The solution to a system of two linear equations is x = 3 weeks; y = 9 feet
Match the description with the correct statement.
points)
1. How would you locate the solution of the bro linear graphs on the coordinate plane?
2. The solution to this system could possibly have this meaning
3. How could you get exactly two or three solutions to this linear system?
a. The point where the foot plant stopped growing for 3 weeks
b. From the origin, find the y-intercepts and subtract them
c. Curving the lines around so that they cross multiple times
d. Find the point where the two lines cross; (3, 9)
e. The point where the lines cross the y-axis after 3 weeks
f. The point showing after 3 weeks, the plant was 3 feet tall
g. No way to have 2 linear graphs with 2 or 3 intersecting points
h. Making the lines parallel to each other
1. d. Find the point where the two lines cross; (3, 9)
2. e. The point where the lines cross the y-axis after 3 weeks
3. g. No way to have 2 linear graphs with 2 or 3 intersecting points
1. How would you locate the solution of the bro linear graphs on the coordinate plane? - d. Find the point where the two lines cross; (3, 9)
2. The solution to this system could possibly have this meaning - e. The point where the lines cross the y-axis after 3 weeks
3. How could you get exactly two or three solutions to this linear system? - g. No way to have 2 linear graphs with 2 or 3 intersecting points
1. How would you locate the solution of the two linear graphs on the coordinate plane? - d. Find the point where the two lines cross; (3, 9)
To locate the solution of the two linear graphs on the coordinate plane, you need to find the point where the two lines representing the equations intersect. This point is the solution to the system of equations and can be represented as an ordered pair (x, y). In this case, the solution is x = 3 weeks and y = 9 feet, which means the two lines intersect at the point (3, 9).
2. The solution to this system could possibly have this meaning - f. The point showing after 3 weeks, the plant was 3 feet tall
The solution to the system of linear equations represents the values of x and y that satisfy both equations simultaneously. In this case, the solution x = 3 weeks and y = 9 feet means that after 3 weeks, the plant was 9 feet tall.
3. How could you get exactly two or three solutions to this linear system? - g. No way to have 2 linear graphs with 2 or 3 intersecting points
The given information states that the solution to the system of equations is x = 3 weeks and y = 9 feet. This implies that there is only one solution to the system, represented by the point (3, 9). It is not possible to have exactly two or three solutions to a system of linear equations, as the lines represented by linear equations can either have no intersection (parallel lines) or a single point of intersection (intersecting lines).