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how do you find the zeros of polynomial r^2-28=-3x? Please show steps as I do not understand how to solve this problem. Thank you ^-^

User Cheetah
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1 Answer

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Answer:

x = -7 and x = 4

Explanation:

Note, I am taking the polynomial equation as

x^2 - 28 = -3x

Otherwise it does not become a polynomial of one variable and cannot be solved

Zeros of a polynomial are the values of x where the polynomial value itself is 0

Standard equation for a polynomial of degree 2 is ax² + bx + c = 0 where a, b and c are constants

Degree is the highest exponent. Here the highest exponent is 2 so the polynomial has degree 2. Such a polynomial is called a quadratic polynomial

So we first have to convert
x² - 28 = - 3x into this form ax² + bx + c

1. Add 3x to both sides
x² - 28 + 3x = -3x + 3x =0

==> x² + 3x - 28 = 0
With a = 1, b = 3 and c = -28

2. Factor x² + 3x - 28 = 0

Here a = 1, b = 3 and c = -28


Factoring means find two expressions x+a and x +b such that (x + a) (x + b) = x² + 3x - 28 = 0

Then we can state that
x + a = 0 ==> x = -a as one solution
x + b = 0 ==> x = -b as the other solution

To factor, find two numbers m and n(could be negative) such that mn = c and m + n = b

28 has factors 7 and 4 so that is a good start

-28 = -7 x 4 or could also be 7 x -4

How do we choose?
Add both and see what gives you +3

-7 + 4 = -3 Nope
7 + -4 = 7-4 = 3 YES

So the factors are 7 and -4

(x + m) = (x + 7)
(x + n) = (x -4)

So the original quadratic polynomial becomes

(x + 7)(x -4) =

This means

x + 7 = 0 ==> x = -7

x - 4 = 0 ==> x = 4

So the solutions(also called roots) of x² + 3x - 28 = 0 are:

x = -7 and x = 4

Both the above values satisfy the quadratic equation

User Al Sutton
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