1 / 15

Learning objective: To be able to use partitioning to double or halve numbers.

Learning objective: To be able to use partitioning to double or halve numbers. . Place value. Numbers are categorised as being either units/ones, tens, hundreds or thousands etc. The position of the digit within an number shows its value according to its ‘place’.

Audrey
Télécharger la présentation

Learning objective: To be able to use partitioning to double or halve numbers.

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Learning objective: To be able to use partitioning to double or halve numbers.

  2. Place value • Numbers are categorised as being either units/ones, tens, hundreds or thousands etc. • The position of the digit within an number shows its value according to its ‘place’. • In whole numbers the number on the far right is always the units/ones column, next on the left comes the tens, then the thousands etc.

  3. Th H T U

  4. Partitioning • Partitioning is the breaking down of a number into several components according to its place value. • E.g. 485 = 400 + 80 + 5 • The zeros represent a place holder of the other digits ( e.g. tens and units) and without them the number would simply look like a single unit of 4. • ..\..\..\..\Desktop\Maths ITP\placevalue_pc.EXE

  5. Partitioning and doubling • Why do we need to partition when doubling? • By partitioning a number we can use known doubles of smaller numbers and then add these together to calculate the answer. • E.g. double 47 is not a double that most people know of by heart.

  6. BUT of you partition it into tens and units ( 40 + 7) Double 40 is relatively easy = 40x 2 = 80 Double 7 is a known double = 7 x 2 = 14 Add these together  80 +14 94

  7. Have a go at this calculation using your knowledge of partitioning and known doubles. Q. What is double 67?

  8. Partitioning and halving • Why do we need to partition when halving? • By partitioning a number we can use known halves of smaller numbers and then add these together to calculate the answer. • E.g. half of 58???????????

  9. Partition 58 into tens and units (50 + 8) • Half of 50 = 25 ( ½ or divide by 2) • Half of 8 = 4 • Add these together  25 + 4 29

  10. Have a go at this calculation using your knowledge of partitioning and known halves. • Q. What is half of 38?

  11. Remember  if the number you are halving is an even number it will always halve exactly. • Whereas if the number is an odd number the answer will always have the fraction of a half in it ( e.g. half of 13 = 6 ½ ) • The easiest way to halve odd numbers is to half the even number just before it and then add on a half to that number (e.g. 13  half of 12 is 6 + ½ = 6 ½ )

  12. Well done you can now partition numbers to find doubles and halves! ☺

  13. Main activity: • With your partner, roll 2 dice to find 2-digit numbers. Then partition them into tens/units and find the doubles/halves and record in your exercise books. • E.g. 34  30 + 4 • 30 = 60 = 15 • 4 = 8 = 2 • Therefore 34 = 68 (60 + 8) = 17 (15 + 2) • Please remember to write the long date along with the title. LO: To be able to use partitioning to double or halve numbers. • Year 3’s to work on numbers between 1-50 first (x 10) then go onto numbers 50-100. ( x 5) • Year 4’s to work on numbers between 1-100. (x 10) • Extension: roll dice 3 times to create 3-digit numbers and find doubles/halves by partitioning into hundreds/tens/units (x 5)

More Related