If f(x)= x³+4x² - 15-18 and a + 1 is a factor of f(x), then find all of the zeros of f(x) algebraically?

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asked May 15, 2023 157k views

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Nicolas Delaforge · Answer 1 · 2023-05-18T03:39:20+0000

Answer: x=-1 x=-6 x=3

Explanation:

f(x)=x^3+4x^2-15x-18

Let's isolate the multiplier (x+1) from the expression x³+4x²-15x-18 :

$x^3+4x^2-15x-18=\\\\x^3+x^2+3x^2-15x-18=\\\\x^2(x+1)+3(x^2-5x-6)=\\\\x^2(x+1)+3(x^2+x-6x-6)=\\\\x^2(x+1)+3(x(x+1)-6(x+1))=\\\\x^2(x+1)+3(x+1)(x-6)=\\\\(x+1)(x^2+3(x-6))=\\\\(x+1)(x^2+3x-18)$

Decompose the polynomial х²+3х-18 into factors:

$x^2+3x-18=\\\\x^2+6x-3x-18=\\\\x(x+6)-3(x+6)=\\\\(x+6)(x-3)$

$Thus,\\\\x^3+4x^2-15x-18=(x+1)(x+6)(x-3)\\\\$

$(x+1)(x+6)(x-3)=0\\\\x+1=0\\x+1-1=0-1\\x=-1\\\\x+6=0\\x+6-6=0-6\\x=-6\\\\x-3=0\\x-3+3=0+3\\x=3$

If f(x)= x³+4x² - 15-18 and a + 1 is a factor of f(x), then find all of the zeros of f(x) algebraically?

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