Understanding Linear Systems

Ever wonder what happens when two lines meet on a graph? That's exactly what systems of linear equations show us!

A system of linear equations occurs when we have two or more linear equations that we need to solve together. When you graph these equations, the solution is the point where the lines intersect - this point works in both equations.

To analyze systems graphically:

1. Graph each equation on the same coordinate plane
2. Find where the lines intersect (if they do)
3. Check that point in both equations

💡 Think of a system of equations like two friends trying to meet up - the intersection point shows exactly when and where they'll both be at the same place!

Remember that every linear equation has the form y = mx + b, where m is the slope (how steep the line is) and b is the y-intercept $where the line crosses the y-axis$. These values are crucial for understanding how the lines in a system relate to each other.

Interpreting Systems in Real-World Contexts

Systems of linear equations help us solve practical problems, like figuring out where two streets intersect on a map!

When looking at intersections in Washington, DC, we can use our understanding of parallel and intersecting lines:

• Parallel streets (like First Street and Second Street) will never intersect - they have the same slope but different y-intercepts
• Streets that aren't parallel will always intersect at exactly one point
• Some streets might overlap completely if they're the exact same street

In the real world, a system's solution tells us something specific about the situation. For instance, the intersection point might represent:

• When two people have the same amount of money
• When two vehicles meet on the road
• The exact time when two different rates produce the same result

Remember that not all systems have solutions! Just like some streets never meet, some lines never intersect. Learning to recognize these patterns helps you solve problems more efficiently.

Creating and Analyzing Savings Equations

Money problems are perfect for practicing systems of equations! Let's look at how to model savings accounts.

When someone saves money regularly, we can write it as a linear equation:

• The y-intercept (b) represents the starting amount of money
• The slope (m) shows how much they save each week
• The equation takes the form: y = mx + b, where y is the total savings and x is the number of weeks

For Colleen's savings situation:

• She starts with $120 $y-intercept$
• She saves $18 per week (slope)
• Her equation is y = 18x + 120

For Jimmy's savings:

• He starts with $64 $y-intercept$
• He saves $25 per week (slope)
• His equation is y = 25x + 64

💡 The person with the steeper slope (higher savings rate) will eventually overtake the person who started with more money!

When graphed together, these equations create a system. The intersection point shows exactly when Colleen and Jimmy will have the same amount of money (after 8 weeks, they'll both have $264).

Solving Systems Graphically

When we graph two savings equations on the same coordinate plane, we can see a story unfold about who saves more and when.

Looking at Colleen $y = 18x + 120$ and Jimmy $y = 25x + 64$:

• At first, Colleen has more money because she started with more ($120 vs $64)
• Jimmy saves more per week ($25 vs $18), so his line rises faster
• After 8 weeks, they both have exactly $264 (the intersection point)
• After that, Jimmy will always have more money than Colleen

We can find this intersection point by:

1. Graphing both lines
2. Finding where they cross visually
3. Verifying algebraically by solving: 18x + 120 = 25x + 64

To solve algebraically:

• Subtract 18x from both sides: 120 = 7x + 64
• Subtract 64 from both sides: 56 = 7x
• Divide both sides by 7: 8 = x

The slope represents the weekly savings rate - the steeper the line, the faster the person saves money. The y-intercept shows how much money they had to begin with.

The Solution to a Linear System

A system's solution is an ordered pair (x, y) that works in both equations. Graphically, it's where the lines cross!

When two people are saving money at different rates, the intersection point shows:

• WHEN they'll have the same amount $the x-value$
• HOW MUCH they'll each have at that time $the y-value$

In our example with Colleen and Jimmy, the solution is (8, 264), meaning:

• After 8 weeks, they'll both have $264
• Before 8 weeks, Colleen has more money
• After 8 weeks, Jimmy has more money

To write a system formally, use a brace like this:

{y = x + 5
{y = -2x + 8

💡 You can always check your solution by plugging the (x,y) values back into both original equations - if they work in both, you've found the correct solution!

The y-intercepts in our savings problem represent the starting amounts in each person's account (Colleen started with $120, Jimmy with $64). Understanding what each part of the equation means helps you interpret the solution in context.

When Systems Have No Solutions

Not all systems of linear equations have solutions. Let's see what happens when we compare Jimmy and Eric's savings.

