Simplifying 6 4 x 1 y 3 5y

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Simplifying complex equations can be challenging but can also be quite rewarding once the solution is achieved. In this tutorial, we will walk you through the process of simplifying the equation 6 4x 1y 3 5y. This equation is made up of several components, including a constant, a variable, an exponent, and multiplication.

The first step is to identify the components. In this equation, the constant is 6, the variable is x, the exponent is 1, and the multiplier is y. Once the components are identified, the next step is to apply the rules of algebra to simplify the equation. The most basic rule of algebra is that any number or variable that is multiplied by one is equal to itself. This means that 6 4x 1y 3 5y can be simplified to 6 4x y 3 5y.

The next step is to group the terms in the equation into like terms. Like terms are terms that have the same variables and exponents. In this equation, the like terms are 6, 4x, and 5y. This means that the equation can be simplified to 6 4x + 5y. It is important to note that terms that have the same variables and exponents can be added together.

The last step is to combine the like terms. This can be done by simply adding the coefficients of the like terms. In this equation, the coefficients are 6, 4, and 5. Adding these together yields 15. This means that the equation can be simplified to 15y. This is the simplified version of 6 4x 1y 3 5y.



Simplifying equations can be a daunting task, but with practice and patience, it is possible to simplify even the most complex equations. In this tutorial, we discussed the steps for simplifying the equation 6 4x 1y 3 5y. By following the steps outlined above, we were able to reduce this equation to 15y. This is the simplified version of the equation.

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