The answer is \boxed{-12 - 10}.
Sure, I can help you with that! Here's an article on the topic:
The Answer Is -12 - 10
When it comes to math problems, sometimes we need to simplify or solve equations by combining like terms. In this case, we have two numbers being subtracted from each other: -12 and -10.
To find the difference between these two numbers, we simply add their absolute values together (the positive value of each number) and then subtract one from the result.
So, let's do the calculation step-by-step:
-12 + (-10) = -22
Now, we take away 1 from -22:
-22 - 1 = -23
Therefore, the answer to the equation -12 - 10 is -23. It may seem counterintuitive at first glance, but it follows the basic rules of arithmetic for adding negative numbers.
In summary, when subtracting two negative numbers, you add their absolute values and then subtract one from the sum. This method works because negative numbers represent subtraction, so adding their absolute values represents taking away the same amount twice,Campeonato Brasileiro Action which leaves us with zero. Subtracting one from the result then gives us the final answer.
This rule applies not only to simple addition problems but also to more complex equations involving multiple variables. For example, if we have the equation 5x - 7 = 3x + 4, we would start by finding the difference between the two sides of the equation:
5x - 3x = 7 + 4
2x = 11
Finally, we divide both sides of the equation by 2 to solve for x:
x = 11/2
So, in this example, we used a different approach to solving the equation, but the concept remains the same: combine like terms and simplify the expression before applying the order of operations. By following these steps, we can effectively manipulate algebraic expressions to arrive at the correct solution.
In conclusion, the answer to the equation -12 - 10 is -23, and it follows the basic principles of arithmetic for adding negative numbers. Whether you're dealing with simple addition problems or more complex equations, understanding how to simplify and combine like terms is crucial for success in mathematics. So, remember to always check your work carefully and apply the right techniques whenever possible.