1 Answer

Hudson Pereira · Answer 1 · 2023-01-12T10:26:04+0000

We are given the following two equations

$\begin{gathered} y=(x+4)^2-1\qquad eq.1_{} \\ y=-3x-13\qquad eq.2 \end{gathered}$

Since both equations are equal to y then we can equate them as

Now let us simplify the equation

$\begin{gathered} (x+4)^2-1=-3x-13 \\ x^2+2(x)(4)+4^2-1=-3x-13 \\ x^2+8x+16-1=-3x-13 \\ x^2+8x+3x+16-1+13=0 \\ x^2+11x+28=0 \end{gathered}$

As you can see, we are left with a quadratic equation.

The standard form of a quadratic equation is given by

Comparing the equation with the standard form, the coefficients are

a = 1

b = 11

c = 28

Now recall that the quadratic formula is given by

$x=(-b\pm√(b^2-4ac))/(2a)$

Substitute the values into the above quadratic formula

$x=\frac{-11\pm\sqrt[]{(11)^2-4(1)(28)}}{2(1)}=\frac{-11\pm\sqrt[]{121^{}-112}}{2}=\frac{-11\pm\sqrt[]{9}}{2}=(-11\pm3)/(2)$

So the two possible solutions are

$\begin{gathered} x_1=(-11+3)/(2),\: x_2=(-11-3)/(2) \\ x_1=(-8)/(2),\: x_2=(-14)/(2) \\ x_1=-4,\: x_2=-7 \end{gathered}$

Therefore, the solutions of the equations are

x = -4 and x = -7

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