Constructing Functions from Graphs and Descriptions

Deck 2 of 2: Graphs, Words, and Mixed Representations

In this deck:

• Extract two points from a graph to build the function
• Translate verbal descriptions into linear or exponential functions
• Classify and construct from mixed representations

What You Will Learn Today

1. Read two integer-coordinate points from a graph
2. Construct linear and exponential functions from graphs
3. Translate verbal descriptions into function parameters
4. Classify and construct from mixed representations

Reading a Graph: Choose Clean Points

From a graph, choose two points where the curve passes through integer intersections.

• Avoid midpoints between grid lines — reading errors compound downstream
• Check: does the curve clearly pass through this intersection?
• Pick points far apart to reduce slope computation error

Linear Graph: Construct from Two Points

• Points: and
• ; then

— verify: ✓ and ✓

Exponential Graph: Construct from Two Points

• Points: and
• ; then

— verify: ✓ and ✓

Check: Which Points Did You Read?

For a graph passing through and :

1. Compute the slope.
2. Find using one point.
3. Write the function.
4. Verify both points.

Classify first: are these differences or ratios — linear or exponential?

Answer: f(x) = 3x + 2

• ; using :
• — verify: ✓ and ✓

Constant difference of 3 → linear confirmed.

Verbal Descriptions: Extract the Parameters

Classify first, then extract the two parameters.

Linear from Words: Pool Water Level

"A pool contains 200 gallons at . Water fills at 50 gallons per minute."

• Initial value: →
• Rate: 50 gallons/min →
• Function:

Exponential from Words: Car Depreciation

"A car costs 25,000 dollars new and depreciates 18% per year."

• Initial value: →
• Rate: −18%/yr → factor
• Function:

The factor is 0.82, not 0.18.

Check: Write the Function from Words

"A salary starts at 45,000 dollars and increases by 2,500 dollars per year."

1. Is this linear or exponential? How do you know?
2. Identify and .
3. Write .
4. What is the salary after 5 years?

Work through all four steps before the next slide.

Answer: S(t) = 2500t + 45000

• Linear: constant dollar increase per year
• ,
• (57,500 dollars)

Transition: From Single to Mixed Representations

You now have four construction pathways:

• Two points (numbers)
• Table of values
• Graph
• Verbal description

The underlying algebra is always the same. The only new step: classify first.

Decision Flowchart: Classify, Then Construct

Mixed Example: Classifying and Building from a Table

Differences: 4, 8, 16 — not constant → not linear.
Ratios: 2, 2, 2 → exponential, , .

Mixed Example: Classifying and Building from a Graph

A graph shows a straight line through and .

• Visual: straight line → linear
• (y-intercept readable from graph)

Mixed Example: Two Verbal Descriptions

A. "Population doubles every 10 years from 5,000."

• Exponential: , →

B. "Tank drains 15 L/min from 300 liters."

• Linear: , →

Check: Classify and Construct from a Table

;

1. Compute differences — constant?
2. Compute ratios — constant?
3. Classify and construct the function.
4. Verify one point not used in construction.

Work all four steps before the next slide.

Answer: f(x) = 2 · 3^x

• Differences: 4, 12, 36 — not constant → not linear
• Ratios: all equal 3 → exponential,
• — verify: ✓

Mixed Practice: Six Construction Problems

Tables:

1. ;
2. ;

Graphs:

3. Line through and
4. Curve through and

Verbal:

5. "Balance $1,200, earns 6% interest annually"
6. "Candle 14 in. tall, burns 0.5 in. per hour"

Mixed Practice: Check Your Answers

1. Linear:
2. Exponential:
3. Linear:
4. Exponential:
5. Exponential:
6. Linear:

Complete Summary: Four Representation Types

5% growth → , not
first table value if absent
Always verify both original points

What's Next: Comparing Growth Rates

Coming up in HSF.LE.A.3:

• Compare linear and exponential growth over the same interval
• Discover why exponential always eventually exceeds linear
• Interpret the long-run implications for real-world models

The functions you constructed here become the examples you'll compare in the next lesson.