Thoughts on Teaching Math with technology

Monday, February 16, 2026

The "Pulse Check" Blueprint: A Math Teacher’s Guide to Real-Time Recovery

In 2026, we’ve learned that a "Big Test" is often just an autopsy of what a student already failed to learn. To stay ahead of the curve, modern educators are moving toward the Pulse Check—a lightweight, daily diagnostic that tells you exactly where the "leaks" are in your classroom’s logic before they become floods.

If you’re ready to move from guessing to knowing, here is how to build a 5-minute Math Pulse Check template that turns data into immediate action.

A successful pulse check isn't a quiz; it’s a snapshot. To keep it under five minutes, your template should follow the "1-2-1 Rule":

1 Confidence Indicator: A quick "Traffic Light" rating (Red, Yellow, Green) on how they feel about today’s specific target.
2 "Process" Problems: One simple problem to check for basic fluency, and one multi-step problem that requires "showing the work."
1 "Muddiest Point" Prompt: A single open-ended question: "Where did the logic get fuzzy today?"

The best pulse checks combine the speed of digital tracking with the depth of analog work. Here is a suggested layout you can use on a physical slip or a digital form. Begin with the vibe where students choose an emoji for expressing their confidence in solving for x that day. Then go on the skill portion where they are asked to solve a problem such as 3(x+4) = 24. Next ask a question such as what was your very first step and why? Finally the last part looks at any gaps by asking an open-ended question. If you had to explain one part of today's lesson to a friend, which part would you skip because you are still unsure?

Remember, the template is only as good as what you do with the results. In a Continuous Intervention classroom, the teacher reviews the "Pulse Map" immediately after the session:

The "Green" Group (80-100%): These students move to an "Analog Challenge" or independent research while you work with the others.
The "Yellow" Group (50-79%): These students get a Micro-Intervention. You pull them for a 3-minute huddle to address a specific misconception (e.g., "Remember to distribute to both terms in the parentheses").
The "Red" Group (Below 50%): This signals a "Systemic Error." If more than 30% of the class is Red, stop the individual work and do a whole-class "Live Debugging" session on the board.

By using this template daily, you transform "making a mistake" from a catastrophe into a data point. When students see that their "Pulse Check" leads to immediate, helpful support rather than a grade-book penalty, math anxiety drops and performance soars. Let me know what you think, I'd love to hear. Have a great day.

Friday, February 13, 2026

The Era of the Educational "Pulse Check"

For decades, the rhythm of the school year was defined by two words that struck fear into the hearts of students: Mid-terms and Finals. These high-stakes, "lagging indicators" only told us what a student failed to learn weeks after the confusion began.

But as we move through 2026, that rigid cycle is dissolving. In its place is a dynamic, high-definition approach known as Continuous Intervention. By leveraging real-time data from daily "pulse checks," educators are now fixing learning gaps in minutes, not months.

Unlike a traditional exam, a pulse check isn't a separate event; it’s woven into the fabric of daily work. Every time a student interacts with a digital assignment or a smart-learning platform, the system captures micro-data.

Instead of just recording whether an answer is "right" or "wrong," these platforms analyze the pathway to the answer. They track the time spent on task and asks "Is the student stuck on a specific step?" It looks for error patterns. Did they make a calculation error, or is there a fundamental misunderstanding of the concept? It also checks for engagement levels. Are they clicking rapidly (indicating frustration) or moving with steady intent?

The true magic of this shift happens through micro-interventions. Imagine a student working on a multi-step algebraic equation. In the old world, they might complete ten problems incorrectly, turn them in, and wait three days for a graded paper to realize they were applying the wrong rule.

In 2026, the moment that student misses a specific step—perhaps forgetting to distribute a negative sign—the system alerts the teacher’s tablet.

System Alert: "Maya is struggling with step 3 of the Distributive Property. This is her third consecutive error on this specific sub-skill."

This allows the teacher to walk over and provide a 30-second "course correction" immediately. By catching the "misconception" in the moment, we prevent the student from "practicing the mistake" and building a foundation of frustration.

You might wonder why it's changing the classroom. It lowers math anxiety. When students know that help is "just-in-time," the fear of falling behind vanishes. Learning becomes a safe series of small adjustments rather than a high-wire act without a net. It allows for equity in attention. AI "Co-pilots" help teachers see the quiet students who may be struggling silently, ensuring that intervention is based on objective need rather than who raises their hand the loudest. It also provides for data-informed grouping. Instead of static "low, middle, and high" groups, teachers can use daily pulse data to create fluid groups. Today, five students might need a workshop on fractions; tomorrow, that group will look completely different based on the day’s "pulse."

