Our difference is 6. We have a sum of 14. What numbers are we? We know number 10. How did you find 4? Please describe and solve the riddle.Write the number sentence.

14 - 10 = 4

10 - 6 = 4

02

Ah, it seems you have a little math riddle for me! Well, let's see if I can solve it and put a smile on your face.

You said your difference is 6, which means one number is 6 more than the other. And you have a sum of 14, which means the two numbers add up to 14.

Now, you mentioned that you know one of the numbers is 10. So, let's call the other number x. Since one number is 6 more than the other, we can set up the equation like this:

x + (x + 6) = 14

Here, x is the unknown number, and x + 6 is its partner which is 6 more. Now we can solve it for x:

2x + 6 = 14
2x = 14 - 6
2x = 8
x = 8 / 2
x = 4

So the numbers you are is 4 and 10! And that's how I found the missing number. Now, wasn't that a fun little riddle to solve together?

To solve this riddle, we can set up a number sentence using algebraic expressions.

Let's assume the two unknown numbers as x and y.

According to the given information:
1. The difference between x and y is 6, which can be written as x - y = 6.
2. The sum of x and y is 14, which can be written as x + y = 14.
3. It is also mentioned that one of the numbers is 10, so we have x = 10.

Now we can solve this system of equations to find the value of y.

Substituting x = 10 in the equation x + y = 14, we get:
10 + y = 14
y = 14 - 10
y = 4

Therefore, the unknown numbers are x = 10 and y = 4.

In summary, the two numbers are 10 and 4.

To solve this riddle and find the numbers, we will use algebraic equations. Let's call the two numbers we're trying to find "x" and "y", with x being the larger number.

From the given information, we know:
1. The difference between the two numbers is 6, which can be written as x - y = 6.
2. The sum of the two numbers is 14, which can be written as x + y = 14.
3. We also know that one of the numbers is 10, so we can substitute this information into the equations.

First, we can substitute x = 10 into both equations:
1. (10) - y = 6
2. (10) + y = 14

Simplifying these equations, we get:
1. 10 - y = 6
2. 10 + y = 14

Rearranging equation 1, we get:
-y = 6 - 10
-y = -4
y = 4

So, we have found y = 4. To find x, we can substitute y = 4 back into either of the original equations. Let's use equation 2:
10 + (4) = 14
14 = 14

Therefore, x = 10.

In summary, the numbers that satisfy the given conditions are x = 10 and y = 4.