The solution to a system of two linear equations is x = 3 weeks; y = 9 feet
(3 points)
The solution to this system could possibly have this
meaning. Put one of the correct statement here:
How would you locate the solution of the two linear
graphs on the coordinate plane? Put one of the correct statment here:
How could you get exactly two or three solutions to
this linear system? Put one of the correct statment here:
::The point where the 9 foot plant stopped growing
for 3 weeks
:: No way to have 2 linear graphs with 2 or 3 intersecting points
:: The point where the lines cross the y-axis after 3 weeks
:: From the origin, find the y-intercepts and subtract them
:: Making the lines parallel to each other
:: Find the point where the two lines cross; (3,9)
:: Curving the lines around so that they cross multiple times
:: The point showing after 3 weeks, the plant was 9 feet tall
Brainly Ginny character avatar
The correct statements are:
- The point where the 9 foot plant stopped growing for 3 weeks
- Find the point where the two lines cross; (3,9)
The correct statement for the meaning of the solution to this system is: "The point where the 9 foot plant stopped growing for 3 weeks."
To locate the solution of the two linear graphs on the coordinate plane, you would use the following correct statement: "Find the point where the two lines cross; (3,9)." This means that the solution to the system is the point of intersection between the two lines represented by the equations.
To have exactly two or three solutions to this linear system, you can use the following correct statement: "No way to have 2 linear graphs with 2 or 3 intersecting points." This means that for a system of two linear equations, the number of solutions can be either one, infinite, or none. It is not possible to have exactly two or three solutions for a system of two linear equations.
Overall, the correct answers to the given questions are:
- The solution to this system could possibly have this meaning: "The point where the 9-foot plant stopped growing for 3 weeks."
- How would you locate the solution of the two linear graphs on the coordinate plane? "Find the point where the two lines cross; (3,9)."
- How could you get exactly two or three solutions to this linear system? "No way to have 2 linear graphs with 2 or 3 intersecting points."
The correct statement is:
:: The point where the lines cross; (3, 9)
To locate the solution of the two linear graphs on the coordinate plane, you would look for the point where the lines representing the equations intersect. In this case, the point of intersection is (3, 9).
To get exactly two or three solutions to this linear system, you can adjust the equations in a way that the lines representing them intersect at multiple points. However, it is not possible to have two or three solutions if the lines are parallel to each other.
Are you sure??
Apologies for the confusion. You are right, the correct statements are as follows:
- The solution to this system could possibly have this meaning: "The point where the 9-foot plant stopped growing for 3 weeks."
- To locate the solution of the two linear graphs on the coordinate plane, you would use the following correct statement: "Find the point where the two lines cross; (3,9)."
- To get exactly two or three solutions to this linear system, you can adjust the equations in a way that the lines representing them intersect at multiple points. However, it is not possible to have two or three solutions if the lines are parallel to each other.
I apologize for the incorrect information in my previous response. Thank you for pointing it out.
whats the last answer???
I apologize for the mistake. The last answer should be:
- How could you get exactly two or three solutions to this linear system? "No way to have 2 linear graphs with 2 or 3 intersecting points." This means that for a system of two linear equations, the number of solutions can be either one, infinite, or none. It is not possible to have exactly two or three solutions for a system of two linear equations.
How could you check to see if the point (5, 6) is the solution to the Linear System of equations?(1 point)
Responses
Substitute 5 in for x and 6 in for y in one of the equations to see if the equation is true.
Substitute 5 in for x and 6 in for y in one of the equations to see if the equation is true.
Substitute 6 in for x and 5 in for y in one of the equations to see if the equation is true.
Substitute 6 in for x and 5 in for y in one of the equations to see if the equation is true.
Substitute 5 in for x and 6 in for y in both of the equations to see if both equations are true.
Substitute 5 in for x and 6 in for y in both of the equations to see if both equations are true.
Substitute 6 in for x and 5 in for y in both of the equations to see if both equations are true.