How do you find the zeros of the function $f(x)=(20x^2+11x-40)/(2x+5)$ ?

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How do you find the zeros of the function $f(x)=(20x^2+11x-40)/(2x+5)$ ?

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Answer 1 · 2018-01-25T11:30:28

$x~~-1.72,x~~1.17" to 2 dec. places"$

Explanation:

$"the denominator of f(x) cannot be zero as this would "$
$"make f(x) undefined"$

$"the zeros are found by equating the numerator to zero"$

$rArr"solve "20x^2+11x-40=0larrcolor(blue)"standard form"$

$"solve using the "color(blue)"quadratic formula"$

$"with "a=20,b=11" and "c=-40$

$•color(white)(x)x=(-b+-sqrt(b^2-4ac))/(2a)$

$rArrx=(-11+-sqrt(121+3200))/40$

$color(white)(rArrx)=(-11+-sqrt3321)/40=(-11+-9sqrt41)/40$

$rArrx=-11/40+-(9sqrt41)/40$

$rArrx=-11/40-(9sqrt41)/40" or "x=-11/40+(9sqrt41)/40$

$rArr"zeros are "x~~-1.72,x~~1.17" to 2 dec. places"$

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How do you find the zeros of the function $f(x)=(20x^2+11x-40)/(2x+5)$ ?

1 Answer

Explanation:

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How do you find the zeros of the function f(x)=(20x^2+11x-40)/(2x+5)f(x)=(20x^2+11x-40)/(2x+5)?

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Explanation:

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How do you find the zeros of the function $f(x)=(20x^2+11x-40)/(2x+5)$ ?