The point (-4, 6) is a solution to which system?
{−5x + y = −2
− 3x + 6y = −12
{−5x+y=−3
3x − 8y = 24
{−4x+y=6
−5x−y=21
{x + y = 2
-x + 2y = 16
7 answers
The point (-4, 6) is a solution to the system {−4x+y=6 and −5x−y=21.
{y=5x+7
3y−15x=18
{x−2y=6
3x−6y=18
{y = 3x + 6
y=−13x−4
{y=23x−1
y=23x−2
Match the system of equations to the number of solutions it has.
Infinite Solutions
No Solutions
One Solution
3y−15x=18
{x−2y=6
3x−6y=18
{y = 3x + 6
y=−13x−4
{y=23x−1
y=23x−2
Match the system of equations to the number of solutions it has.
Infinite Solutions
No Solutions
One Solution
{y=5x+7 -> One Solution
3y−15x=18 -> One Solution
{x−2y=6 -> One Solution
3x−6y=18 -> One Solution
{y = 3x + 6 -> One Solution
y=−13x−4 -> One Solution
{y=23x−1 -> One Solution
y=23x−2 -> No Solutions
3y−15x=18 -> One Solution
{x−2y=6 -> One Solution
3x−6y=18 -> One Solution
{y = 3x + 6 -> One Solution
y=−13x−4 -> One Solution
{y=23x−1 -> One Solution
y=23x−2 -> No Solutions
{y=5x+7 3y−15x=18
{x−2y=6 3x−6y=18
{y = 3x + 6 y=−13x−4
{y=23x−1 y=23x−2
Match the system of equations to the number of solutions it has.
Infinite Solutions
No Solutions
One Solution
{x−2y=6 3x−6y=18
{y = 3x + 6 y=−13x−4
{y=23x−1 y=23x−2
Match the system of equations to the number of solutions it has.
Infinite Solutions
No Solutions
One Solution
{y=5x+7 3y−15x=18 -> One Solution
{x−2y=6 3x−6y=18 -> One Solution
{y = 3x + 6 y=−13x−4 -> One Solution
{y=23x−1 y=23x−2 -> No Solutions
{x−2y=6 3x−6y=18 -> One Solution
{y = 3x + 6 y=−13x−4 -> One Solution
{y=23x−1 y=23x−2 -> No Solutions
bot are you sure
I apologize for the mistake in my previous response. Let's correct that:
{y=5x+7 3y−15x=18 -> One Solution
{x−2y=6 3x−6y=18 -> Infinite Solutions
{y = 3x + 6 y=−13x−4 -> One Solution
{y=23x−1 y=23x−2 -> No Solutions
Thank you for pointing out the error!
{y=5x+7 3y−15x=18 -> One Solution
{x−2y=6 3x−6y=18 -> Infinite Solutions
{y = 3x + 6 y=−13x−4 -> One Solution
{y=23x−1 y=23x−2 -> No Solutions
Thank you for pointing out the error!
1 answer