edcom-728x90

IXL Ad

Display Title

Math Clip Art--Base Ten Blocks--1

Math Clip Art--Base Ten Blocks--1

Math Clip Art Base Ten Blocks

Topic

Number Models

Description

This image is part of a comprehensive series designed to model numbers using base 10 blocks, an essential tool in mathematics education. Use the title card "Math Clip Art Base 10 Blocks" to introduce this lesson. This visual aid sets the stage for the subsequent images in the series, preparing students for an engaging exploration of number representation.

The importance of using math clip art to teach mathematics cannot be overstated. These visual representations provide a concrete way for students to grasp abstract numerical concepts. Base 10 block models, in particular, offer a tangible method for understanding place value and number composition. By incorporating these images into lessons on Numbers, teachers can create a more interactive and accessible learning environment.

Teacher's Script: "Class, today we're going to explore numbers in a new and exciting way. This image introduces us to Base 10 Blocks, which are special tools that will help us understand how numbers are built. Just like building with blocks, we'll see how we can use these to represent different numbers. Are you ready to become number architects?"

For a complete collection of math clip art related to Number Models click on this link: Number Models: Base Ten Blocks Collection.


The Base 10 Number System

When you first learned to count, you started at zero or one and counted to nine.

0, 1, 2, 3, 4, 5, 6, 7, 8, 9

After nine, the numbers started repeating.

10, 11, 12, 13, 14, 15, 16, 17, 18, 19

After 19, the pattern of numbers continues. In fact, counting numbers involves just using the digits from 0 to 9 in different combinations.

Why is that?

Our numbering system is called a base 10 system. This means there are ten digits, which you know as 0 to 9. All numbers in a base 10 system just use these digits.

Counting in a Base 10 System

When you look at a number, each digit represents a certain place value. Take a look at this three-digit number

The number 123.

The digit 3 is in the ones place. The digit 2 is in the tens place. The digit 1 is in the hundreds place.

Analysis of place value.

The digit 3 is in the ones place. The digit 2 is in the tens place. The digit 1 is in the hundreds place.

For whole numbers, place value increases 10-fold.

 

Place Value illustration.

Place Value in the Base 10 System

Place value determines the size of a number. Take a look at this number:

23

In the ones place is the digit 3, but int he tens place is the digit 2. Don't let the single digit fool you. The 2 in the tens place has a value of 20.

Now look at this number:

542

In the ones place is the digit 2. In the tens place is the digit 4. In the hundreds place is 5. If we were to separate these numbers, we would see this:

500

40

2

So, in going from left to right starting at the decimal point, each place value is ten times the value of the place value to the right.

If you're given a description of a number using just place value information, you can write a number. Here's an example. 

The digit in the ones place is 5. The digit in the tens place is 3. The digit in the hundreds place is 9. What is the number?

Using this description we write the following number: 935.

Number Systems with Other Bases

You've seen how the base 10 number system works, but why do we use a base 10 system? Are there other number systems?

Let's address the first question. The reason we use a base 10 system is probably because we have ten fingers to count with. Do you think it's a coincidence that our base 10 numbering system aligns with our 10 fingers to count?

But we have 10 fingers and 10 toes. Are there number systems that use base 20. Yes!

The Mayan culture used a base 20 system for counting. These are twenty symbols used to count.

Place Value

This numbering system uses just three symbols in different combinations: dots, dashes, and the shell. The shell represents zero. The dash represents an increment of five. The dot represents a value of one. Different combinations of these symbols can model any number.

Another, even more popular system is the binary system, which is used extensively with computers. With the binary system, there are only two digits: 0 and 1. This combination of digits can be used any number  equivalent to our base 10 numbers. Here are the first 10 numbers in binary and base 10.

Base 10Binary
00
11
210
311
4100
5101
6110
7111
81000
91001

Why do computers use a binary, or base 2, system? What is the advantage of a binary system?

Computer circuitry and connections involve a lot of on-off switching. Many computer commands are basically combinations of these on-off switches. A binary system is ideal for modeling an on-off system. If you let 0 mean off and 1 mean on, then a binary code can be used to model not only numbers but any computer state.

Each number system has its own rules for writing numbers. Once you learn the rules, then you can write any number in any number system.

Number Models: Base Ten Blocks

One way to model base ten numbers is to use number models, and one of the best ones to use is to use base ten blocks. Base ten blocks are a visual model to represent numbers. Here is what these models look like.

BAse 10 blocks

For each of these models, place the correct number of blocks to model the digit in that place value.

BAse 10 blocks

This is a model for the number 24. There are two tens blocks in the tens place and four ones blocks in the ones place.

Here is a number to the hundreds place.

BAse 10 blocks

To model 250, put two hundreds blocks in the hundreds place, five tens blocks in the tens place, and no blocks in the ones place.

Common Core Standards CCSS.MATH.CONTENT.K.NBT.A.1, CCSS.MATH.CONTENT.1.NBT.B.2, CCSS.MATH.CONTENT.2.NBT.A.1
Grade Range K - 3
Curriculum Nodes Arithmetic
    • Numbers and Patterns
        • Place Value
Copyright Year 2021
Keywords place value, base ten blocks