1. Five-Minute Check (over Chapter 1) Mathematical Practices Then/Now
New Vocabulary
Example 1: Patterns and Conjecture
Example 2: Algebraic and Geometric Conjectures
Example 3: Real-World Example: Make Conjectures from Data
Example 4: Find Counterexamples
Lesson Menu

2. Identify the solid. A. triangular pyramid B. triangular prism
C. rectangular pyramid
D. cone
5-Minute Check 1

3. Find the distance between A(–3, 7) and B(1, 4).
5-Minute Check 2

4. Find mC if C and D are supplementary, mC = 3y – 5, and mD = 8y + 20.
B. 16
C. 40
D. 45
5-Minute Check 3

5. Find SR if R is the midpoint of SU shown in the figure.
A. 22
B. 16
C. 4
D. 0
5-Minute Check 4

6. Find n if bisects VWY.
A. 3
B. 6
C. 10
D. 12
5-Minute Check 5

7. The midpoint of AB is (3, –2). The coordinates of A are (7, –1)
The midpoint of AB is (3, –2). The coordinates of A are (7, –1). What are the coordinates of B? __
A. (–1, –3)
B. (4, –1)
C. (1, 3)
D. (–4, 1)
5-Minute Check 6

8. Mathematical Practices
3 Construct viable arguments and critique the reasoning of others. MP

9. You used data to find patterns and make predictions.
Write and analyze conjectures by using inductive reasoning.
Disprove conjectures by using counterexamples.
Then/Now

10. inductive reasoning
conjecture
counterexample
Vocabulary

11. Patterns and Conjecture
A. Write a conjecture that describes the pattern 2, 4, 12, 48, 240. Then use your conjecture to find the next item in the sequence.
Step 1 Look for a pattern. ×2 ×3 ×4 ×5
Step 2 Make a conjecture
The numbers are multiplied by 2, 3, 4, and 5. The next number will be multiplied by 6. So, it will be 6 ● 240 or 1440.
Answer: 1440
Example 1

12. Patterns and Conjecture
B. Write a conjecture that describes the pattern shown. Then use your conjecture to find the next item in the sequence.
Step 1 Look for a pattern. +6 +9
Example 1

13. Check Draw the next figure to check your conjecture.
Patterns and Conjecture
Step 2 Make a conjecture.
Conjecture: Notice that 6 is 3 × 2 and 9 is 3 × 3. The next figure will increase by 3 × 4 or 12 segments. So, the next figure will have or 30 segments.
Answer: 30 segments
Check Draw the next figure to check your conjecture.
Example 1

14. A. Write a conjecture that describes the pattern in the sequence
A. Write a conjecture that describes the pattern in the sequence. Then use your conjecture to find the next item in the sequence.
A. B.
C. D.
Example 1

15. A. The next figure will have 10 circles.
B. Write a conjecture that describes the pattern in the sequence. Then use your conjecture to find the next item in the sequence. 1 3 6 10
A. The next figure will have 10 circles.
B. The next figure will have or 15 circles.
C. The next figure will have or 20 circles.
D. The next figure will have or 21 circles.
Example 1

16. some examples that support your conjecture.
Algebraic and Geometric Conjectures
A. Make a conjecture about the sum of an odd number and an even number. List or draw
some examples that support your conjecture.
Step 1 List some examples.
1 + 2 = = = = 11
Step 2 Look for a pattern.
Notice that the sums 3, 5, 9, and 11 are all odd numbers.
Step 3 Make a conjecture.
Answer: The sum of an odd number and an even number is odd.
Example 2

17. Step 2 Examine the figure.
Algebraic and Geometric Conjectures
B. For points L, M, and N, LM = 20, MN = 6, and LN = 14. Make a conjecture and draw a figure to illustrate your conjecture.
Step 1 Draw a figure.
Step 2 Examine the figure.
Since LN + MN = LM, the points can be collinear with point N between points L and M.
Step 3 Make a conjecture.
Answer: L, M, and N are collinear.
Example 2

18. A. Make a conjecture about the product of two odd numbers.
A. The product is odd.
B. The product is even.
C. The product is sometimes even, sometimes odd.
D. The product is a prime number.
Example 2

19. B. Given: ACE is a right triangle with AC = CE
B. Given: ACE is a right triangle with AC = CE. Which figure would illustrate the following conjecture? ΔACE is isosceles, C is a right angle, and is the hypotenuse.
A. B.
C. D.
Example 2

20. Make Conjectures from Data
BACTERIA GROWTH The graph shows the growth of a type of bacteria over time. It can be used to predict the growth beyond the time shown on the graph.
Example 3

21. Make Conjectures from Data
A. Fill in the chart to show the approximate number of cells at the end of each period of time.
Use the graph to estimate the number of cells at the end of the time period.
Time
Number of cells
100 1
200 2
400 3
800 4
1600 5
3200
Example 3

22. Make Conjectures from Data
Answer:
Example 3

23. Look for patterns in the data.
Make Conjectures from Data
B. Make a conjecture about the number of cells after 6 units of time and justify your prediction.
Look for patterns in the data.
The number of cells appear to double after each time period.
Double the number of cells at the end of time period 5 and that will be the number of bacteria at the end of time period 6.
Answer: The bacteria double during each time period, so
the approximate number of cells after 6 units of
time will be 6400.
Example 3

24. A. SCHOOL The table shows the enrollment of incoming freshmen at a high school over the last four years. The school wants to predict the number of freshmen for next year. Make a statistical graph that best displays the data.
A. B.
C. D.
Example 3

25. B. SCHOOL The table shows the enrollment of incoming freshmen at a high school over the last four years. The school wants to predict the number of freshmen for next year. Make a conjecture about the enrollment for next year.
A. Enrollment will increase by about 25 students; 358 students.
B. Enrollment will increase by about 50 students; 383 students.
C. Enrollment will decrease by about 20 students; 313 students.
D. Enrollment will stay about the same; 335 students.
Example 3

26. The unemployment rate is highest in the counties with the most people.
Find Counterexamples
UNEMPLOYMENT Based on the table showing unemployment rates for various counties in Alabama, find a counterexample for the following statement.
The unemployment rate is highest in the counties with the most people.
Example 4

27. A counterexample is a false example.
Find Counterexamples
A counterexample is a false example.
One counterexample to the statement is that Perry has a smaller population than Butler, but has a higher unemployment rate.
Answer: Perry has a population of 9,652, and it has a higher rate of unemployment than Butler, which has a population of 203,709.
Example 4

28. C. Wisconsin and West Virginia D. Alabama and West Virginia
DRIVING This table shows selected states, the 2000 population of each state, and the number of people per 1000 residents who are licensed drivers in each state. Based on the table, which two states could be used as a counterexample for the following statement? The greater the population of a state, the lower the number of drivers per 1000 residents.
A. Texas and California
B. Vermont and Texas
C. Wisconsin and West Virginia
D. Alabama and West Virginia
Example 4