As continuous intervention becomes the standard, the "Big Test" is becoming a relic. When we have 180 days of high-fidelity data on a student’s progress, a three-hour exam at the end of the semester feels redundant—and remarkably inaccurate.

The future of 2026 is one where no student is "lost in the shuffle," because the shuffle has been replaced by a steady, supportive beat of data-driven care. Let me know what you think, I'd love to hear. Have a great weekend.

Wednesday, February 11, 2026

The Hybrid Syllabus: Building a Bridge Between Digital Discovery and Analog Depth

As we navigate the educational landscape of 2026, the pendulum has swung back from "digital-only" to a more intentional "hybrid" model. Educators are realizing that while Google and AI are unparalleled for research, the human brain still craves the tactile, slow-motion processing of pen and paper for true problem-solving.

A Hybrid Syllabus isn't about doing twice the work; it’s about using the right tool for the right task. Here is how a modern, balanced curriculum looks in action. Let's begin by looking at the search digitally, solve analogy frameworks.

In this model, we divide the learning process into two distinct phases. This helps students manage their "cognitive load"—ensuring they don't get overwhelmed by a screen while trying to perform deep mental heavy lifting. In the first phase or digital discovery stage, students use the devices for cross-referencing sources. They use AI-powered search to find diverse perspectives on a historical event or a scientific theory. Or they might use tools like Desmos or AR simulations to see how changing a variable affects a 3D model for visualization. The digital stage also allows for collaborative brainstorming. Students can use shared digital boards to map out initial ideas with peers across the globe.

The second phase is the analog mastery part. Once the information is gathered, the screens go dark. The "Analog" phase is where the information is synthesized into knowledge. First complex math and logic problems are solved on paper. This physical act slows down the thinking process, allowing students to spot errors in their own reasoning that they might click past on a screen. Instead of clicking "save," students summarize their research in handwritten journals. Studies show that handwriting improves long-term retention and conceptual "mapping." Finally, classroom time is carved out for "Unplugged Hours," where students focus on a single, difficult task without the pull of notifications.

On Monday, students may research real-world applications of parabolas such as satellite dishes or bridge architecture. Tuesday, they sketch parent functions by hand while calculating vertex points on paper to "feel" the slope. Wednesday is a hybrid day where they test paper-calculated theories using a graphing simulator to see if visual matches the math. Thursday is back to having students participate in "whiteboard battles" where they solve complex equations in groups without devices. Finally on Friday, they submit a digital portfolio reflecting what they learned.

By 2026, the data is clear: students in hybrid environments show 13% higher retention rates in STEM subjects compared to those in 100% digital environments. The hybrid syllabus respects the speed of modern technology while honoring the biological needs of the human brain. It prepares students for a digital workforce while ensuring they possess the analog "grit" to solve problems when the Wi-Fi goes down. Let me know what you think, I'd love to hear. Have a good day

Monday, February 9, 2026

The Great Unplugging: Why Classrooms are Returning to Pen and Paper

For over a decade, the "classroom of the future" was envisioned as a sea of glowing tablets and AI-powered screens. However, in 2026, a surprising trend is taking hold: The Great Unplugging. From the halls of early elementary schools to advanced high school math labs, educators and policymakers are intentionally easing away from high-tech saturation.

While it might seem counterintuitive in an age of artificial intelligence, the shift back to analog is driven by a focus on cognitive depth, mental health, and the fundamental way the human brain processes logic.

The most immediate reason for the shift is the sheer volume of distraction. Research from the 2025-2026 Education Insights Report reveals that nearly 80% of teachers feel they are constantly competing with social media and notifications for their students' attention.

Even when using "educational" apps, the temptation to multitask is high. By removing the device, teachers are recreating a "Sacred Space" for learning where the only notification a student receives is the one they generate themselves through a "lightbulb moment."

Nowhere is the "analog revival" more visible than in the math classroom. While AI tutors and graphing calculators are powerful, they often solve the problem for the student, rather than with them. For instance, writing a math problem out by hand forces a student to engage in "metacognition"—thinking about their thinking. In addition, digital screens are often too small or too rigid for the messy, non-linear work that algebra and geometry require. Did you know that studies show that the physical act of writing out an equation creates a stronger neural pathway than typing it. It’s the difference between "watching" a problem be solved and "feeling" the logic unfold.

