Using elimination determine the simplified equation of the following equation without the variable y in said equation. 3y = 4x² - x + 2 and 9y = 5x + 7 

What is the simplified equation of the following equations after using substitution.                             y = 4x² + 9x + 3x - 17 and 4y - 5 = x² - 2 + 8x - 6x

6y + 4x = 2x² - 2x - 5 and -3y = 4x² + x + 1. Solve using the quadratic equation.

Grace has arch ways with different parabolas to represent them. If she puts them together, what will the x values of the intersections? 2y = 3x² + 7x - 8 and y = 5x - 2 *hint use quadratic equation

What will the x’s be if the following equation was fully solved/simplified? (Square root symbol covers all of the numbers on the top.)                                          x = -8 +or- √8² - 4(12)(2) / 2(12)

Use elimination to solve for the intersection of the following equations. 8y = 2x² + 3x + 5x + 1 + (-1) and 2y + 1 = x² - 3x 

Use substitution to determine the x values of the intersection. -2x - y = 52 and 3y = -4x² + 6 - 2x

(Round to nearest hundredth place) Simplify the following equations to one, and then use the quadratic equation to solve for the x values of the intersection point(s). 7y = 14x² + 28x - 49 and 2y = 4x² - 3x - 5

Kyle kicks a football twice, each going on slightly different parabolic curves. One curve can be represented by 3x² + 4x - 12 = y and the other one is represented by 4y = 2x² -12x. What are the x values of the intersection points?

Is elimination or substitution better to use in this scenario? 

2y + 4 = 3x² + 9 - 7x and 3x + 6 = -y - 2x² + 12

You have two unknown integers. Double and square the larger number by five times the larger number equals triple the smaller number subtracting 7. Negative quadruple the larger number by negative quadruple the smaller number equals 12. What are the two integers values? 

Determine the values of m and n if (2,4) is a solution to the following system of equations. 

mx² - y = 24 and mx² - 4y = n