The pair of equation x=a y=b graphically represent lines whitch are
A parallel
B intersecting at (b,a)
C coincident
D intersecting at (a,b)
Answers
Answer:
D) The pair of equations x = a and y = b graphically represents lines that are intersecting at (a, b). Hence, the case's two lines intersect at (a, b).
Explanation:
Given: The equations are x = a and y = b.
The graph of x=a is a line parallel to y-axis
And y = b is a line parallel to x-axis.
∴ the angle between them is 90 degree. means they intersect each other.
So, the equations are consistent.
Now solving simultaneously, the solution is (a,b).
So, the point of intersection is (x, y) = (a,b).
Answer:
Lines intersecting at x = a and y = b are visually represented by the equations x = a and y = b. (a, b). As a result, the case's two lines cross at (a, b).
Explanation:
In accordance with the information provided in the question,
Given the data in question The pair of equation x=a y=b graphically represent lines
x = a and y = b are the given equations.
A line parallel to the y-axis is the graph of x=a.
A line parallel to the x-axis equals y = b.
There is a 90-degree angle between them. signifies that they cross each other.
As a result, the equations are correct.
Now, if you solve both problems at the same time, you'll get the following result: (a,b).
As a result, the intersection point is (x, y) = (a,b).