When it comes to solving algebraic expressions, it's important to remember basic mathematical operations such as addition and multiplication. In this case, we are tasked with finding the sum of 2y + 32y + 56y.
To solve this expression, we need to combine like terms. In algebra, like terms are terms that have the same variable raised to the same power. In this case, all three terms have the variable y raised to the first power.
So, combining 2y, 32y, and 56y, we get:
2y + 32y + 56y = 90y
Therefore, the sum of 2y + 32y + 56y is 90y. This means that if you were to add 2y, 32y, and 56y together, the result would be 90y.
Understanding how to combine like terms is essential in algebra as it allows us to simplify expressions and solve equations more efficiently. By recognizing patterns and following the rules of algebra, we can manipulate expressions to find solutions.
If you'd like to learn more about algebraic expressions and how to solve them, there are plenty of online resources available. Websites such as Khan Academy offer free tutorials and practice exercises to help you improve your algebra skills.
Remember, practice makes perfect when it comes to math. So, don't be afraid to tackle challenging problems and seek help when needed. With dedication and perseverance, you can master algebra and become more confident in solving mathematical equations.
In conclusion, the sum of 2y + 32y + 56y is 90y. By understanding the basic principles of algebra and combining like terms, we can simplify expressions and find solutions to mathematical problems more effectively.
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