What You Will Be Able To Do
By the end of this lesson, you should be able to:
- Locate an irrational number on a number line using its bounds
- Compare two irrationals, refining when their intervals overlap
- Estimate expressions involving irrationals using
Where Exactly Is the Square Root of 2?
You can squeeze any
So: on a line from 0 to 4, where exactly does
And is
Placing the Square Root of 2
From last lesson:
So on a 0-to-4 line,
Plotting a point — a skill you already own from grade 6.
The Number Line Holds Every Real Number
- Every real number — rational or not — is one exact point
- The bound
pins it to within a hundredth - That's finer than any tick mark you could draw by hand
Four Irrationals on One Line
Each is labeled with its name and its rational bound.
Zooming In Shows More Precision
Same numbers, finer scale — placement precision matches your bounds.
Compare: Square Root of 8 vs. Pi
: , , so
Since
Predict: Square Root of 10 vs. Pi
Round to one decimal:
They look equal. Can we conclude
Refine Until the Intervals Separate
The Strategy for Comparing Two Irrationals
- Approximate both to the same precision
- If the intervals don't overlap — you can compare
- If they do overlap — add a digit and try again
Your Turn: Order Four Numbers
Order from least to greatest:
Approximate each, then arrange them. Show your bounds.
From Locating Points to Computing Values
You replaced
Now replace it inside an expression and compute:
Estimate Pi Squared by Substituting
So
Estimate Two More Irrational Expressions
Substitute the approximation, then do the arithmetic.
When No Approximation Is Needed
Squaring a square root returns the original number.
Spot this before reaching for
Quick Check: Pi Squared or 10?
You found
So which is greater —
Estimate These Three On Your Own
Estimate each value:
- Area of a circle with radius
cm:
Use
Key Takeaways From This Lesson
✓ Every irrational is one exact point — locate by its bound
✓ When comparing, refine until intervals stop overlapping
✓ Estimate expressions by substituting, then computing
Watch out:
Watch out: one decimal isn't always enough
Where We Go From Here Next
Soon, the Pythagorean theorem will hand you side lengths like
These tools turn those exact lengths into measurements you can use.