Six Moves Make One Workflow
A complete analysis runs these in order:
- Write the equation
- Interpret slope
- Interpret intercept
- Predict (interpolation)
- Predict (extrapolation)
- Association or causation?
Step 1: Write the Equation
Line through
Slope:
Intercept:
Step 2: Interpret the Slope
- Slope
- For each additional absence, the model predicts the exam score is associated with a 4-point decrease
Step 3: Interpret the Y-Intercept
- Intercept
- At
absences, predicted score is 95 - Meaningful: perfect attendance, and
is in our data
Step 4: An Interpolation Prediction
Predict at 6 absences:
6 is inside the 0-to-12 range — trustworthy.
Step 5: Extrapolation and Breakdown
- At 20 absences:
— beyond the data - At 25 absences:
- A score of
is impossible — the model breaks down
Quick Check: Which Kind of Prediction?
Is predicting the score at 6 absences interpolation or extrapolation?
Decide and justify before advancing.
Step 6: Association Versus Causation
- The data show absences and scores move together
- That is an association
- It does not prove absences cause lower scores
Lurking Variables Can Explain Both
- A hidden third factor can drive both variables
- It creates an association without direct cause
A Classic Example of a Lurking Variable
- Ice cream sales and drowning rates rise together
- Does ice cream cause drowning? No.
- Summer heat drives both
Back to the Absences Question
- Maybe absences directly hurt scores — possibly
- Or illness, or home challenges, affect both
- The data alone cannot tell which
Your Turn: Find the Error
A classmate writes: "This proves that missing class causes lower scores."
- What is the logical error?
- Propose a lurking variable
Fix the claim before advancing.
Guided Practice: Walk the Workflow
A new data set: hours of sleep vs. reaction time, line through
Step 1: Find the slope — what is the rise over run?
Work step 1, then advance for the rest.
Your Turn: Run a Complete Analysis
Temperature vs. pool visitors, line through
Run all six steps: equation, slope, intercept, two predictions, causation.
Work the whole analysis on your own first.
The Complete Story of an Analysis
✓ The equation gives the rule; slope and intercept give meaning
✓ Predictions are safe inside the data, reckless far outside
✓ A strong association still does not prove causation
Coming Up Next: High School Statistics
In high school, you'll fit lines formally with least-squares regression, measure fit with correlation, and learn how experiments can actually establish causation.