How do you solve by substitution $x - 4y = -1$ and $3x + 5y = 31$ ?

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How do you solve by substitution $x - 4y = -1$ and $3x + 5y = 31$ ?

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Answer 1 · 2015-07-13T15:27:56

$x=7$
$y=2$

Explanation:

We are given:

$x-4y=-1$

and

$3x+5y=31$

We can do this a number of ways, but let's start with $x-4y=-1$

Let's multiply $x-4y=-1$ by $-3$ to get its $x$ to look like the $x$ in $3x+5y=31$ but with an opposite sign:

$x-4y=-1$

$(-3)(x-4y)=(-3)(-1)$

$-3x+12y=3$

Now, let's add $-3x+12y=3$ to $3x+5y=31$ to get rid of those $x$ 's:

$-3x+12y=3$
$3x+5y=31$

$17y=34$

Now, divide both sides by $17$ to get:

$y=2$

Now, just plug in the value for $y$ into $3x+5y=31$

$3x+5y=31$
$3x+5(2)=31$
$3x+10=31$

subtract both sides by $10$ :

$3x+10=31$
$3x=21$

divide both sides by $3$ :

$3x=21$
$x=7$

So, $x=7$ and $y=2$

To check if our answers are correct, you can take either of the two given equations and plug in the values of $x$ and $y$ .

Let's try this with $x-4y=-1$

$x-4y=-1$

$(7)-4(2)=-1$

$7-8=-1$

$-1=-1$

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How do you solve by substitution $x - 4y = -1$ and $3x + 5y = 31$ ?

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

How do you solve by substitution x - 4y = -1 x - 4y = -1 and 3x + 5y = 313x + 5y = 31?

1 Answer

Explanation:

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Impact of this question

How do you solve by substitution $x - 4y = -1$ and $3x + 5y = 31$ ?