SOLUTION: I don't understand how to get the final answer to this type of problem.
Fourth degree, zeros of -5,-2,1, and 3, and y-intercept of 15.
p(x)=a(x+5)(x+2)(x-1)(x-3)
p(0)=a(5)(2
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-> SOLUTION: I don't understand how to get the final answer to this type of problem.
Fourth degree, zeros of -5,-2,1, and 3, and y-intercept of 15.
p(x)=a(x+5)(x+2)(x-1)(x-3)
p(0)=a(5)(2
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Question 167067This question is from textbook College Algebra
: I don't understand how to get the final answer to this type of problem.
Fourth degree, zeros of -5,-2,1, and 3, and y-intercept of 15.
p(x)=a(x+5)(x+2)(x-1)(x-3)
p(0)=a(5)(2)(-1)(-3)=30a
30a=15 a=1/2
p(x)=1/2(x+5)(x+2)(x-1)(x-3) How do you mutiply out the four linear factors and the constant?
This question is from textbook College Algebra
You can put this solution on YOUR website! Distributive property
Let's look at Z(C+D)=ZC+ZD.
What if Z=A+B?
Then
Z(C+D)=(A+B)(C+D)=ZC+ZD=(A+B)C+(A+B)D=AC+BC+AD+BD
So then,
and
This is the FOIL method for expanding quadratic equations from factors.
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Now the problem becomes,
Let's look at the product of the two quadratics,
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We again have to use the distributive property and make sure we account for each term.
There are nine terms in all.
Now we'll put that back in our original function.
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Check, as an exercise, that we didn't make any mistakes and that x= -5,-2,1, and 3 are in fact zeros of this polynomial.
So that checks out.