Furthermore, international trends are also influencing this move. In late 2025, countries like Sweden made global headlines by officially scaling back digital devices in early grades to focus on physical books and handwriting. Their reasoning was clear: Digital tools should enhance literacy, not replace the foundations of it. UNESCO has echoed these concerns, warning that uncritical adoption of tech can widen equity gaps—as students who struggle with digital literacy fall further behind their peers who have high-speed access at home.

Finally, there is a social-emotional cost to the "one-to-one" tablet ratio. When every student is buried in their own screen, peer-to-peer collaboration suffers. Teachers in 2026 are finding that returning to whiteboards and paper worksheets naturally fosters more conversation. Students look up, they ask their neighbor for help, and they engage in the "productive struggle" together.

The goal isn't to become Luddites or ignore the reality of AI; it’s about intentionality. In 2026, technology is being moved from the "default" to a "specialized tool." We are learning that while a computer can calculate the square root of $144$ in a nanosecond, the human brain grows stronger by doing the work itself. Let me know what you think, I'd love to hear. Have a great day.

Friday, February 6, 2026

The "Viral Growth" Lab

Today, I'm including a lab which will help students explore the connection between direct variations, linear equations, and arithmetic sequence so you have a starting point.

Objective: Students will distinguish between Direct Variation, Linear Functions, and Geometric Sequences using graphing software and tables.

Part 1: The Setup (10 Minutes)

Divide the class into three "Reality Groups." Each group is tracking the followers of a new influencer.

Group A (Direct Variation): The account gains exactly 10 followers every hour. They started at 0. ( $y = 10x$ )
Group B (Linear Function): The account gains exactly 10 followers every hour, but they started with 50 followers from a previous account. ( $y = 10x + 50$ )
Group C (Geometric Sequence): The account starts with 2 followers, but the followers double every hour. ( $a_n = 2 \cdot 2^{n-1}$ )

Part 2: The Digital Lab (20 Minutes)

Students open a graphing tool (like Desmos) or a spreadsheet and create a table for hours 0 through 5.

Group A & B Comparison: Students plot Group A and Group B on the same graph.

The Visualization: They will see two parallel lines.
The Discovery: Group A is "Direct Variation" because it goes through $(0,0)$ . Group B is "Linear" but not direct variation because of the $y$ -intercept.

Group A & C Comparison: Students then plot Group C (the Geometric Sequence) as a scatter plot of points.

The Visualization: At hour 1 and 2, the linear growth (Group A) looks "faster." But by hour 4 or 5, the dots for Group C begin to "skyrocket" past the straight line.
The Discovery: Linear growth is about adding (constant slope); Geometric growth is about multiplying (common ratio).

Part 3: The "Deep Dive" Analysis (10 Minutes)

Display the Comparison Chart on the board and have students fill in the missing pieces based on their graphs.

Feature	Direct Variation	Linear Function	Geometric Sequence
Growth Rule	Constant Addition	Constant Addition	Constant Multiplication
Starting Point	Must be $(0,0)$	Any $y$ -intercept ( $b$ )	A starting term ( $a_1$ )
Visual Shape	Straight line through origin	Straight line anywhere	A curved path of dots
Key Variable	Constant of Variation ( $k$ )	Slope ( $m$ )	Common Ratio ( $r$ )

Part 4: The Exit Ticket (5 Minutes)

Ask students to answer one question before leaving:

"If you were trying to save money for a car, would you want your savings to grow like a Linear Function or a Geometric Sequence? Use the word 'slope' or 'ratio' in your answer."

This should get you started with lab for this topic. Let me know what you think, I'd love to hear. Have a great day.

Wednesday, February 4, 2026

The Golden Thread: Connecting Linear Graphs, Direct Variation, and Geometric Sequences

In the world of mathematics, we often teach topics in "silos." On Monday, we study linear equations; on Wednesday, we talk about ratios; and by Friday, we are looking at patterns of numbers. However, for a student to truly master algebra, they need to see the "Golden Thread" that connects these concepts.

In a technology-integrated classroom, we can use tools like Desmos or Google Sheets to show that Linear Graphs, Direct Variation, and Geometric Sequences aren't different languages—they are just different dialects of the same story.

Direct variation is the simplest form of a relationship. It follows the formula $y = kx$ , where $k$ is the constant of variation. In plain English: if you double $x$ , you double $y$ .

When students use a digital slider to change the value of $k$ , they see something specific: the graph always remains a straight line, and it must pass through the origin $(0,0)$ . This is the "purest" form of a linear relationship. Using a data visualization tool, students can plot the cost of gasoline ( $y$ ) versus gallons purchased ( $x$ ). The line is straight because the price per gallon ( $k$ ) never changes.

