each factor equal to zero and solve the first factor we're setting equal to zero will be seven X cubed equal to zero. Solving this, I get that X cubed equals zero. The cube root of zero is zero. So in this case, we know that one of our X values which is one of our zeros is zero. And this will have the multiplicity of three. The reason it has the multiplicity of three is because it's X to the third power, which means this represents three X values also known as three zeros. So this zero as our X value would appear three times. Next factor I have X squared minus 36 equals zero. I'm going to factor that. It is the difference of squares. So the square root of X squared is X, one set of parentheses has plus 6, 1 has minus six. So I have the factor X plus six multiplied by the factor X minus six equals zero. I'm gonna solve each of those factors. So I have X plus six equal zero and X minus six equals zero. So subtracting six from both sides, I get that one of the XS is negative six for X minus six equals zero, I add six to both sides. And X would be a positive six. So each of those only appear once. So they would have a multiplicity of one. I'm going to highlight the X values we've found so far. So so far we know that we have X equals zero with a multiplicity of three, X equals negative six with a multiplicity of one equals positive six with a multiplicity of one. And we have one more factor in our original function to solve. And that factor is X plus four. So we're gonna make that equal to zero. Also solving for X I subtract four from both sides and X equals negative four. This will also have a multiplicity of one because it was a single X to start with. So looking over my answers, I have zero with a multiplicity of three. So that's either answer choice. C nope, it's gotta be answer choice C that is the only one that has zero with a multiplicity of three negative six, negative four and positive six, all with a multiplicity of one. So answer choice C is our answer. Have a nice day.

For each polynomial function, find all zeros and their multiplicities. ƒ(x)=5x^2(x^2-16)(x+5)

Key Concepts

Polynomial Functions

Zeros of a Polynomial

Multiplicity of Zeros