Exploring Adding and Subtracting Rational Expressions

To determine if the equations are parallel

To rewrite the equations in a different format

To find the values of x and y where the equations intersect

To graph the equations on a coordinate plane

Multiply both equations by a common factor

Graph the equations to find the intersection point

Solve for either x or y in one of the equations

Substitute one equation into the other

They intersect at infinitely many points

They do not intersect at any point

They intersect at exactly one point

They form a right angle at the intersection point

Infinitely many solutions

No solution

Exactly one solution

Two distinct solutions

Solve for the other variable in the same equation

Substitute the solved value into the other equation

Graph the solution on a coordinate plane

Check the solution by plugging it back into the original equations

You prove that the two equations are equivalent

You find the values of both x and y that satisfy both equations

You find the value of y only

You find the value of x only

It is always easier to solve for y

Solving for x is not allowed in the substitution method

Solving for y might be simpler based on the equation's structure

It is a requirement of the substitution method

Recheck your calculations; the answer should be a whole number

Assume the equations do not intersect

Graph the equations to find the exact intersection point

Consider the solution as correct; decimals are acceptable

By checking if the solution forms a straight line on a graph

By solving the system using another method for comparison

By substituting the values back into both original equations

By asking a peer to solve the same system

It improves problem-solving skills and mathematical thinking

It is required for all algebra courses

It helps in understanding complex algebraic expressions

It is the only method to solve systems of equations