−17−1,8y=55,8+3,8y /////////////////////////////

It looks like you've provided a linear equation: $-17 - 1.8y = 55.8 + 3.8y$. To solve for $y$, you can follow these steps:

1. Combine like terms on each side of the equation:

   $-17 - 1.8y = 55.8 + 3.8y$

   Combine the $y$ terms by adding $1.8y$ to both sides:

   $-17 = 55.8 + 5.6y$

2. Move the constant term to the other side of the equation by subtracting $55.8$ from both sides:

   $-17 - 55.8 = 5.6y$

   $-72.8 = 5.6y$

3. Solve for $y$ by dividing both sides by $5.6$:

   $\frac{-72.8}{5.6} = y$

   $y \approx -13$

So, the solution to the equation is $y \approx -13$.

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To solve the equation $-17 - 1.8y = 55.8 + 3.8y$, you can follow these steps:

1. Combine Like Terms: Combine the constant terms on one side of the equation and the variable terms on the other side.

   $-17 - 55.8 = 3.8y + 1.8y$

   $-72.8 = 5.6y$

2. Isolate the Variable: Divide both sides by the coefficient of $y$ (which is 5.6) to solve for $y$.

   $y = \frac{-72.8}{5.6}$

3. Calculate: Perform the calculation to find the value of $y$.

   $y \approx -13$

So, the solution to the equation is $y \approx -13$.

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