How do you solve the simultaneous equations $4 x + 5 y = 0$ $4x+5y=0$ and $8 x - 15 y = 5$ $8x-15y=5$ ?

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How do you solve the simultaneous equations $4 x + 5 y = 0$ $4x+5y=0$ and $8 x - 15 y = 5$ $8x-15y=5$ ?

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Answer 1 · 2018-04-11T11:16:44

$x = 0.25$ $x=0.25$ and $y = - 0.2$ $y=-0.2$

Explanation:

For simultaneous equations you have to know 2 rules:
• Same signs subtract
meaning if both equations have the same sign you subtract to cancel out $x or y$ $x or y$

•Different signs add
meaning if both equations have different signs you add to also cancel out $x or y$ $x or y$

In this case, you will add both equations because they are of different signs

$4 x + 5 y = 0$ $4x + 5y = 0$
$8 x - 15 y = 5$ $8x-15y=5$

multiply the first equation by $3$ $3$ to cancel out $y$ $y$ values by adding

after multiplying you'll have
$12 x + 15 y = 0$ $12x+15y=0$
$+$ $+$
$8 x - 15 y = 5$ $8x-15y=5$
now add both equations
$20 x = 5$ $20x=5$
$x = \frac{5}{20}$ $x=5/20$
$x = 0.25$ $x=0.25$

Substitute the value of $x$ $x$ in either of the equations

$4 x + 5 y = 0$ $4x+5y=0$
$4 (0.25) + 5 y = 0$ $4(0.25)+5y=0$
$1 + 5 y = 0$ $1+5y=0$
$5 y = - 1$ $5y=-1$
$y = - \frac{1}{5}$ $y=-1/5$ or $- 0.2$ $-0.2$

so $x = 0.25$ $x=0.25$ and $y = - 0.2$ $y=-0.2$

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How do you solve the simultaneous equations $4 x + 5 y = 0$ $4x+5y=0$ and $8 x - 15 y = 5$ $8x-15y=5$ ?

1 Answer

Explanation:

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How do you solve the simultaneous equations $4 x + 5 y = 0$ $4x+5y=0$ and $8 x - 15 y = 5$ $8x-15y=5$ ?