How do you solve $2x+7y=10$ and $x-2y=15$ ?

Question

2306 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-08-05T22:49:25

${(x = 125/11), (y = -20/11) :}$

More specifically, you can multiply the second equation by $-2$ to get

$-2 * (x - 2y) = -2 * 15$

$-2x + 4y = -30$

The two equations now look like this

${(2x + 7y = 10), (-2x + 4y = -30) :}$

Next, add the left side and the right side of the equations separately to cancel out the $x$ -term

$color(red)cancelcolor(black)(2x) + 7y - color(red)cancelcolor(black)(2x) + 4y = 10 + (-30)$

$11y = -20 implies y = color(green)(-20/11)$

Now take this value of $y$ and use it in the first equation to find the value of $x$

$2x + 7 * (-20)/11 = 10$

$2x = 10 + 140/11$

$2x = 250/11 implies x = 250/11 * 1/2 = color(green)(125/11)$

How do you solve 2x+7y=102x+7y=10 and x-2y=15x-2y=15?