As we move from direct variation to general linear graphs ( $y = mx + b$ ), we introduce the $y$ -intercept ( $b$ ). Using technology, students can "drag" a line up and down the $y$ -axis. They quickly realize that direct variation is simply a special case of a linear graph where $b = 0$ .

By visualizing this on a digital coordinate plane, students see that the "slope" ( $m$ ) in a linear equation is functionally identical to the "constant" ( $k$ ) in direct variation. This bridge allows them to move from simple ratios to complex functional modeling without losing their footing.

This is where the connection gets fascinating. A Geometric Sequence (like 2, 4, 8, 16...) is usually taught as an exponential concept because you multiply by a common ratio ( $r$ ) to get the next term. However, if we look at the logarithmic scale or compare how sequences grow relative to linear patterns, students can see a new kind of "straight line."

If we plot a geometric sequence on a standard graph, it curves upward. But, if we use technology to plot a Arithmetic Sequence (adding the same amount each time), we get a series of dots that form a perfect linear graph.

By placing these side-by-side in a spreadsheet, students can ask: "What if my 'slope' isn't something I add, but something I multiply?" This leads to the discovery of the Common Ratio.

Why These Connections Matter

When students see these relationships through tech-based visualization:

Direct Variation becomes the "anchor" (the simplest ratio).
Linear Graphs become the "extension" (moving the anchor).
Sequences become the "discrete version" (the individual points on the line).

Classroom Application

Try this: Have students use a spreadsheet to model a phone's battery life.

Direct Variation: If the phone loses 5% every hour, that’s a direct relationship.
Linear Graph: If the phone starts at 80% and loses 5% per hour ( $y = -5x + 80$ ), they see the $y$ -intercept in action.
Sequence: If they only check the battery at the start of every hour, they are looking at a sequence of data points.

By the end of the lesson, the students aren't just memorizing formulas; they are seeing the interconnected skeleton of the mathematical universe. Let me know what you think, I'd love to hear. Have a great day. On Friday, we'll look at a possible lesson for this topic.

Monday, February 2, 2026

Quick-Start Guide: Desmos Classroom for Algebraic Fractions

Today, I've included a quick start guide to finding appropriate activities for helping students visualize algebraic functions using demos.

Step 1: The Setup (2 Minutes)

Go to teacher.desmos.com and sign in (Google Sign-In is usually fastest for 1:1 classrooms).
In the search bar, type "Polygraph: Rational Functions" or "Algebraic Fractions." * Pro Tip: Use a pre-made activity for your first time. "Polygraph" is a "Guess Who" style game that forces students to use mathematical vocabulary to describe graphs.

Step 2: Customizing the "Truth Machine" (3 Minutes)

If you want to build your own quick activity:

Click "Custom" on the left sidebar and select "New Activity."
Add a Graphing Screen.
In the expression bar, enter:
$y = \frac{x^2 - a}{x - \sqrt{a}}$ $y = \frac{x^2 - a}{x - \sqrt{a}}$
Click the button to "Add Slider" for the variable $a$ .
Add a Note component next to it asking: "Move the slider. What happens to the graph when 'a' is a perfect square like 4 or 9? Why does the line disappear at a certain point?"

Step 3: Launching the Lesson (1 Minute)

Click "Assign" and select "Single Session Code."
Project the code on your board. Students go to student.desmos.com and enter the 6-digit code. No student accounts required!

Step 4: The "Dashboard" Phase (During Class)

This is where the magic happens. While students are working, use your Teacher Dashboard:

Anonymize: Click this to hide student names and replace them with famous mathematicians. This is perfect for projecting a "wrong" answer to discuss as a class without embarrassing anyone.
Pacing: Use this to "lock" students into screens 1-3 so they don't rush ahead.
Snapshot: See a great explanation? Take a "Snapshot" of that student's work and project it to the class to spark a discussion.

The "Common Denominator" Activity Idea

Ask students to graph $y = \frac{1}{x} + \frac{1}{2}$ . Then, ask them to type their "simplified" version in the next line.

If their second line doesn't perfectly cover the first line, they know their algebraic addition is wrong.
The visual feedback is instant. They don't need to wait for you to grade it; the graph tells them the truth.

Teacher’s Tech Toolkit for 2026

Feature	Why You’ll Love It
Checkboxes	Create "Self-Checking" screens where a "Correct!" message appears only when the fraction is simplified.
Marbleslides	A game where students must change the numbers in a fraction to "catch" stars with a marble—perfect for learning asymptotes.
Card Sort	Have students match an algebraic fraction to its simplified counterpart and its graph