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Solving the Equation: (5y + 4) + (-2y + 6) = ?
This equation involves combining like terms to simplify and solve for the variable 'y'. Here's how we can do it:
Understanding the Equation
The equation (5y + 4) + (-2y + 6) = ? is asking us to simplify the expression on the left side of the equation.
Combining Like Terms
- Identify like terms: '5y' and '-2y' are like terms because they both have 'y'. Similarly, '4' and '6' are like terms because they are constants.
- Combine the 'y' terms: 5y + (-2y) = 3y
- Combine the constant terms: 4 + 6 = 10
Simplified Equation
After combining like terms, the simplified equation becomes:
3y + 10 = ?
Solving for 'y'
To solve for 'y', we need more information. The equation is incomplete. We need a value on the right side of the equation to determine the value of 'y'.
For example:
If the equation was (5y + 4) + (-2y + 6) = 16, we could solve for 'y' as follows:
- Simplify the left side: 3y + 10 = 16
- Subtract 10 from both sides: 3y = 6
- Divide both sides by 3: y = 2
Therefore, if the equation was (5y + 4) + (-2y + 6) = 16, then y = 2.