(y^2)^2*(...)^3=y^10

It seems like you've provided an equation involving exponents. The equation you've given is:

$(y^2)^2 \cdot (\ldots)^3 = y^{10}$

In this equation, $y$ is raised to different powers. Let's break down the equation step by step:

1. $(y^2)^2$ means you raise $y^2$ to the power of 2, which results in $y^4$.
2. $(\ldots)^3$ represents some expression raised to the power of 3.

So, the equation simplifies to:

$y^4 \cdot (\ldots)^3 = y^{10}$

To solve for the expression within the parentheses, you can divide both sides of the equation by $y^4$:

$(\ldots)^3 = y^{10 - 4} = y^6$

So, the expression within the parentheses is $y^6$, and the equation becomes:

$y^6 = y^6$

This equation is an identity, meaning it's true for all values of $y$.

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