3y+11/5 - 27-4y/10 < 2y - y+7/5

To solve the given inequality, let's simplify the expression step by step:

$3y + \frac{11}{5} - 27 - \frac{4y}{10} < 2y - y + \frac{7}{5}$

First, let's simplify the fractions:

$3y + \frac{11}{5} - 27 - \frac{2y}{5} < y + \frac{7}{5}$

Next, let's group the terms with $y$ on one side and the constant terms on the other side:

$3y - \frac{2y}{5} - y < \frac{7}{5} + 27 - \frac{11}{5}$

Simplifying the constants on the right side:

$\frac{11}{5}y < \frac{23}{5}$

Now, divide both sides of the inequality by $\frac{11}{5}$ to solve for $y$:

$y < \frac{23}{5} \times \frac{5}{11}$ $y < \frac{23}{11}$

So, the solution to the given inequality is $y < \frac{23}{11}$.

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