Geometry 2-1 Guided Practice: Patterns and Inductive Reasoning
By Matt Richardson
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Last updated almost 3 years ago
23 Questions
3 points
3
Question 1
1.
Video Check: Select all that apply with regards to the video embedded directly above this item.
10 points
10
Question 2
2.
Solve It! How many rectangles would you get if you folded a piece of paper in half eight times?
Enter only a number.
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10
3 points
3
Question 4
4.
Video Check: Select all that apply with regards to the video embedded directly above this item.
10 points
10
Question 5
5.
Take Note: Define inductive reasoning.
10 points
10
Question 6
6.
Problem 1 Got It?
What are the next two terms in the sequence?
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10
Question 7
7.
Problem 1 Got It? What are the next two terms in the sequence? Draw them on the canvas. You may also complete your work on paper or on a whiteboard and upload a clear picture of it to the canvas.
3 points
3
Question 8
8.
Video Check: Select all that apply with regards to the video embedded directly above this item.
10 points
10
Question 9
9.
Take Note: Define conjecture.
10 points
10
Question 10
10.
Problem 2 Got It?
3 points
3
Question 11
11.
Video Check: Select all that apply with regards to the video embedded directly above this item.
10 points
10
Question 12
12.
Take Note: Describe why it is important to collect an adequate amount of data before you make a conjecture.
10 points
10
Question 13
13.
Problem 3 Got It?
3 points
3
Question 14
14.
Video Check: Select all that apply with regards to the video embedded directly above this item.
5 points
5
Question 15
15.
Problem 4 Got It? What conjecture can you make about backpack sales in June?
10 points
10
Question 16
16.
Problem 4 Got It? Reasoning: Is it reasonable to use this graph to make a conjecture about sales in August? Explain.
3 points
3
Question 17
17.
Video Check: Select all that apply with regards to the video embedded directly above this item.
10 points
10
Question 18
18.
Take Note: Define counterexample.
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Question 19
19.
Take Note: Provide a counterexample that proves the conjecture false.
All students in our school are named Bob.
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10
Question 20
20.
Problem 5 Got It? What is a counterexample for the conjecture?
If a flower is red, it is a rose.
10 points
10
Question 21
21.
Problem 5 Got It? Draw a counterexample for the conjecture on the canvas.
One and only one plane exists through any three points.
You may also complete your work on paper or on a whiteboard and upload a clear picture of it to the canvas.
10 points
10
Question 22
22.
Problem 5 Got It? What is a counterexample for the conjecture?
When you multiply a number by 3, the product is divisible by 6.
10 points
10
Question 23
23.
🧠 Retrieval Practice:
Summarize the mathematical content of this lesson. What topics, ideas, and vocabulary were introduced?
