Decimals

Add single digit numbers with decimal values in thousandths

Comparing addition or subtraction statements involving decimals and fractions

Add three or more decimals

Add or subtract numbers as decimals or fractions and convert answers

Solve problems involving both an addition and a subtraction

Complete addition or subtraction statements to make a target number

Make the statement true (add/sub)

Solve problems involving addition or subtraction of decimal numbers

Multiply numbers with decimals by powers of 10

Divide numbers with decimals by powers of 10

Multiply and divide numbers with decimals by powers of 10

Multiply numbers with tenths by single digit numbers

Multiply numbers with hundredths by single digit numbers

Multiply numbers with thousandths by single digit numbers

Multiply numbers with decimals by double digit numbers

Multiply numbers with decimals by whole numbers using the algorithm

Find a decimal proportion of a quantity

Divide 3 digit number by 1 digit number resulting in decimal answer

Divide 4 digit number by 1 digit number resulting in decimal answer

Divide 3 digit number by 2 digit number resulting in decimal answer

Divide 4 digit number by 2 digit number resulting in decimal answer

Long division - dividing 1 or 2 digit numbers

Long division - dividing 3 digit numbers

Long division - dividing 4 digit numbers

Divide numbers with tenths by a single digit number

Divide numbers with hundredths by a single digit number

Divide numbers with thousandths by a single digit number

Long division - divide decimals by 1 digit number

Divide numbers with decimals by a double digit number

Long division - divide decimals by 2 digit number

Divide a number with decimals by whole numbers

Complete multiplication statements to make a target number

Complete division statements to make a target number

Make the statement true (mult/div)

Problem solving with decimals (mult/div)

Problem solving with decimals (4 ops)

Compare addition and subtraction statements with decimals

Comparing multiplication statements with decimals

Order of operations with decimals (add/sub/mult)

Compare statements with decimals (4 operations)

Order of operations with decimals (add/sub/mult/div)

Order of operations with decimals (4ops and brackets)

Write numbers with decimals to and from expanded form

Round numbers to tenths or hundredths

Convert from decimals to fractions

Convert from fractions to decimals

Convert between mixed numbers and decimals

Estimation with Decimals (Investigation)

Multiply decimals by decimal using grid (tenths)

Multiply decimals by decimal (hundredths)

Multiply decimals by decimal using algorithm

Further multiplication of numbers with decimals

Whole number division resulting in decimal quotient

Divide decimal by a whole number

Divide decimal by a whole number with long division

Divide by decimals

Round numbers with decimals

Order of operations with decimals

Problem solving with decimals I

Add or subtract negative numbers with decimals

Multiply or divide negative numbers with decimals

Convert negative fractions to decimal numbers

Use long division to convert negative fractions to decimal numbers

Order of operations with decimals (with negatives)

Target Numbers (Investigation)

Problem solving with decimals II

Convert recurring decimals to fractions

Class VII

Compare statements with decimals (4 operations)

Lesson

Comparing statements

When we are comparing statements, we can often work out if they are equal, or if one side is larger, without even solving them. By thinking about the number problem on each side, there are some ways of working out which symbol to use, to make the statement true. We need to decide if one side is:

equal to (=)
less than (<), or
greater than (>)

the other side.

Statements with division

We have seen how to work out number problems with multiplication in our number statements and if we have division in our number problems, there are some ways to figure out how the two statements compare, including:

looking at the total we have to share
looking at the number we are dividing by (the divisor),
whether one number is similar to another, or has been multiplied by a factor of 10, for example.

In Video 1, we look at how to use these ideas to see what symbol makes the statement true.

Number problems with several parts

When we have more than one operator in our number problem, we need to remember the order of operations before we can estimate or decide which side of our statement is greater. Then there are some ways to help us decide which symbol to use, without solving our number problem. We can:

round our decimals to the nearest unit, to work out an estimated total for each side
look at how the numbers in our number problems are changing, depending on which operators we have to solve

In Video 2, we look at some statements where our number problems have more than one part and decide which symbol to use without solving them.

Remember!

Don't forget the order of operations when solving number problems.

Worked Examples

Question 1

Consider the following statement:

$32.59\div6.2$32.59÷6.2$\editable{}$$32.59\div6.8$32.59÷6.8

Which one of the symbols $=$=, $<$< or $>$> will make the statement true?

$32.59\div6.2\editable{}32.59\div6.8$32.59÷6.232.59÷6.8

Question 2

Consider the following statement:

$61\div2.3$61÷2.3$\editable{}$$61\div23$61÷23

Which one of the symbols $=$=, $<$< or $>$> will make the statement true?

$61\div2.3\editable{}61\div23$61÷2.361÷23

Question 3

Consider the following statement:

$3.4+5.1\times8.2$3.4+5.1×8.2$\editable{}$$3.4\times5.1+8.2$3.4×5.1+8.2

Which one of the symbols $=$=, $<$< or $>$> will make the statement true?

$3.4+5.1\times8.2\editable{}3.4\times5.1+8.2$3.4+5.1×8.23.4×5.1+8.2

Outcomes

7.NS.FRN.10

Multiplication and division of decimal fractions

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