How do you solve the system $0.4x-0.1y=2, 0.2x+0.5y=1$ ?

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How do you solve the system $0.4x-0.1y=2, 0.2x+0.5y=1$ ?

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Answer 1 · 2017-01-14T08:51:53

See explanation.

Explanation:

The starting system is:

${ (0.4x-0.1y=2),(0.2x+0.5y=1):}$

If we multiply the second equation by $-2$ the coefficients of $x$ will be opposite numbers:

${ (0.4x-0.1y=2),(-0.4x-y=-2):}$

Now we can add both sides of the equations to get an euation of 1 variable:

$-1.1y=0$

$y=0$

Now we have to substitute the calculated value of $y$ to calculate $x$ :

$0.4x=2$

$x=2/0.4=20/4=5$

Answer:

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How do you solve the system $0.4x-0.1y=2, 0.2x+0.5y=1$ ?

1 Answer

Explanation:

${ (0.4x-0.1y=2),(0.2x+0.5y=1):}$

${ (0.4x-0.1y=2),(-0.4x-y=-2):}$

$-1.1y=0$

$y=0$

$0.4x=2$

$x=2/0.4=20/4=5$

${(x=5),(y=0):}$

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How do you solve the system 0.4x-0.1y=2, 0.2x+0.5y=10.4x-0.1y=2, 0.2x+0.5y=1?

1 Answer

Explanation:

{ (0.4x-0.1y=2),(0.2x+0.5y=1):}{ (0.4x-0.1y=2),(0.2x+0.5y=1):}

{ (0.4x-0.1y=2),(-0.4x-y=-2):}{ (0.4x-0.1y=2),(-0.4x-y=-2):}

-1.1y=0-1.1y=0

y=0y=0

0.4x=20.4x=2

x=2/0.4=20/4=5x=2/0.4=20/4=5

{(x=5),(y=0):}{(x=5),(y=0):}

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Impact of this question

How do you solve the system $0.4x-0.1y=2, 0.2x+0.5y=1$ ?

${ (0.4x-0.1y=2),(0.2x+0.5y=1):}$

${ (0.4x-0.1y=2),(-0.4x-y=-2):}$

$-1.1y=0$

$y=0$

$0.4x=2$

$x=2/0.4=20/4=5$

${(x=5),(y=0):}$