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    One Number Is 2 More Than 3 Times Another. Their Sum Is 22. Find The Numbers.

    Having trouble solving this classic math problem? It can be easy to get confused, especially when the numbers involved are unknown. This blog post will teach you a step-by-step process on how to solve this problem and other similar ones. We’ll go over the different strategies you can use, as well as tips and tricks that will help you remember the steps. By the end of it, you’ll have no trouble finding the numbers in this equation with ease. So let’s get started!

    Solving for x

    There are a few different ways that you can solve for x in this equation. One way is to use algebra to isolate x on one side of the equation. You can do this by adding 8 to both sides of the equation and then dividing both sides by 3. This will give you the equation:

    x = 12

    Another way that you can solve for x is by using a graphing calculator. You can graph the equation and find the point where the two lines intersect. The x-coordinate of this point will be the value of x that you are looking for.

    Solving for y

    If we let x be one of the numbers, then the other number must be y = 3x – 10. Therefore,

    3x – 10 + x = 45

    4x = 55

    x = 13.5

    So, the two numbers are 13.5 and 3(13.5) – 10 = 28.5

    The numbers are 8 and 14

    The numbers are 8 and 14.

    8 is more than 1 times another. Their sum is 22. Find the numbers.


    It’s no secret that mathematics can be difficult to understand, especially when it comes to solving equations. But what if you were presented with a math problem that only needed two numbers? This article will explain how to solve the equation: One number is 2 more than 3 times another. Their sum is 22.

    To solve this equation, we’ll use the distributive property and basic algebraic reasoning. First, we’ll represent the unknown numbers as x and y. We know that one of the numbers (y) is 2 more than three times the other (x). This can be written as: y = 3x + 2. Secondly, we know that their sum is 22; which means x + y = 22.

    By combining these two equations, we get: 3x + 2 + x = 22.


    Have you ever heard the phrase “One number is 2 more than 3 times another. Their sum is 22. Find the numbers.”? If so, you’re probably wondering how to solve this problem.

    Well, here’s the answer: the two numbers are 8 and 14. Let’s break down the equation to see how we got to this answer.

    Start by rearranging the equation so that we are looking for the two numbers. We can do this by subtracting 2 from both sides of the equation, which gives us:

    3 times another number = 20

    Now, let’s solve for the “another number.” We can do this by dividing both sides of the equation by 3, which gives us:

    Another number = 6.5

    Now that we know the value of “another number,” we can use this to find the value of the first number. In this case, we simply need to add 2 to the “another number” to get the first number. So, our first number is 8.

    To find the second number, we can just subtract the first number from the sum (22), which gives us 14. Therefore, the two numbers are 8 and 14.

    Now that you know how to solve this problem, you can apply it to other problems that have a similar structure.


    Have you ever found yourself in a situation where you were trying to solve a seemingly impossible math problem? Well, look no further because we have the answer for you!

    ‍ The question is: “One number is 2 more than 3 times another. Their sum is 22. Find the numbers.”

    This problem can seem daunting at first, but with a few simple steps, you will be able to find the answer in no time!

    To solve the problem, we can set up an equation using the information given in the question. We will label one number as x and the other as y. Then, we can write the equation as: x + (3x + 2) = 22.

    Now, we can solve for x by subtracting 2 from both sides, giving us: x + 3x = 20. Then, we can divide both sides by 4, which gives us x = 5.

    If we plug the value of x into the equation, we get 5 + (3 × 5 + 2) = 22. This confirms that x = 5 and y = 17, which is the answer to the question.

    Therefore, one number is 5 and the other is 17. Together, they add up to 22!

    We hope that this post has helped you solve this tricky math problem. If you ever find yourself stuck on a math question, remember that you can always break it down into smaller components and use basic algebra to find the answer. Good luck!

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