I need to find the two roots (x-intercepts) from the equation:
$$(x + 7)(x - 3) = (x + 7)(5 - x)$$
How would I go about this? I would greatly appreciate a step-by-step explanation.
I need to find the two roots (x-intercepts) from the equation:
$$(x + 7)(x - 3) = (x + 7)(5 - x)$$
How would I go about this? I would greatly appreciate a step-by-step explanation.
So we want to solve the following equation: $(x+7)(x-3)=(x+7)(5-x)$.
$\underline{First~Step:}~~$ Distribute out terms on both sides of equal sign as follows:
$$x^{2}+4x-21=-x^{2}-2x+35$$
$\underline{Second~Step:}~~$ Subtract $(-x^{2}-2x+35)$ from both sides to give:
$$2x^{2}+6x-56=0$$
$\underline{Third~Step:}~~$ Multiply or divide entire equation by $\dfrac{1}{2}$ or $2$ respectively to give us:
$$x^{2}+3x-28=0$$
$\underline{Fourth~Step:}~~$From here we can factor this polynomial as the following factors:
$$(x-4)(x+7)=0$$ Leading us to our solution below,
$$x=4,~~x=-7$$
I hope this helps out. Let me know if there is something you need to be clarified a bit further. Thanks.
Good~Luck.
HINT $\rm\ \ A\ B\ =\ A\ C\ \iff\ A\ (B-C)\ =\ 0\ \iff\ A=0\ \ or\ \ B-C = 0 $
Generally speaking, in an equation like yours with polynomial-type expressions (even in factored form, as yours are) on both sides, you probably want to collect everything on one side of the equals sign so that you have some polynomial-type expression equal to zero. You might do this by multiplying out both sides, then collecting all the terms on one side; or you might rewrite your equation $A=B$ as $A-B=0$ and factor the $A-B$ part, since your $A$ and $B$ are already factored.
Hint: If $x+7\neq 0$, your equation is equivalent to $x-3=5-x$, because you can divide both sides by a quantity different from zero. And what does happen to your equation when $x+7=0$?