System of two equations with a non-linear equation

How to approach solving a system of equations where one equation isn’t linear

This lesson will show you the algebraic way of solving a pair of equations where one is a linear equation, which is the equation of a line where all variables are first-degree variables, like ???x??? and ???y???. The other equation will have at least one squared variable in it, like ???x^2??? or ???y^2???.

In a system, all equations will have the same or overlapping unknowns. If you have a pair of equations with two variables, there are a variety of ways to solve for the values of the unknowns that make both equations true.

Solving the system when one equation is linear and the other is quadratic

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An example of solving a system of two equations with a quadratic equation and a linear equation

Example

Solve the system for ???x??? and ???y???.

???\begin{cases}x^2+4y^2=100 \\y=-\frac{3}{2}x-5 \end{cases}???

In this case the second equation is already solved for ???y???, so we can begin by substituting this value for ???y??? into the first equation.

???x^2+4y^2=100???

???x^2+4\left(-\frac{3}{2}x-5\right)^2=100???

Expand the square.

???x^2+4\left(-\frac{3}{2}x-5\right)\left(-\frac{3}{2}x-5\right)=100???

???x^2+4\left(\frac{9}{4}x^2+15x+25\right)=100???

Distribute the ???4??? across everything inside the parentheses.

???x^2+9x^2+60x+100=100???

???x^2+9x^2+60x+100-100=0???

???10x^2+60x=0???

Factor out a ???10x??? to help solve for ???x???.

???10x(x+6)=0???

???10x=0??? and ???x+6=0???

???x=0??? and ???x=-6???

Plug these ???x???-values into ???y=-(3/2)x-5??? to find the ???y???-values that go with them.

When ???x=0???,

???y=-\frac{3}{2}(0)-5=-5???

so we have the solution ???(0,-5)???. And when ???x=-6???,

???y=-\frac{3}{2}(-6)-5=4???

so we have the solution ???(-6,4)???.

You can look at this picture of the system to see that the solutions are where the ellipse and line intersect.

Let’s do another example that involves a few more steps.

Example

Solve the system for ???x??? and ???y???.

???3x^2+2y^2-54y=143???

???x-3y=3???

Solving a system means we’re finding where the graphs of the two equations intersect each other.

Let’s solve this system by solving the second equation for ???y??? and then making a substitution for ???y??? into the first equation.

???x-3y=3???

???-3y=-x+3???

???\frac{-3}{-3}y=\frac{-x}{-3}+\frac{3}{-3}???

???y=\frac{1}{3}x-1???

Plug this value for ???y??? into the first equation and then solve for ???x???.

???3x^2+2y^2-54y=143???

???3x^2+2\left(\frac{1}{3}x-1\right)^2-54\left(\frac{1}{3}x-1\right)=143???

Expand the square.

???3x^2+2\left(\frac{1}{3}x-1\right)\left(\frac{1}{3}x-1\right)-54\left(\frac{1}{3}x-1\right)=143???

???3x^2+2\left(\frac{1}{9}x^2-\frac{2}{3}x+1\right)-18x+54=143???

???3x^2+\frac{2}{9}x^2-\frac{4}{3}x+2-18x+54=143???

Combine like terms.

???3x^2+\frac{2}{9}x^2-\frac{4}{3}x-18x+54 +2-143=0???

???\frac{29}{9}x^2- \frac{58}{3}x- 87= 0???

Clear fractions by multiplying through by ???9???.

???9\left(\frac{29}{9}x^2- \frac{58}{3}x- 87\right)= 9\cdot0???

???9\cdot \frac{29}{9}x^2-9 \cdot \frac{58}{3}x-9\cdot 87=0???

???29x^2-174x-783=0???

We can simplify more by dividing everything by ???29???.

???\frac{29}{29}x^2-\frac{174}{29}x-\frac{783}{29}=\frac{0}{29}???

???x^2-6x-27=0???

Factor, then solve for ???x???.

???(x-9)(x+3)=0???

???x-9=0??? and ???x+3=0???

???x=9??? and ???x=-3???

Plug these values for ???x??? into the equation you solved for ???y??? to find their corresponding ???y???-values.

???y=\frac{1}{3}x-1???

???y=\frac{1}{3}(9)-1=2???

So one solution is ???(9,2)???, and

???y=\frac{1}{3}(-3)-1=-2???

the other is ???(-3,-2)???.

Sometimes it’s nice to have a visual of what we just did. Here’s a graph of the ellipse and the line. Notice that they intersect at the solution points ???(-3,-2)??? and ???(9,2)???.

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