How do you find the value of X and Y in two equations?
What are the values of x and y?
- Step One: We need to find a way to equate either the x terms of the y terms in each equation.
- Step Two: Take equation b) from equation a) to eliminate the x component.
- Step Three: substitute the value of y into either equation to find the value of x.
How do you find a point that satisfies both equations?
Starts here4:00How to find the intersection point of two linear equations – YouTubeYouTubeStart of suggested clipEnd of suggested clip58 second suggested clipSo if I subtract the X on both sides. I get y equals a negative x plus three. Okay.MoreSo if I subtract the X on both sides. I get y equals a negative x plus three. Okay.
How many solution these pair of equations x 4y 6 0 and 3x 12y 18 0 will have?
Given :- How many solution these pair of equations x-4y-6=0 and 3x-12y-18=0 will have? A linear equation in two variables represents a straight line in 2D Cartesian plane . ➻ In this case , the system will have infinitely many solutions.
How many pairs x/y satisfy the equation 3x 9y 21 and 6x 18y 45?
So, no pair of (x,y) satisfies the two eqns.
What does it mean to satisfy a function?
To show that substituting one or more variables into an equation or inequality “works out”. That is, the equation or inequality simplifies to a true statement. See also. Verify a solution.
For what condition does the pair of equations 3x PY 10 0 and 4x 4y 17 0 represents a pair of intersecting lines?
For what condition does the pair of equations -3x + py + 10 = 0and 4x + 4y +17 = 0 represents a pair of intersecting lines. as per my understanding, a1/a2 <> b1/b2. so, -3/4 <> 3/4. I think my answer p <> 3 is correct.
What is the value of k for which the system of equations KX Y 2 6x 2y 3 has infinitely many solutions?
Therefore, the value of k for which the pair of equations kx-y-2=0 and 6x-2y-3=0 will have infinitely many solution is 3.