How do you solve the following linear system: $- 9 x - 5 y = - 1, 3 x + y = 1$ $-9x - 5y = -1, 3x + y = 1$ ?

Question

How do you solve the following linear system: $- 9 x - 5 y = - 1, 3 x + y = 1$ $-9x - 5y = -1, 3x + y = 1$ ?

1 Answer

Impact of this question

2741 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-09-19T13:52:57

There are two methods: Substitution and addition, subtraction.
For this problem addition or subtraction would be the preferred method.
$x = \frac{2}{3} and y = - 1$ $x = 2/3 and y = -1$

Explanation:

Multiplying the second equation by 3 makes adding the two equations easy

$3 \times (3 x + y = + 1)$ $3 xx ( 3x + y = +1)$ gives

$9 x + 3 y = + 3$ $9x + 3y = +3$

Now add the two equations

$- 9 x - 5 y = - 1$ $-9x - 5y = - 1$
$ul(+9x +3y = +3)$
$" "0x - 2y = +2$ This is what it gives

Now solve for y by dividing both sides by $-2$

$( -2 y)/( -2) = (+2)/(-2)$

This gives $y = -1$

Put $- 1$ into either equation for $y$ and solve for $x$

$3x -1 = + 1 " "$ Add + 1 to both sides of the equation

$3x - 1 +1 = +1 + 1$

This gives

$3x = 2" "$ Divide both sides by 3

$(3x)/ 3 = (+2)/3" "$ This gives

$x = 2/3$

The point of intersection is $(2/3, -1 )$

The substitution method would also work but in this case would be more difficult. An alternative would be to graph both equations and then find the point of intersection.

Science

Math

Humanities

... and beyond

How do you solve the following linear system: $- 9 x - 5 y = - 1, 3 x + y = 1$ $-9x - 5y = -1, 3x + y = 1$ ?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you solve the following linear system: -9x - 5y = -1, 3x + y = 1 −9x−5y=−1,3x+y=1-9x - 5y = -1, 3x + y = 1 ?

1 Answer

Explanation:

Related questions

Impact of this question

How do you solve the following linear system: $- 9 x - 5 y = - 1, 3 x + y = 1$ $-9x - 5y = -1, 3x + y = 1$ ?