4 years ago

Solve for x: 3 − (2x − 5) < −4(x + 2)

Mathematics

1 answer:

antiseptic1488 [7]4 years ago

8 0

Answer:

a is the answer

all work is pictured and shown

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Kurt is taking a roadtrip and has of his total distance left to travel. He plans to travel the remaining distance in 5 hours. Wh

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a graduated cylinder is filled to 41.5 ml with water and a piece of granite is placed in the cylinder displacing the level to 47

mixas84 [53]

Because you went from 41.5 to 47.6 when the granite was placed in the graduated cylinder, using displacement:

47.6 - 41.5 = 6.1

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3 years ago

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2 years ago

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3 years ago

What multiplies to 24 and adds to -9

d1i1m1o1n [39]

Unfortunately, there are no two such numbers.

If your original question was: $\sf{x^{2} -9x+24=0}$ and you were trying to factor it, I would suggest the quadratic formula.

There are two solutions to $\sf{ax^2+bx+c=0$ , where $\sf{a\neq 0}$ <span>, and we can find them by using the quadratic formula:
</span>
$\huge{\sf{x = \frac{-b \pm \sqrt{b^2-4ac}}{2a}}}$

So using that, here is how it would get factored:

For your equation, $\sf{a = 1, b = -9, c = 24}$

Plug in those values into the formula:

$\sf{\frac{ -(-9) \pm \sqrt{ (-9)^2 - 4 \cdot 1 \cdot 24} }{ 2 \cdot 1 }}$

Simplifying it:

$\sf{\frac{ 9 \pm \sqrt{ -15 } }{ 2 }}$

And so the solutions are:

$\sf{x_1 = \frac{ 9~+~\sqrt{ -15 } }{ 2 } = \frac{9}{2}+\frac{1}{2}\sqrt{15}i}$
and
$\sf{x_2 = \frac{ 9~-~\sqrt{ -15 } }{ 2 } = \frac{9}{2}-\frac{1}{2}\sqrt{15}i}$

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3 years ago

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