Unit 4 Linear Equations and Linear Systems (Family Materials)

Here are the video lesson summaries for this unit. Each video highlights key concepts and vocabulary that students learn across one or more lessons in the unit. The content of these video lesson summaries is based on the written Lesson Summaries found at the end of lessons in the curriculum. The goal of these videos is to support students in reviewing and checking their understanding of important concepts and vocabulary. Here are some possible ways families can use these videos:

Keep informed on concepts and vocabulary students are learning about in class.
Watch with their student and pause at key points to predict what comes next or think up other examples of vocabulary terms (the bolded words).
Consider following the Connecting to Other Units links to review the math concepts that led up to this unit or to preview where the concepts in this unit lead to in future units.

Video Lesson Summaries

Solving Linear Equations in One Variable (Lessons 1–4): Vimeo | YouTube
Solving Any Linear Equation (Lessons 5–6): Vimeo | YouTube
Equations with Different Numbers of Solutions (Lessons 7–8): Vimeo | YouTube
Systems of Equations (Lessons 10–12): Vimeo | YouTube
Solving Systems of Equations (Lessons 13–15): Vimeo | YouTube

Section A Puzzle Problems

This week your student will work on solving linear equations. We can think of a balanced hanger as a metaphor for an equation. An equation says that the expressions on either side have equal value, just like a balanced hanger has equal weights on either side.

A balanced hanger diagram with 1 square and 2 triangles on the left side and 5 triangles on the right side illustrating the equation a + 2b = 5b

A balanced hanger diagram with a square on the left and 3 triangles on the right illustrating a = 3b.

If we have a balanced hanger and add or remove the same amount of weight from each side, the result will still be in balance.

We can do this with equations as well: adding or subtracting the same amount from both sides of an equation keeps the sides equal to each other. For example, if $4 x + 20$ and $- 6 x + 10$ have equal value, we can write an equation $4 x + 20 = - 6 x + 10$ . We could add -10 to both sides of the equation or divide both sides of the equation by 2 and keep the sides equal to each other. Using these moves in systematic ways, we can find that $x = - 1$ is a solution to this equation.

Here is a task to try with your student:

Elena and Noah work on the equation $\frac{1}{2} (x + 4) = - 10 + 2 x$ together. Elena’s solution is $x = 24$ and Noah’s solution is $x = - 8$ . Here is their work:

Elena:

$\begin{aligned} \frac{1}{2} (x + 4) & = - 10 + 2 x \\ x + 4 & = - 20 + 2 x \\ x + 24 & = 2 x \\ 24 & = x \\ x & = 24 \end{aligned}$

Noah:

$\begin{aligned} \frac{1}{2} (x + 4) & = - 10 + 2 x \\ x + 4 & = - 20 + 4 x \\ - 3 x + 4 & = - 20 \\ - 3 x & = - 24 \\ x & = - 8 \end{aligned}$

Do you agree with their solutions? Explain or show your reasoning.

Solution:

No, they both have errors in their solutions.

Elena multiplied both sides of the equation by 2 in her first step, but forgot to multiply the $2 x$ by the 2. We can also check Elena’s answer by replacing $x$ with 24 in the original equation and seeing if the equation is true. $\frac{1}{2} (x + 4) = - 10 + 2 x$ $\frac{1}{2} (24 + 4) = - 10 + 2 (24)$ $\frac{1}{2} (28) = - 10 + 48$ $14 = 38$ Since 14 is not equal to 38, Elena’s answer is not correct.

Noah divided both sides by -3 in his last step, but wrote -8 instead of $8$ for $- 24 \div - 3$ . We can also check Noah’s answer by replacing $x$ with -8 in the original equation and seeing if the equation is true. Noah’s answer is not correct.

Section C Systems of Linear Equations

This week your student will work with systems of equations. A system of equations is a set of 2 (or more) equations where the letters represent the same values. For example, say Car A is traveling 75 miles per hour and passes a rest area. The distance in miles it has traveled from the rest area after $t$ hours is $d = 75 t$ . Car B is traveling toward the rest area and its distance from the rest area at any time is $d = 14 - 65 t$ . We can ask if there is ever a time when the distance of Car A from the rest area is the same as the distance of Car B from the rest area. If the answer is “yes,” then the solution will correspond to one point that is on both lines, such as the point $(0.1, 7.5)$ shown here. 0.1 hours after Car A passes the rest area, both cars will be 7.5 miles from the rest area.

A graph of time (hours) vs distance (miles) with two lines intersecting at (0.1,7.5). One line starts at (0,0) and the other starts at (0,14).

We could also answer the question without using a graph. Since we are asking when the $d$ values for each car will be the same, we are asking for what $t$ value, if any, makes $75 t = 14 - 65 t$ true. Solving this equation for $t$ , we find that $t = 0.1$ is a solution and at that time the cars are 7.5 miles away since $75 t = 75 \cdot 0.1 = 7.5$ . This finding matches the graph.

Here is a task to try with your student:

Lin and Diego are biking the same direction on the same path, but start at different times. Diego is riding at a constant speed of 18 miles per hour, so his distance traveled in miles can be represented by $d$ and the time he has traveled in hours by $t$ , where $d = 18 t$ . Lin started riding a quarter hour before Diego at a constant speed of 12 miles per hour, so her total distance traveled in miles can be represented by $d$ , where $d = 12 (t + \frac{1}{4})$ . When will Lin and Diego meet?

Solution:

To find when Lin and Diego meet, that is, when they have traveled the same total distance, we can set the two equations equal to one another: $18 t = 12 (t + \frac{1}{4})$ . Solving this equation for $t$ , $18 t = 12 t + 3$ $6 t = 3$ $t = \frac{1}{2}$ They meet after Diego rides for one half hour and Lin rides for three quarters of an hour. The distance they each travel before meeting is 9 miles, since $9 = 18 \cdot \frac{1}{2}$ . Another way to find a solution would be to graph both $d = 18 t$ and $d = 12 (t + \frac{1}{4})$ on the same coordinate plane and interpret the point where these lines intersect.