What is the first multiples of 5 that is greater than 17?

In mathematics, multiples are the product of a number and another whole number. When we talk about the first multiples of 5 that are greater than 17, we are looking for the first numbers that are obtained by multiplying 5 by a whole number and are greater than 17.

Let's find the first multiple of 5 that is greater than 17. Starting with 5, if we multiply it by 1, we get 5. 5 is less than 17, so it is not the desired multiple.

Moving on to the next number, when we multiply 5 by 2, we get 10. 10 is still less than 17, so it is not the answer we are looking for.

Continuing the pattern, when we multiply 5 by 3, we get 15. Again, 15 is less than 17, so it does not meet our criteria.

Finally, when we multiply 5 by 4, we get 20. 20 is the first multiple of 5 that is greater than 17. Therefore, the answer to the question is 20.

In summary, the first multiple of 5 that is greater than 17 is 20. This means that when we multiply 5 by any whole number greater than 4, the result will be greater than 17.

What is the first number of 5 that is greater than 17?

What is the first number of 5 that is greater than 17?

When looking for the first number of 5 that is greater than 17, we need to start by understanding the relationship between these two values. In this case, we are searching for a number within the range of 5 that surpasses the value of 17.

In order to find this number, we must count from 5 onwards until we reach a value that is greater than 17. Let's begin:

5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18!

As we can see, the first number of 5 that is greater than 17 is 18. It is important to note that this number satisfies the condition stated in the question.

In summary, the first number of 5 that is greater than 17 is 18. This can be determined by counting onwards from 5 until we surpass the value of 17.

What is the first multiple of 4 that is greater than 14?

What is the first multiple of 4 that is greater than 14?

When we encounter a problem requiring us to determine the first multiple of a number, we can use a systematic approach to find the solution. In this case, we need to find the first multiple of 4 that is greater than 14. Let's break it down step by step.

Step 1: Start with the number 14 and add 1 to it. This gives us a new number: 15.

Continuing with this approach, we can find the first multiple of 4 that is greater than 14. Let's add 1 again to our previous number, 15, giving us 16. Since 16 is divisible by 4, it is a multiple of 4.

But is this the first multiple of 4 greater than 14? Let's check. We'll add 1 to 16, giving us 17. Unfortunately, 17 is not divisible by 4, so it is not a multiple of 4.

Step 2: We'll keep adding 1 to the previous number until we find a multiple of 4. Continuing from 17, let's add 1 to it, giving us 18. Since 18 is divisible by 4, it is indeed a multiple of 4.

But is 18 the first multiple of 4 greater than 14? Let's check. Adding 1 to 18 gives us 19, which is not divisible by 4. So, 18 is not the first multiple of 4 greater than 14.

Step 3: We'll continue this process until we find the first multiple of 4 that is greater than 14. Continuing from 19, let's add 1 to it, giving us 20. And yes, 20 is divisible by 4, making it a multiple of 4.

Finally, we have found the first multiple of 4 that is greater than 14. It is 20. Therefore, the answer to the question "What is the first multiple of 4 that is greater than 14?" is 20.

What are the first six multiples of 17?

What are the first six multiples of 17? Multiples are numbers that can be divided evenly by another number. In this case, we are looking for the multiples of 17. Let's find them!

First, let's multiply 17 by 1. The result is 17.

Next, let's multiply 17 by 2. The result is 34.

Now, let's multiply 17 by 3. The result is 51.

After that, let's multiply 17 by 4. The result is 68.

Then, let's multiply 17 by 5. The result is 85.

Lastly, let's multiply 17 by 6. The result is 102.

So, the first six multiples of 17 are 17, 34, 51, 68, 85, and 102.

What is the set whose elements are multiples of 5 greater than 10?

A set is defined as a collection of distinct elements. In this case, we are looking for a set where all the elements are multiples of 5 and greater than 10.

Multiples refer to numbers that can be formed by multiplying a given number by another integer.

To find the set of multiples of 5 greater than 10, we need to start with the number 10 and successively multiply it by 5, considering only the products that are greater than 10.

The set can be represented as {15, 20, 25, 30, 35, 40, 45, 50, ...} where each element is a multiple of 5 and greater than 10.

Greater than indicates that the numbers in the set are larger than a given value, which in this case is 10.

This set can be seen as the progression of numbers formed by taking 10 and adding 5 repeatedly. Each member of the set is therefore a multiple of 5 and greater than 10.

As the set continues, it can be observed that the numbers become larger and larger, always following the same pattern of being multiples of 5 and greater than 10.

Thus, the set of multiples of 5 greater than 10 is an infinite set that can be generated by adding 5 to any previous element of the set.