Table = “a single dataset used by Appsheet.” So in other words, worksheet is a spreadsheet organized specifically for AppSheet to read & write. Worksheet = “ a spreadsheet that contains cells organized in rows and columns.” 3 divides into these numbers exactly.If someone could tell me if I'm on the right path or not. This is because 3 divides exactly into 6.įor example, the first few multiples of 6 are 6, 12, 18, 24 and 30. Multiples of 6 are always multiples of 3. The multiple of 3 alternate between being odd and even.ģ divides exactly into multiples of 6, 9, 12 and all other multiples of 3. Odd numbers end in the digits of 1, 3, 5, 7 and 9. For example, 2 × 3 = 6, which is an even multiple of 3.Įven numbers end in the digits of 0, 2, 4, 6 and 8. Whenever 3 is multiplied by an even number this produces a multiple of 3 that is even.
For example, 3 × 3 = 9, which is an odd multiple of 3.
Multiples of 3 are not always odd.Multiples of 3 are only odd when they are multiplied by an odd number. Zero is also a multiple of every number because every number multiplied by zero makes zero.
Any whole number multiplied by 3 is a multiple of 3. Zero is a multiple of 3 because 3 × 0 = 0. To be a multiple of 3, the digits of the number must add up to another multiple of 3. It is an example of a number that is not a multiple of 3 because its digits do not add up to make a multiple of 3.Ĥ + 0 + 9 = 13, which is not a multiple of 3. This rule can allow us to easily check if a larger number is a multiple of 3. This means that 5502 is also a multiple of 3. Simply adding the digits of a larger number can allow us to decide if it is a multiple of 3.ĥ + 5 + 0 + 2 = 12 which is 4 × 3. For example, 5502 is a multiple of 3 because 5 + 5 + 0 + 2 = 12, which is a multiple of 3 The rule for multiples of 3 is that their digits must add up to another number that is also a multiple of 3. The multiples of 3 produce a diagonal pattern if shaded in on the number grid. We can also look for patterns in the numbers to learn the multiples of 3. When teaching the multiples of 3, it can be useful to use a number grid to 100 to practise counting up in threes. Here is the multiples of 3 chart, showing all of the multiples of 3 to 100. We can teach this method of counting in threes to find multiples of 3 using a number grid. We can learn the multiples of 3 by adding on 3 starting at 0.Ġ + 3 = 3, 3 + 3 = 6, 6 + 3 = 9 and so on. To find the tenth multiple of 3 simply multiply 3 by 10.ġ0 × 3 = 30 and so, the tenth multiple of 3 is 30. If the result is a multiple of 3, then the original number is a multiple of 3 too. To test if larger numbers are multiples of 3, add the digits. Alternatively, count up in threes from zero. To find multiples of 3, multiply any number by 3. We can continue adding threes on to find more.įor example, 36 + 3 = 39, which is the next multiple of 3.
There are an infinite number of multiples of 3. Here is a poster showing the 3 times table and the first twelve multiples of 3: For example, 100 × 3 = 300 and so, 300 is the hundredth multiple of 3. Any whole number multiplied by 3 makes a multiple of 3. Multiples of 3 are numbers that can be divided exactly by 3 with no remainder.