0
-6x-6y+z=32
-x+4y-8z=-61
3x+6y-4z=-53
What else can I help you with?
What is the ordered pair for 3x 5y equals 21 and -9x 4y equals -6?
To find the ordered pair for the equations (3x + 5y = 21) and (-9x + 4y = -6), we can solve this system of equations. By using substitution or elimination methods, we find that (x = 3) and (y = 2). Thus, the ordered pair is ((3, 2)).
Which ordered pairs is a solution of the given system of linear equations?
That would depend on the given system of linear equations which have not been given in the question
What is a solution to a system?
an ordered pair that makes both equations true
A website for answers for algebra equations finding ordered pairs inequalities?
You can use websites like Desmos, Wolfram Alpha, or Symbolab to find answers for algebra equations, including ordered pairs and inequalities. These platforms offer step-by-step solutions, graphing capabilities, and interactive tools that help visualize the equations. Simply input your equation or inequality, and the site will generate the corresponding solutions and graphs.
Describe a consistent independent system of linear equations?
The pair of equations have one ordered pair that is a solution to both equations. If graphed the two lines will cross once.
What is th ordered triple of these equations x - 2y plus 3z equals -3 2x - 3y - z equals 7 3x plus y - 2z equals 6?
The ordered triple is (x, y, z) = (1, -1, -2)
How do you order linear equations?
Equations cannot be ordered.
How can you determine if the given ordered pair is a solution to the system of equations?
Plug your ordered pair into both of your equations to see if you get they work.
What is the ordered pair for 3x 5y equals 21 and -9x 4y equals -6?
To find the ordered pair for the equations (3x + 5y = 21) and (-9x + 4y = -6), we can solve this system of equations. By using substitution or elimination methods, we find that (x = 3) and (y = 2). Thus, the ordered pair is ((3, 2)).
What is an ordered pair that makes all equations in a system true?
That would be the "solution" to the set of equations.
What does it mean both algebraically and graphically when an ordered pair is a solution to a system of two linear equations?
If an ordered pair is a solution to a system of linear equations, then algebraically it returns the same values when substituted appropriately into the x and y variables in each equation. For a very basic example: (0,0) satisfies the linear system of equations given by y=x and y=-2x By substituting in x=0 into both equations, the following is obtained: y=(0) and y=-2(0)=0 x=0 returns y=0 for both equations, which satisfies the ordered pair (0,0). This means that if an ordered pair is a solution to a system of equations, the x of that ordered pair returns the same y for all equations in the system. Graphically, this means that all equations in the system intersect at that point. This makes sense because an x value returns the same y value at that ordered pair, meaning all equations would have the same value at the x-coordinate of the ordered pair. The ordered pair specifies an intersection point of the equations.
Which ordered pairs is a solution of the given system of linear equations?
That would depend on the given system of linear equations which have not been given in the question
How do you graph an ordered triple?
To graph an ordered triple, you need to plot points in a three-dimension coordinate system that have X,Y, and Z axises. An ordered triple like (x1, y1, z1) would be located on the different axises of a graph.
How many solutions does the system of linear equations shown have?
As there is no system of equations shown, there are zero solutions.
Use the substitution method to solve the system of equations Enter your answer as an ordered pair?
Use the substitution method to solve the system of equations. Enter your answer as an ordered pair.y = 2x + 5 x = 1
How do you put the word triple in a sentence?
She ordered triple the amount of string beans that he ordered, despite the fact that she was on a diet to eat less. (or) "I triple-dog-dare you to eat a bowl of worms!" exclaims my sister.
Solve the system of equations Enter your answer as an ordered pair?
with ur partner