Eric's situation:

• Starts with $25 in savings $y-intercept$
• Saves $25 per week (slope)
• His equation is y = 25x + 25

Jimmy's situation:

• Starts with $64 in savings $y-intercept$
• Saves $25 per week (slope)
• His equation is y = 25x + 64

When we graph these equations, we notice something important:

• Both lines have the same slope (25)
• They have different y-intercepts (25 vs 64)
• The lines are parallel and never intersect

This means Eric and Jimmy will never have the same amount in their savings accounts. Jimmy will always have exactly $39 more than Eric, no matter how many weeks pass.

When two lines have the same slope but different y-intercepts, they're parallel and the system has no solution. This is called an inconsistent system.

Analyzing Parallel Lines in Systems

When two people save at the exact same rate but start with different amounts, their savings lines run parallel to each other.

For Eric $y = 25x + 25$ and Jimmy $y = 25x + 64$:

• The same: Both save $25 per week (equal slopes)
• Different: Jimmy starts with $64 while Eric starts with$25 $different y-intercepts$
• Result: Their lines never intersect, so they never have the same amount of money

Parallel lines have these key characteristics:

• Same slope
• Different y-intercepts
• No intersection points
• No solution to the system

This makes perfect sense when we think about the real situation - if Jimmy starts with $39 more than Eric, and they both save at the exact same rate, Jimmy will always remain exactly$39 ahead.

💡 When graphing parallel lines, check that both equations have identical slopes (m values) but different y-intercepts (b values). This immediately tells you the system has no solution!

In real-world terms, a system with no solutions often means that an equality between two situations is impossible to achieve.

Systems with Different Types of Solutions

Systems can behave in three different ways depending on how the lines relate to each other:

1. One solution: Lines intersect at exactly one point

   • Different slopes (one steeper than the other)
   • Example: Eric's savings vs. Jimmy's savings

2. No solution: Lines are parallel and never intersect

   • Same slope, different y-intercepts
   • Example: Eric's savings vs. Jimmy's savings

3. Infinite solutions: Lines are actually the same line

   • Same slope, same y-intercept
   • Example: Two equivalent equations describing the same relationship

Let's see what happens when we introduce Trish, who is withdrawing money:

• Trish starts with $475 $y-intercept$
• She withdraws $25 per week (negative slope)
• Her equation is y = -25x + 475

When comparing Trish and Eric:

• Trish's money decreases over time (negative slope)
• Eric's money increases over time (positive slope)
• These lines must intersect exactly once

💡 When one line has a positive slope and another has a negative slope, they will always intersect exactly once - guaranteeing a single solution to the system!

The intersection point (9, 250) shows that after 9 weeks, both Trish and Eric will have exactly $250.

Comparing Different Rate Scenarios

When graphing Trish's withdrawals against Eric's savings, we see a clear intersection point where their money is equal.

For Trish $y = -25x + 475$ and Eric $y = 25x + 25$:

• Their slopes have the same steepness but opposite directions $25 vs -25$
• Trish starts with much more money ($475 vs $25)
• As time passes, Trish's money decreases while Eric's increases
• They'll have the same amount ($250) after 9 weeks

The intersection point (9, 250) tells us:

• After 9 weeks $x-value$, both will have $250 $y-value$
• Before 9 weeks, Trish has more money
• After 9 weeks, Eric has more money

This makes perfect sense in real life - if one person is saving and another is spending, eventually they'll have the same amount if:

• They're adding/removing money at the same rate
• The person spending started with more money

💡 When slopes have opposite signs (one positive, one negative), the lines will always intersect exactly once, creating a system with exactly one solution.

The steepness of the lines tells you how quickly the amounts are changing - the steeper the line, the faster the money grows or shrinks.

Systems with Infinitely Many Solutions

We've explored systems with one solution and systems with no solutions. Now let's look at the third possibility: systems with infinitely many solutions.

Consider this system:

{y = 3x + 6
{y = 3(x + 2)

If we simplify the second equation: y = 3$x + 2$ y = 3x + 6

Now we can see that both equations are actually identical! When we graph them, they produce the exact same line. This means:

• Every point on this line is a solution to both equations
• The system has infinitely many solutions
• The equations represent the exact same relationship

This type of system is called a dependent system - one equation depends on the other because they're actually the same equation in different forms.

When two equations in a system have:

• The same slope AND
• The same y-intercept

Then they represent the same line, and the system has infinitely many solutions.

💡 To quickly identify a system with infinite solutions, rewrite both equations in slope-intercept form $y = mx + b$. If they reduce to the exact same equation, the system has infinitely many solutions.