How do you solve $x^{2} - 5 x = 36$ $x^2 - 5x = 36$ ?

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How do you solve $x^{2} - 5 x = 36$ $x^2 - 5x = 36$ ?

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Answer 1 · 2018-05-01T18:02:42

$x = - 4, 9$ $x=-4,9$

Explanation:

Subtract 36 from both sides

$x^{2} - 5 x - 36 = 0$ $x^2-5x-36=0$

This is the equation of a quadratic so wee need the x-intercepts.

Two numbers that multiply to 36 are 4 and -9, and they add to -5 so your equation can be

$(x + 4) (x - 9) = 0$ $(x+4)(x-9)=0$

so $x = - 4, 9$ $x=-4,9$

Answer 2 · 2018-05-01T18:04:57

$x^{2} - 5 x = 36$ $x^2 - 5x = 36$
minus 36 (both sides)
$x^{2} - 5 x - 36 = 0$ $x^2 - 5x - 36 = 0$
Now, we need to find two numbers (for exampe a and b).
$a \cdot b = - 36$ $a*b = -36$ and $a + b = - 5$ $a+b = -5$
$a = - 9$ $a = -9$
$b = + 4$ $b = +4$
So, the solution is: $(x - 9) \cdot (x + 4) = 0$ $(x-9)*(x+4)=0$
We want these brackets to be equal to zero.
$x = 9$ $x=9$
$x = - 4$ $x = -4$
Two solutions.

Answer 3 · 2018-05-01T18:21:32

Solve by either factoring or using The Quadratic Formula to find $x = {- 4, 9}$ $x={-4,9}$

Explanation:

The first step is to set the stated expression equal to zero. we will do this by subtracting 36 from both sides:

$x^2-5xcolor(red)(-36)=cancel(36color(red)(-36))$

$x^2-5x-36=0$

Now, we can either factor this equation OR use The Quadratic Formula to find the values of $x$ that satisfy the equation. Let's start with factoring.

Based on the order of the equation (second order due to the presence of $x^2$ ), we will assume this will have two factors. Additionally, since the third factor is negative, we know that one factor is positive and the other is negative:

$(x+a)(x+b)=x^2+(a+b)x+ab$

Now, we just need to figure out what two numbers satisfy the following system:

$a+b=-5$
$ab=-36$

We know that 36 is a square, so a possible combination is 6 and -6. However, that would not satisfy the first equation. Other factors of -36 include:

${+-36, +-1}$
${+-18, +-2}$
${+-12, +-3}$
${+-9, +-4}$

The only set there that would satisfy the first equation though, is ${-9,4}$ . Now that we have our factors, we can write the factored equation and evaluate:

$x^2-5x-36=(x+4)(x-9)=0$

When $x=-4$ :

$(color(purple)(-4)+4)(color(purple)(-4)-9)=0$

$(0)(-13)=0 rArr 0=0$

When $x=9$ :

$(color(purple)(9)+4)(color(purple)(9)-9)=0$

$(13)(0)=0 rArr 0=0$

We have our two solutions for $x$ :

$color(green)(x={-4,9})$

Using The Quadratic Formula:

We plug in our equations coefficients into the formula:

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

$color(red)(a=1)$
$color(blue)(b=-5)$
$color(purple)(c=-36)$

$x=(-color(blue)((-5))+-sqrt(color(blue)((-5))^2-4color(red)((1))color(purple)((-36))))/(2color(red)((1)))$

$x=(5+-sqrt(25-4(-36)))/(2)$

$x=(5+-sqrt(25+144))/(2)$

$x=(5+-sqrt(169))/(2)$

$x=(5+-13)/(2)$

$x={(5-13)/(2),(5+13)/(2)}$

$x={-8/2,18/2}$

$color(green)(x={-4,9})$

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How do you solve $x^{2} - 5 x = 36$ $x^2 - 5x = 36$ ?

3 Answers

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