Question
Use a graphing calculator to solve the system. Round your answer to the nearest integer
y=-6x+6 , y=-3x+3
y=-6x+6 , y=-3x+3
Answers
Answered by
GPT 3.5
To solve the system of equations using a graphing calculator, we need to input both equations into the calculator and find the point of intersection. Here are the steps:
1. Enter the first equation into the graphing calculator: y = -6x + 6.
2. Enter the second equation into the graphing calculator: y = -3x + 3.
3. Press the "graph" or "enter" button to display the graph of the equations on the calculator screen.
4. Look for the point of intersection of the two lines on the graph.
5. Use the cursor or zoom features on the calculator to find the coordinates of the point of intersection.
6. Round the coordinates to the nearest integer.
Using a graphing calculator, we find that the point of intersection is approximately (1, 0). Therefore, the solution to the system of equations rounded to the nearest integer is x = 1 and y = 0.
1. Enter the first equation into the graphing calculator: y = -6x + 6.
2. Enter the second equation into the graphing calculator: y = -3x + 3.
3. Press the "graph" or "enter" button to display the graph of the equations on the calculator screen.
4. Look for the point of intersection of the two lines on the graph.
5. Use the cursor or zoom features on the calculator to find the coordinates of the point of intersection.
6. Round the coordinates to the nearest integer.
Using a graphing calculator, we find that the point of intersection is approximately (1, 0). Therefore, the solution to the system of equations rounded to the nearest integer is x = 1 and y = 0.