Sistemas linealesUsar una calculadora gráfica para resolver un sistema de ecuaciones...Utilizar la calculadora gráfica de ALEKS para resolver el sistema de ecuaciones.0.75x−y=−2.10.6y=2.4x+9Redondear a la centésima más cercana.(x,y)=([[],□)
Q. Sistemas linealesUsar una calculadora gráfica para resolver un sistema de ecuaciones...Utilizar la calculadora gráfica de ALEKS para resolver el sistema de ecuaciones.0.75x−y=−2.10.6y=2.4x+9Redondear a la centésima más cercana.(x,y)=([[],□)
Input Equation 1: Input the first equation into the graphing calculator.We have the equation 0.75x−y=−2.1. To input this into a graphing calculator, we need to solve for y to get it into the form y=mx+b.So, y=0.75x+2.1.Input this equation into the graphing calculator.
Input Equation 2: Input the second equation into the graphing calculator.We have the equation 0.6y=2.4x+9. To input this into a graphing calculator, we need to solve for y to get it into the form y=mx+b.So, y=(2.4/0.6)x+(9/0.6).Simplify the equation to get y=4x+15.Input this equation into the graphing calculator.
Find Intersection Point: Use the graphing calculator to find the point of intersection. After inputting both equations into the graphing calculator, use the graphing calculator's functionality to find the intersection point of the two lines. This point will give us the values of x and y that solve the system of equations.
Read Coordinates: Read the coordinates of the intersection point from the graphing calculator.Assuming the graphing calculator has found the intersection point, read off the coordinates of this point. These coordinates will be the solution to the system of equations.
Round to Nearest Hundredth: Round the coordinates to the nearest hundredth.Once we have the coordinates of the intersection point, we round them to the nearest hundredth as per the problem's instructions.
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